PRINTED BOOKS
M.L. Abell and J.P. Braselton. Mathematica by examples . Academic
Press ,
R. Abraham and J. Robbin. Transversal
mappings, W.A. Benjamin, New-York, (1967).
R.H. Abraham and C.D. Shaw. Dynamics
- The geometry of behavior ,Addison-Wesley,
(1982).
R.R. Achmerov, M.I. Kamenskii and Potapov. Measures
of noncompactness and ultra-contractive
operators (russian) . Nauk ,
R.A. Adams. Sobolev
spaces . Academic Press , New-York , 1975 .
R.P. Agarwal and V. Lakshmikantham. Uniqueness and nonuniqueness criteria for ordinary differential
equations,World
R.P. Agarwal, M. Meehan and D. O’Regan. Fixed
point theory and applications .
Press ,
S. Agmon. Lectures
on exponential decay of solutions of sencond-order elliptic equations : Bounds
of eigenfunctions of N-body Schrodinger operators, Princeton University Press,
L.V. Ahlfors. Complex analysis .
L.V. Ahlfors. Conformal invariants. Topics in geometric function theory . McGraw-Hill , New
N.U. Ahmed and K.L. Teo. Optimal
control of distributed parameter systems . North-Holland
, New
P.S. Aleksandrov. Combinatorial topology .
P.S. Aleksandrov. General theory og Homotopy (russian) . Nauk ,
S. Alinhac and P. Gerard. Operateurs peudo-differentiels et theoreme de
Nash-Moser . CNRS ,
Paris , 1991.
G. Allaire. Une introduction aø la modeùlisation matheùmatique et aø
la simulation numeùrique Part 1,
Ecole polytechnique,
G. Allaire. Une introduction aø la modeølisation matheùmatique et aø
la simulation numeùrique Part 2,
Ecole polytechnique,
M. B. Allen III and E. L. Isaacson, Numerical Analysis for Applied Science, John Wiley & Sons, Inc.,
M. Altman . A
unified theory of nonlinear operator and evolution equations with applications
( A
new approach to nonlinear partial differential equations),Marcel Dekker, New-York, (1986).
A. Ambrosetti . Critical points and nonlinear variational problems,Memoire 49, Soc. Math.
(1992).
A. Ambrosetti and G.F. Dell’Antonio. Variational and local methods in the study of Hamiltonian
systems,World
L. Ambrosio, N. Fusco and D. Pallara. Functions
of bounded variation and free discontinuity problems,
Clarendon Press, Oxfore, (2000).
R.D. Anderson. Symposium on infinite dimensional topology, Princeton University Press,
(1972).
I. Anderson and G. Thompson. The inverse problem of the calculus of variations for ordinary
differential equations, Memoirs. 473, Amer.Math. Soc.,
Ñaëng Ñình AÙng. Cours de calculus diffeùrentiel et inteùgral, Toång Hôïp , Saigon, (1975).
Ñaëng Ñình AÙng. Giaûi tích nhaäp moân. Ñaïi hoïc Toång Hôïp Thaønh Phoá Hoà Chí
Minh, (1991).
Ñaëng Ñình AÙng. Nhaäp moân giaûi Tích. NXB Giaùo duïc, Tp Hoà Chí Minh, (1998).
Ñaëng Ñình AÙng. Lyù thuyeát tích phaân. NXB Giaùo duïc, Tp Hoà Chí Minh, (1997).
Ñaëng Ñình AÙng. Bieán ñoåi tích phaân. NXB Giaùo duïc, Tp Hoà Chí Minh, (1998).
D.D. Ang, R. Gorenflo, L.K. Vy and D.D. Trong. Moment
theory and some inverse problems in
potential theory and heat conduction . Springer ,
Ñaëng Ñình AÙng, Trònh Anh Ngoïc and Ngoâ Thaønh Phong. Nhaäp moân cô hoïc. NXB Ñaïi Hoïc
Quoác Gia, Tp Hoà Chí Minh, (2003).
Nguyeãn Leâ Anh. Baøi giaûng giaûi tích. NXB Ñaïi
Hoïc Quoác Gia, Tp Hoà Chí Minh, (2004).
Nguyeãn Höõu Anh. Toaùn rôøi raïc. NXB Giaùo duïc, Tp
Hoà Chí Minh, (1999).
A.R. Angel and S.R. Porter. A survey of mathematics with applications, Addison-Wesley,
(1993).
H. Anton and C. Rorres . Elemetary
linear algebra, John Willey and Son,
P.L. Antonelli and R.H. Bradbury. Volterra-Hamilton models in the ecology and evolution of colonial
organisms,World
A.B. Arkhanrelskii. Finite
dimensional vector spaces. (russian), Moscow
University Press,
(1982).
V. Arnold . EÙquations diffeùrentielles ordinaires , Mir, Mocow, (1974)
V.I. Arnold. Mathematical methods of classical mechanics. (russian), Nauk,
V.I. Arnold and A. Avez . Ergodic
problems of classical mechanics, Addison-Wesley,
(1989).
G.A. Articolo. Partial differential equations and boundary values problems with
Maple V, Academic
Press, New-York, (1998)
A. Artin . Algeøbre geùomeùtrique, Gauthier-Villars, Paris, (1972).
B. Artmann. The
concept of number : from quaternion to monads and topological fields . Ellis
Horwood ,
M.F. Atiyah and I.G. Macdonald . Introduction to communtative algebra ,
Addison-Wesley, New-
M. Avellaneda (ed). Quatitative analysis in financial markets . World Scientific ,
T. Aubin . Nonlinear
functional analysis on manifolds. Monge-Ampeøre equations, Springer,
(1982).
T. Aubin . Some
nonlinear problems in Riemannian geometry, Springer,
T. Aubin and
E. Azoulay, J. Avignant and G. Auliac . Matheùmatiques deug sciences . Tome 1, Ediscience, Paris,
(1997)
E. Azoulay, J. Avignant and G. Auliac . Matheùmatiques deug sciences . Tome 2, Ediscience, Paris,
(1998)
E. Azoulay, J. Avignant and G. Auliac . Matheùmatiques deug sciences . Tome 3, Ediscience, Paris,
(1999)
E. Azoulay, J. Avignant and G. Auliac . Matheùmatiques deug sciences . Tome 4, Ediscience,
(1997)
H.M. Bacon. Differential
and integral calculus,
C. Baiocchi and A. Capelo. Variational
and quasivariational inequalities,John Wiley
and Sons, New
A.V. Balakrishnan. Applied functional analysis. (russian), Mir,
S. Banac. Pheùp
tính vi phaân vaø tích phaân. NXB Giaùo duïc,
(1978).
J. Banaùs and K. Goebel. Measures
of noncompactness in Banach spaces , Marcel
Dekker,
(1980)
Haø Huy Baûng. Lyù thuyeát khoâng gian Orlicz. NXB ÑHQG
Haø Noäi, (2003).
V. Barbu. Nonlinear
semigroups and differential equations in Banach spaces , Noordhoff,
(1976)
V. Barbu. Mathematical
methods in optimization of differential systems.
Kluwer,
M. Barnley. Fractal
Geometry ,,, ()
B.A. Barsky. Computer graphic and geometric modeling using beta-splines , Springer,
R.G. Bartle. The elements of integration,John Wiley
and Son,
J-L. Basdevant and J. Dalibard. Meùcanique quantique , Ecole polytechnique, Paris, (2001).
J. Bass. Cours de Matheùmatiques. Tome II,Masson, Paris, (1968).
J. Bass. Exercices de Matheùmatiques,Masson, Paris, (1968).
T. Bedford, M, Keane and C. Series . Ergodic
theory, symbolic dynamics and hyperbolic spaces,
Ph. Benilan , J. Deny and F. Hirsch. Seminaire de Les semi-groupes et les
eùquations d’eùvolution,
anneùes 1972-1973, 1973-1974,Iniversiteù Paris XI, Paris,
(1975).
A. Bensoussan and J. Frehse. Regularity
results for nonlinear elliptic systems and applications .
Springer ,
J. Bergh and J. Lo¨ fstro¨ m. Interpolation spaces. (russian), Mir,
S. Bergman ad M. Schiffer. Kernel functions and elliptic differential equations in
mathematical
physics . Academic Press , New-York , 1953
.
L.D. Berkovitz. Optimal control theory , Springer,
L. Bers, S.
Bochner and F. John. Contributions to the theory of
partial differential equations ,
L. Bers, F.
John and M. Schechter. Partial differential equations ,Proc. Summer Seminar,
A.M. Berthier . Spectral theory and wave operators for the Schrod¨ inger equation , Pitman,
(1982).
D.P. Bertsekas and J.N. Tsitsiklis. Parallel and distributed computation - Numerical methods, Prentice
Hall, New-Jersey, (1989).
N.M. Beskin. Dividing a segment in a given ratio,
Mir,
F. Bethuel, H. Brezis and F. Heùlein . Ginzburg-Landau vortices. Birkha¨ user, Basel , 1993.
V.L. Biderman. Theory of vibration mechanics. (russian),
A. Bigard, M. Crestey and J. Grappy. Probleømes d’algeøbre geùneùrale . Dunod , Paris , 1967 .
R. Billstein, S. Libeskind and J.W. Lott . A
problem solving approach to mathematics,
Wesley,
F.T. Birtel. Function algebras,Scoot, Foresman,
New-York, (1966).
M.L. Bittinger and B.B. Morrel . Applied calculus, Addison-Wesley,
G.W. Bluman and J.D. Cole. Similarity
methods for differential equations .
1974.
V.G. Boltyansky. Differentiation explained, Mir,
F. Bonnans and P. Rouchon. Analyse et comande de systemes dynamiques , Ecole polytechnique,
Paris, (2002).
N. Bourbaki. Algeøbre - Structures algeøbriques . Hermann , Paris , 1964 .
N. Bourbaki. Topologie geùneùrale - Espaces fonctionels . Hermann , Paris , 1961 .
C. Bouvart and sc A. Ratinet. Nouvelles tables de logarithmes a
cinq deùcimales. Table numeùrique
- Tables trigonomeùtriques, Hachette,
Paris, (1957).
A. Braides. Gamma-convergence for beginners, Oxford University Press,
G.E. Bredon. Topology and geometry .
H. Brezis. Analyse fonctionnelle - Theùorie et
applications , Masson et Cie, Paris, (1987).
H. Brezis. Analyse fonctionnelle - Theùorie et applications , Dunod, Paris, (1999).
H. Brezis. Giaûi tích haøm - Lyù thuyeát vaø öùng duïng. Ngöôøi dòch : Nguyeãn Hoäi Nghóa vaø Nguyeãn
Thaønh Long , NXB ÑHQG, Tp Hoà Chí Minh (2002).
H. Brezis, M.G.
Crandall and F. Kappel. Semigroups, theory and applications , Longman Scientific
and Technical,
Th. Bro¨ cker and L. Lander. Differentiable
germs and catastrophes .
Cambridge, 1975.
L. D. Broglie. Probleømes actuels en theùorie de la
relativiteù .
I.U. Bronstein and A.Ya. Kopanskii. Smooth invariant manifolds and normal forms,World Scientific,
Singapore, (1994).
N. Bronstein et K.A. Semendiaev. Aide-meùmoire de matheùmatiques,Eyrolles, Paris, (1963).
F.E. Browder . Nonlinear functional analysis and its applications , Proceedings of Symposia in Pure
Mathematics 45 Part 1, Amer.Math. Soc.,
F.E. Browder . Nonlinear functional analysis and its applications , Proceedinds of Symposia in Pure
Mathematics 45 Part 2, Amer.Math. Soc.,
G. Buttazo. Semicontinuity,
relaxation and integral representation in mthe calculus of variations .
Longman , Essex, 1989.
G. Buttazo, M. Giaquinta and S. Hildebrandt. One-dimensional variational problems
. Clarendon ,
P.L. Butzer and H. Berens . Semi-groups
of operators and approximation, Springer,
L. A. Caffarelli and X. Cabreù. Fully
nonlinear differential equations ,
Colloquium Publications. 43,
Amer.Math. Soc.,
G. L. Cain, Introduction
to General Topology, Addision-Wesley Publishing
Company, Reading, Massachusetts,
(1994).
H. Cartan . Theùorie eùleùmentaire des functions
analytiques d’une ou plusieurs variables complexes.
Hermann , Paris , 1961.
H. Cartan . Formes diffeùrentielles. Hermann , Paris , 1967.
C. Castaing and M. Valadier. Convex analysis and measurable multifunctions, Springer,
(1970).
L. Cesari , R.
Rannan and J. D. Shuur. Nonlinear functional analysis and
differential equations,
Marcel Dekker, New-York, (1976).
J. Chabrowski . The Dirichlet problem with L2-boundary Data for elliptic linear equations, Springer,
Amer.Math. Soc.,
J. Chaillou and J. Henry. Probleømes
de topologie . Masson , Paris , 1971 .
K.W. Chang and F.A. Howes. Nonlinear
singular pertubation phenomena (russian) . Mir ,
1988 .
Kung-Ching Chang . Infinite dimensional Morse theory and its applications. Les Presses de
l’Universiteù de Montreùal,
Montreùal , 1985.
Kung-Ching Chang. Infinite
dimensional Morse theory and multiple solution Problems. Birkhauser,
J. Cheerger and D.G. Ebin. Comparison
theorem in Riemannian geometry . North-Holland , Amsterdam
, 1975 .
C. Chevalley . Theùorie des groupes de Lie,Hermann, Paris, (1968).
I. Chavel. Eigenvalues
in Riemannian geometry . Academic Press , New-York , 1984
.
I. Chavel. Isoperimetric
inequalities - Differential geometric and analytic perspectives .
University Press ,
Y-Z. Chen and L-C. Wu. Second
order elliptic equations and elliptic systems . Transl.
Math. Monographs
174. AMS ,
V.V. Chepyzhov and M.I. Vishik . Attractors for equations of mathematical physics, Amer.Math.
Soc.,
Nguyeãn vaên Chieån. Giaûi tích hoïc . NXB Toång Hôïp ,
M. Chipot . Elements
of nonlinear analysis. Birkha¨ user,
G. Choquet. Cours d’ analyse Tome II : Topologie . Masson , Paris , 1969 .
S-N Chow and J.K. Hale. Methods
of bifurcation theory, Springer,
T.J. Chung. Finite
element analysis in fluid dynamics,?,
New-York, (?).
N.M. Chuong, L. Nirenberg and W. Tutschke. Abstract and applied analysis , World
Scientific,
R.V. Churchill. Operational mathematics . McGraw-Hill
, New-York , 1958.
P.G. Ciarlet. The finite element method for elliptic problems. (russian), Mir,
P.G. Ciarlet. Mathematical elasticity - Vol I : Three-dimensional elasticity . North-Holland , Ams-
terdam , 1988 .
P.G. Ciarlet. Introduction aø l’analyse numeùrique matricielle et aø
l’optimisation, Dunod,
Paris, (1998).
P.G. Cialet and P. Rabier . Les eùquations de Von Kaùrmaùn, Lecture Notes in Math. 826, Springer,
D. Cioranescu and P. Donato. An
introduction to homogenization .
, 1999.
F.H. Clarke. Optimization and nonsmoth analysis . John
Wiley and Sons ,
D.
P. Concus and K. Lancaster . Advances in geometric analysis and continuum mechanics, International
Press, Cambrigde, (1995).
B.P. Conrad. PDifferential equations with boundary value problems- A systems
approach . Prentice-
Hall ,
P. Constantin, C. Foias, .
Nicolaenko and R. Temam. Integral
manifolds and inertial manifolds for
dissipative partial differential equations, Springer,
E.t. Copson. An introduction to the theory of functions of a complex variable .
Press,
R. Courant and D. Hilbert. Methods
of mathematical physics .Vol.I Interscience , New-York
, 1953 .
R. Courant and D. Hilbert, Methoden
der Mathematischen Physik , vol.II,
J. Crank. Free
and moving boundary problems . Clarendon Press ,
J. Cronin. Fixed
points and topological degree in nonlinear analysis, Mathematical Surveys 11,
Amer.Math. Soc.,
J-P Crouzeix, J-E Martinez-Legaz and M. Volle. Generalized
convex, generalized montonicity : recent
results. Kluwer,
Vaên Nhö Cöông and Kieàu Huy Luaän. Hình hoïc cao caáp. NXB Giaùo duïc,
(1978).
A. Csaszar. Foundations
of general topology . Pergamon ,
C. W. Curtis and
Publishers,
Czechoslovak Acad.Sci.. General topology and its relations to modern analysis and algebra .
1962 .
B. Dacorogna. Direct methods in the calculus of variations, Springer,
G. Dal Maso . An introduction to Γ-convergence. Birkha¨ user,
Ju. L. Daleckii and M.G. Krein. Stability
of solutions of differential equations in Banach space,
Translations of Mathematical Monographs 43, Amer.Math. Soc.,
Ju.L. Daleckii and S.V. Fomin. Measure and ordinary
differential equations on infinte-dimensional
spaces (russian). Nauk,
H. G. Dales and G. Oliveri ed., Truth in Mathematics, Clarendon
Press,
R. Dautray and J-L. Lions. Analyse matheùmatique et calcul numeùrique
pour les sciences et les techniques
Tome 1, Masson,
R. Dautray and J-L. Lions. Analyse matheùmatique et calcul numeùrique
pour les sciences et les techniques
Tome 2, Masson,
R. Dautray and J-L. Lions. Analyse matheùmatique et calcul numeùrique
pour les sciences et les techniques
Tome 3, Masson,
T.V. Davies and E.M. James. Nonlinear
differential equations, Addison-Wesley,
S.R. Deans. The
radon transform and some of its applications, John Wiley
and
K. Deimling. Nonlinear funtional analysis, Springer,
R. Demmig. Differentialrechnung, Demmig,
C.L. DeVito. FUNCTIONAL ANALYSIS AND LINEAR OPERATOR THEORY ,
Wesley, Redwood, (1990).
J.I. Diaz. Nonlinear
PDE and free boundaries , Pitman,
U. Dierkes, S.
Hildebrandt, A.
Ku¨ ster and O. Wohlrab. Minimal surfaces I : Boundary value
problems
. Springer ,
U. Dierkes, S.
Hildebrandt, A.
Ku¨ ster and O. Wohlrab. Minimal surfaces II : Boundary
regularity .
Springer , Berlin , 1992.
J. Dieudonneù. Sur les groupes classiques,Hermann, Paris, (1967).
J. Dieudonneù. Calcul infinitesimal,Hermann, Paris, (1968).
J. Dieudonneù. EÙleùments d’ analyse. Vol 1 ,Gauthier-Villars, Paris, (1969).
J. Dieudonneù. EÙleùments d’ analyse. Vol 2 ,Gauthier-Villars, Paris, (1969).
J. Dieudonneù. EÙleùments d’ analyse. Vol 4 ,Gauthier-Villars, Paris, (1971).
B. Doubrovine, S. Novikov and A.T. Fomenko . Geometrie contemporaine - Methods et applications.
T1. Mir ,
B. Doubrovine, S. Novikov and A.T. Fomenko . Geometrie contemporaine - Methods et applications.
T2. Mir ,
P. Drabek. Topological
and variational methods for nonlinear boundary value problems, Longman,
D-Z. Du, L. Qiand R.S. Womersley(Ed). Recent advances in nonsmooth optimization , World Scientific,
J. Duoandikoetxea. Fourier Analysis, Graduate Studies in
Mathematics 29, Amer.Math. Soc.,
(2001).
Döông Minh Ñöùc. Laøm quen toaùn ñaïi hoïc cuøng maùy tính I , NXB Giaùo Duïc, Thaønh Phoá Hoà Chí
Minh, (1997).
Döông Minh Ñöùc. Laøm quen toaùn ñaïi hoïc cuøng maùy tính II , NXB Giaùo Duïc, Thaønh Phoá Hoà Chí
Minh, (1998).
Döông Minh Ñöùc. Giaûi tích haøm , NXB ÑHQG, Thaønh Phoá
Hoà Chí Minh,, (2000).
Döông Minh Ñöùc. Phöông phaùp môùi hoïc toaùn ñaïi hoïc.,Giaùo Duïc, Thaønh Phoá Hoà Chí Minh, (2001).
N. Dunford and J.T. Schwartz. Linear operators- Part I : General theory . Interscience ,
1964.
N. Dunford and J.T. Schwartz. Linear operators- Part II : Spectral theory - Self adjoint
operators in
Hilbert space . Interscience ,
N. Dunford and J.T. Schwartz. Linear operators- Part III : Spectral operators . Interscience , New
Phan Duõng . Phöông phaùp luaän saùng taïo khoa hoïc kyõ thuaät. ÑH Khoa Hoïc Töï Nhieân Tp Hoà Chí
Minh, (2002).
Hoaøng höõu Ñöôøng. Lyù thuyeát phöông trình vi phaân,
NXB Ñaïi hoïc vaø Trung Hoïc Chuyeân nghieäp,
Haønoäi, (1977).
P.L. Duren. Theory
of Hp-spaces, Academic,
G. Duvaut and J-L. Lions. Inequalities
in Mechanics and physics . Springer ,
H.B. Dwight. Tables of integrals and other mathematical data, Macmillan,
G.A. Edgar. Measure,
topology, and fractal geometry . Springer ,
D.E. Edmunds and W.D. Evans. Spectral
theory and differential operators . Clarendon
Press ,
, 1987 .
C.H. Edwards and D.E. Penney. Differential equations - Computing and modeling . Prentice-Hall ,
J. Eells. Singularities
of smooth maps , Gordon and Breach,
J. Eells. Harmonic
maps , World
J. Eells and L. Lemaire. Selected
to[ics in harmonic maps , Regional Conference series in
Math. 50,
Amer.Math. Soc.,
A.V. Efimov. Mathematical analysis - advanced topics - Part I - General
functional series and their
applications . Mir ,
A.V. Efimov, Yu. G. Zolotarev and V.M. Terpigoreva. Mathematical analysis - advanced topics -
Part II - Application of some methods of mathematical and
functional analysis . Mir ,
1985 .
Yu.V. Egorov. Linear differential equations of second order . (russian)Nauk,
Yu.V. Egorov. Problems and equations in functional analysis. (russian), Nauk,
Yu.V. Egorov. Lectures on partial diffrential equations . (russian)
1985.
G. Eisenack and C. Fenske. Fixpunttheorie.
Bibliographics Intiut
L. P. Eisenhart. Riemannian geometry , Princeton
University Press,
I. Ekeland. The
mountain pass theorem and some applications . Presses de l’universite de Montreal ,
I. Ekeland and R. Temam. Convex
analysis and variational problems . North-Holland
,
1976 .
B. Epstein. Partial
differential equations . R.FE.
A. Escassut. Analytic elements in p-adic analysis,World
L.C. Evans. Weak
convergence methods for nonlinear partial differential equations, Regional Conference
series in Math. 74, Amer.Math. Soc.,
L.C. Evans. Partial
differential equations , Graduate studies in Math. 50, Amer.Math. Soc.,
(1983).
L.C. Evans and R.F. Gariepy. Measure theorey and fine properties of functions . CRC ,
1992.
M. Evgrafov, K. Bejanov, Y. Sidorov, M. Fedoruk and M. Chabounine . Recueil de problemes sur la
theorie des fonctions analytiques Mir , Moscow , 1974.
M.K. Fage and N.I. Nagnibida. Problems of equivalences of ordinary differential operators.
(russian),
Nauk,
G. Fairweather. Finite elements, Galekin methds for differential equations,Marcel Dekker, New-
A. Fasano , M.
Primicerio. Free
boundary problems,Pitman,
A. Fasano and M. Primicerio. Some Problems in nonlinear diffusion,,
(1986?).
H. Federer. Geometric
measure theory, Springer,
K. Feng and Z-C. Shi. Mathematical
theory of elastic structures, Springer,
W. Feng, S. Hu and X. Lu. Dynamical
systems and differential equations, Discrets
and continuous
dynamical systems , supplement volume ,
R.P. Feynman. The Feyman lectures on physics . Tome
II - Partie 1- Addison-Wesley ,
1969.
R.P. Feynman. The Feyman lectures on physics . Tome
II - Partie 2- Addison-Wesley ,
1970.
G.M. Fichtengolz. Cô sôû giaûi tích toaùn hoïc. Taäp I. NXB Ñaïi hoïc vaø Trung Hoïc Chuyeân nghieäp,
Haønoäi, 1977.
G.M. Fichtengolz. Cô sôû giaûi tích toaùn hoïc. Taäp II . NXB Ñaïi hoïc vaø Trung Hoïc Chuyeân nghieäp,
Haønoäi, 1977.
R.L. Finney and G.B. Thomas. Calculus,
P. Fitzpatrick and J. Pejsachowicz. Orientation and the Leray-Schauder theory for fully nonlinear
elliptic boundary value problems ,
Memoirs. 483, Amer.Math. Soc.,
J. Flachsmeyer, H. Poppe and F. Terpe. Contributions
to extension theory of topological structures,
A.T. Fomensko. Topological variational
problems (russian).
I. Fonseca and W. Gangbo, Degree Theory in Analysis
and Applications, Clarendon Press,
(1995).
L.E. Fraenkel. An introduction to maximum principles and symmetry in elliptic
problems .
University Press ,
J.B. Fraleigh . A first course in abstract algebra,
Addison-Wesley,
G.F. Franklin, J.D. Powell and M.L. Workman. Digital control of dynamic systems,
Addison-Wesley,
A. Friedman. Partial differential equations of parabolic type . Prentice-Hall ,
W. H. J. Fuchs, Topics in the Theory of Functions of One Complex Variable, D. Van Nostrand
Company, Inc.,
S. Fucik and A. Kufner. Nonlinear
differential equations,Elsevier, New-York, (1980).
A. Fuhmann and H. Rott. Logic
action information .
D. Gaier, Lectures
on Complex Approximation, Birkh"auser Inc,
S.Galiot, D.
Hulin and J. Lafontaine. Riemann geometry, Springer,
M.G. Garroni and J.L. Menaldi. Green functions for second order parabolic integro-differential
problems , Longman Scientific and
Technical,
L. Gasinski and N.S. Papageoorgiou. Nonsmooth critical point theory and nonlinear boundary value
problems, Chapman and Hall, ENew York, .
B. Gelbaum and J. Olmsted. Caùc
phaûn thí duï trong giaûi tích, NXB Ñaïi hoïc vaø
Trung Hoïc Chuyeân
nghieäp, Haønoäi, (1982).
J. Garsoux. Analyse matheùmatiques,Dunod, Paris, (1968).
M.C. Gemignani. Elementary topology . Addison-Wesley
,
P.M. Gerhart, R.J. Gross and J. I. Hochstein. Fundamentals of fluid mechanics,
Addison-Wesley ,
N. Ghoussoub. Duality and perturbation metohs in critical point theory .
Press ,
M. Giaquinta. Multiple integrals in the calculus of variations and nonlinear
elliptic systems,
University Press,
M. Giaquinta . Introduction to regularity theory for nonlinear elliptic systems. Lectures in Mathematics
ETH Zu¨ rich, Birkhauser,
M. Giaquinta and S. Hildebrandt. Caculus of variations I : The Lagrangian formalism . Springer ,
M. Giaquinta and S. Hildebrandt. Caculus of variations II : The Hamiltonian formalism . Springer ,
M. Giaquinta ,G. Modicaand J. Soucek. Cartesian
currents in the calculus of variations I . Springer ,
D. Gilbarg and N. Trudinger. Elliptic partial differential equations of second order . Springer ,
D. Gilbarg and N. Trudinger. Elliptic partial differential equations of second order . Springer ,
E. Giusti. Minimal
surfaces and functions of bounded variation . Birhauser
,
E. Giusti. Minimal
surfaces and functions of bounded variation .(russian) Mir ,
E. Giusti. Metodi
diretti nel calcolo delle variazioni . Unione
Matematica Italiana ,
E. Giusti. Direct
methods in the calculus of variations . World
V.B. Glasko. Inverse problems of mathematical physics , American
(1988)
R. Godement . Cours d’ algeøbre,Hermann, Paris, (1966).
R. Godement . Theùorie des faisceaux,Hermann, Paris, (1964).
S. Godounov and V. Riabenki . Scheùmas aux diffeùrences , Mir,
C. Godsil and G. Royle, Algebraic
Graph Theory, Graduate Texts in Mathematics,
Springer-Verlag,
D. Goeleven. Noncoercive variational problems and related results , Longman Scientific and Technical,
I. Gohberg and S. Goldberg . Basic operator theory. Birkha¨
user,
S.I. Goldberg. Curvature and homology . Academic
Press , New-York , 1962 .
L.I. Golovina and I.M. Yaglom. Induction in geometry, Mir,
X. Gomez-Mont, J. Seade and A. Verjovski . Holomorphic dynamics, Springer,
J. N. Goodier and S. Timoshenko and J.N. Goodier, Theory of Elasticity, Second
Edition, McGraw-
Hill Book Company, Inc.,
M. Goossens, F. Mittelbach and A. Samarin. The
latex companion,
(1994).
A. Gopfert, H. Riahi, C. Tammer and C. Zalinescu. Variational methods in partially ordered spaces,
Springer,
A. Granas and J. Dugundji . Fixed point theory, Springer,
A. Gray . Modern
differential geometry of curves and surfaces, CRS
Press,
W.H. Greub . Linear algebra, Springer,
M.R. Grossinho and
todifferential equations,Kluwer,
S.I. Grossman. Calculus,
A. O. Guelfond, Calcul des Diffeùrences Finis, Dunod, Paris, (1963).
D. Guinin, B. Joppin, F. Aubonnet and H. Lemberg. L’oral de matheùmatiques aux concours d’entree
des grandes eùcoles scientifiques , Beral, Paris, (1995)
E.M. Gurari .
K.E. Gustafson . Introduction to partial differential equations and Hilbert space
methods , John
Wiley and Sons, New-York, (1987)
Buøi Xuaân Haûi, Traàn
soá tuyeán tính, NXB ÑHQG Thaønh phoá
Hoà Chí Minh, Tp HCM, (2001).
J. K. Hale. Studies
in ordinary differential equations . Mathe
matical Association of America ,
New-York , 1977 .
C.A. Hall and T.A. Porsching. Numerical analysis of partial differential equations , Prentice Hall,
New-Jersey, (1990)
G. Hall and J.M. Watt. Modern
numerical methods for ordinary differential equations . (russian)
Mir ,
R. Hardt and L. Simon . Seminar
on geometric measure theory. Birkha¨ user,
R. Hardt and M. Wolf. Nonlinear
partial differential equations in differential geometry , IAS/ Park
City, Mathematics Series. 2, Amer.Math. Soc.,
B. Hauchecorne and D. Suratteau . Des matheùmaticiens de A aø Z. Ellipses, Paris , 1997.
W.K. Hayman and P.B. Kennedy . Subharmonic functions. (russian), Mir,
A.C. Hearn. Reduce.
User’s manual .
E. Hebey. Sobolev
spaces on Riemannian manifolds , Springer,
A. Heck. Introduction
to Maple , Springer,
S. Heikkila and V. Lakshmikantham. Monotone iterative techniques for discontinuous nonlinear
differential equations,Marcel
Dekker, New-York, (1994).
L. J. Heider and J. E. Simpson. Theoretical analysis, W.B. Saunder Compny,
F. Heùlein. Harmonic maps, cosevation
law’s and moving frames,
S. Helgason . Differential geometry and symmetric spaces, Academic Press,
D. Henry. Geometric theory of semilinear
parabolic equations, Lecture Notes inMath. 840, Springer,
N.J. Hicks. Notes
on differential geometry . D.
N.J. Higham. Handbook of writing for the mathematical sciences .
S. Hildebrandt and R. Leis . Partial
differential equations and calculus of variations,
Lecture Notes
in Math. 1357, Springer,
S. Hildebrandt. Mathematics and optimal form,Scientific
American Library,
P.J. Hilton. Studies in modern topology . Mathe
matical Association of America , New-York , 1968 .
M.W. Hirsch. Differential topology . Springer ,
M.W. Hirsch. Differential topology .(russian) Mir
,
M.W. Hirsch and S. Smale. Differential
equations, dynamical systems, and linear algebra . Acdemic
Press , New-York , 1974.
G. Hochschild . La structure des groupes de Lie, Dunod,
B. Hoffmann. Abert Einstein - Creator and rebel,
Viking Press,
K. Hoffman, Banach
Spaces of Analytic Functions , Prentice- Hall, Inc.,
(1962).
Nguyeãn Thöøa Hôïp. Giaùo trình phöông trình ñaïo haøm rieâng. Taäp 1, NXB Ñaïi Hoïc vaø Trung hoïc
Chuyeân nghieäp, Haø Noäi, (1977).
Nguyeãn Thöøa Hôïp. Giaùo trình phöông trình ñaïo haøm rieâng. Taäp 2, Ñaïi Hoïc vaø Trung hoïc Chuyeân
nghieäp, Haø Noäi, (1978).
L. Hormander. Linear partial differential operators . Springer ,
L. Hormander. An introduction to complex analysis in several variables . North-Holland , New
L. Hormander. The analysis of linear partial differential operators I . Springer ,
L. Hormander. The analysis of linear partial differential operators II . Springer ,
J.E. Humphreys. Lie algebra . ,
P. Huerre. Mecanique des fluides. Tome I : Cours . Ecole Polytechnique , Paris ,
2002 .
Nguyeãn Bích Huy. Pheùp tính tích phaân, NXB ÑHQG, Thaønh phoá Hoà Chí Minh,
(2000).
D.H. Hyers, G. Isac and T.M. Rassias . Stability of functional equations in several variables. Lectures
in Mathematics ETH Zu¨ rich, Birkha¨ user,
S.Ia. Iakubov. Linear differential-operator equations and applications, ELM,
ICTP. Global
analysis and its applications Vol. I, II, III,ICTP
4/7-25/8/1972,
ICTP. Complex
analysis and its applications Vol. I, II, III,ICTP
21/5-8/8/1975,
ICTP. College
on dynamical systems,ICTP 16/8-9/9/1988,
ICTP. College
on global geometric and topogical methods in analysis,ICTP 21/11-16/12/1988,
(1988).
ICTP. College
on differential geometry,ICTP 30/10-1/12/1989,
A.D. Ioffe and V.M. Tikhomirov. Theory of extremal problems. (russian), NAUKA,
A.D. Ioffe and V.M. Tikhomirov. Theory of extremal problems.,
North-Holland,
G. Iooss and D.D. Joseph. Elementary stability and bifurcation theory, Springer,
V. Isakov. Inverse
source problems, Math. Survey and monographs 34 AMS,
A. Jaffe and C. Taubes . Vortices
and monopoles., Birkhauser,
G. James. Modern
engineering mathematics, Addison-Wesley,
R.C. James. Advanced
calculus, Wadworth,
G. Jameson. Ordered
linear spaces, Springer,
P. Janssens, J. Mawhin and N. Rouche. Equation differentielles et fonctionlles
nonlineaires, Hemann,
Min Ji and Guang Yin Wang. Minimal surfaces in Riemannian manifolds, Memoirs. 495,
Amer.Math. Soc.,
F. John. Plane
wave and spherical means, Interscience,
F. John. Partial
differential equations, Springer,
L.W. Johnson, R. D. Riess and J.T. Arnold . Introduction to linear algebra,
Addison-Wesley,
(1993).
R. Johnsonbaugh . Discrete mathematics,
P. Joly. Analyse et approximation de modeles de propagation
d’ondes Part 1,
Ecole polytechnique,
Paris, (2003).
P. Joly. Analyse et approximation de modeles de propagation d’ondes
Part 2, Ecole polytechnique,
J. Jo¨ rgens. Linear integraloperatoren, B.G.
Teubner, Stuttgardt, (1970).
J. Jost. Harmonic
maps between surfaces, Lecture Notes in Math. 1062, Springer,
J. Jost. Nonlinear
methods in Riemannian and Ka¨ hlerian geometry . Birhauser
,
J. Jost. Two-dimensional
geometric variational problems , John Wiley and Sons,
New-York, (1991).
D.W. Kahn. Introduction
to Global analysis . Academic Press , New-York , 1980
.
L.V. Kantorovich and G.P. Akilov. Functional analysis. (russian), Nauk,
I.V. Kantorovich and V.I. Krylov. Approximate methods of higher analysis , Noordhoff,
(1958)
W. Kaplan . Elements
of differential equations, Addison-Wesley,
F. Kappel and W. Schappacher . Infinite-dimensional systems, Lecture
Notes in Math. 1076,
Springer,
S. Karamardian and C.B. Garcia. Fixed points : Algorithms and applications . Academic Press ,
New-York , 1977 .
A.P. Kartashev and B.L. Rojdestvenskii. Ordinary differential equations and basic calculus of variations
(russian) . Nauk,
Y. Katznelson . An introduction to Harmonic analysis,
John Wiley and Sons,
H.H. Keller . Differential calculus in locally convex spaces, Lecture Notes in Math. 417, Springer,
J.L. Kelley. General topology . D.
AL Kelley and
C.E. Kenig. Harmonic
analysis techniques for second order elliptic boundary value problems , Regional
Conference series in Math. 83, Amer.Math. Soc.,
A.A. Khaùc Keâvít. Phoå vaø phaân tích phoå, NXB Ñaïi
Hoïc vaø Trung hoïc Chuyeân nghieäp, Haø Noäi,
(1977).
D. Kinderlehrer and G. Stampacchia. An introduction to variational inequalities and their applications
. Academic Press , New-York , 1980
.
A. Kitaigorodsky. Introduction to physics, Mir,
M. Klimek, Pluripotential Theory, Clarendon Press,
W. Klingenberg . A course in differential geometry,
Springer,
S. Kobayashi. Hyperbolic manifolds and holomorphic mappings,Marcel Dekker, New-York, (1970).
S. Kobayashi and K. Nomizu. Foundations
of differential geometry. Vol.1 (russian) . Mir,
1981 .
G. Korn and T. Korn. Soå tay
toaùn hoïc. Taäp 1, NXB Ñaïi Hoïc vaø Trung hoïc
Chuyeân nghieäp, Haø
Noäi, (1977).
A.I. Koshelev. Regularity of elliptic equations and systems . (russian) Nauk ,
A.G. Kostiushenko and I.S. Sargsian. Distribution of eigenvalues. (russian), Nauk,
A.N. Kolmogorov and Iouschkevitz. Mathematics of 19e
century . (russian) Nauk ,
G. Kothe. Topological
vector spaces I,, Springer,
V.V. Kozlov . Symmetries, topology, and resonances in Hamiltonian mechanics, Springer,
(1996).
Phan Quoác Khaùnh. Pheùp tính vi tích phaân. Taäp 1. NXB Giaùo
Duïc, Tp Hoà Chí Minh, (1996).
Phan Quoác Khaùnh. Caùc phöông phaùp giaûi tích haøm trong ñieàu khieån toái öu, NXB Khoa Hoïc Kyõ
thuaät, Haø Noäi, (1983).
H. Kopka and P.W. Daly. A guide
to Latex 2e . Addison-Wesley ,
W. Krabs . Optimal
control of undamped linear vibrations . Heldermann,
Lemgo , 1995 .
S.G. Krantz. A mathematician_s survival guide . AMS , 2003 .
M. A. Krasnosel’skii. Topological methods in the theory of nonlinear integral equations .
Pergamon
Press , New-York , 1964 .
M. A. Krasnosel’skii . Positive solutions of operator equations, Nordhoff,
M. A. Krasnosel’skii and Ya. B. Rutickii. Convex functions and Orlicz spaces ,
Nordhoff,
(1961)
M. A. Krasnosel’skii and P.P. Zabreiko. Geometrical methods of nonlinear analysis . Springer ,
M. Krasnov, A. Kisselev and G. Mararenko. EÙquations inteùgrales . Mir ,
H-O. Kreiss and J. Lorenz. Initial-boundary
value problems and the Navier-Stokes equations . Academic
Press ,
N.V. Krylov. Lectures on elliptic and parabolic equations in Holder spaces, Graduate Studies in
Mathematics. 12, Amer.Math. Soc.,
N.V. Krylov. Nonlinear elliptic and parabolic equations of the second order , D. Reidel,
(1987).
A.Kufner . Weighted
Sobolev spaces , John Wiley and Sons, New-York,
(1985)
A.Kufner , O.
John and S. Fucik. Function spaces , Nordhoff,
I. Kuzin and S. Pohozaev . Entire solutions of semilinear elliptic equations. Lectures in Mathematics
ETH Zu¨ rich, Birkha¨ user,
O.A. Ladyzhenskya . The mathematical theory of viscous imcompressible flow .Gordon and Breach ,
New-York , 1969 .
O.A. Ladyzhenskya and N.N. Ural’tseva. Linear and quasilinear elliptic equations . Academic Press ,
New-York , 1968 .
O.A. Ladyzhenskya and N.N. Ural’tseva. Linear and quasilinear elliptic equations (russian . Nauka ,
O.A. Ladyzhenskya , V.A. Solonnikov and N.N. Ural’tseva. Linear and quasilinear parabolic equations
. Translations of Mathematical
Monographs 23, Amer.Math. Soc.,
V. Lakshmikanthamand S. Leela. Differential
and integral inequalities I : Ordinary differential
equations . Academic Press , New-York , 1969
.
H. Lamb. An
elementary course of infitesimal calculus, Cambridge
Unversity Press,
(1962).
L. Lamport. Latex-
A document preparation system . Addison-Wesley
,
N. S. Landkof, Foundations of Modern
Potential Theory,
S. Lang. Introduction aux varieùteùs diffeùrentiables . Dunod , Paris , 1967 .
S. Lang. A
second course in calculus . Addison-Wesley ,
S. Lang. Analysis
I . Addison-Wesley ,
S. Lang. Analysis
II . Addison-Wesley ,
S. Lang. Algebra
. Addison-Wesley ,
S. Lang. Differential
and Riemannian manifolds, Springer,
P. Lankaster. Theory of matrices . Mir ,
R. Larsen. The
multiplier problem, Lecture Notes in Math. ,
Springer,
P.D. Lax and R. Phillips. Scattering theory . Academic
Press , New-York , 1967 .
M. M. Lavrent’ev, V. G. Romanov and S. P. Shishatskii,
and Analysis, Translations of Mathematical
Monographs, vol.64,Amer. Math. Soc.,
M. Lavrentiev and B. Chabat. Meùthodes de la theùorie des fonctions d’une
variable complexe . Mir
,
Paris , 1977 .
M. Lavrentiev and B. Chabat. Effets hydrodynamiques et modeøles matheùmatiques . Mir ,
1980 .
H.B. Lawson. Minimal varieties in real and complex geometry . Presses de l’universite de
Montreal ,
H.B. Lawson. Lectures on minimal submanifolds . Instituto de matematica pura e aplicada ,
Rio de
Janeiro , 1970 .
Vy Khoi Le and Klaus Schmitt, Global Bifurcation in
Variational Inequalities, Applications to Obstacle
and Unilateral Problems,
G. Lebeau. Theorie des distributions et analyse de Fourier , Ecole polytechnique, Paris,
(2001).
E.B. Lee and L. Markus. Foundations
of optimal control theory . Robert E. Krieger ,
Malabar , 1986.
H. Lee and P. Munsell. The
design and implementation of programs in Fortan 77 . Prentice-Hall ,
E.H. Lieb and M. Loss. Analysis, Graduate Studies in Mathematics 41, Amer.Math. Soc.,
(2002).
G.M. Lieberman. Second order parabolic differential equations . World Scientific ,
F. Lin and X. Yang. Geometric
measure theory,Sciences Press,
J. L. Lions . Quelques meùthodes de reùsolution des probleømes aux limites
non-lineùaires , Dunod,
Paris,
(1969).
J. L. Lions . Sur quelques questions d’ analyse, de mechanique et de
control optimal , Presses de
l’universite de
J. L. Lions and E. Magenes. Non-Homogeneous
boundary value problems and applications , Springer,
J. L. Lions and E. Magenes. Methode de compactite et monotonie,,, ().
V.G. Litvinov. Optimazation in Elliptic boundary value problems with applications
to mechanics
.(russian) Nauk ,
monographs. 16, Amer.Math. Soc.,
N.G. Lloyd. Degree
theory . Academic Press , New-York , 1977 .
A.J. Lohwater . Russian-English dictionary,, Amer.Math.
Soc.,
Ia.B. Lopatinskii. Introcduction to temporary theory of partial differential equations
. (russian)Nauk,
E.A. Lord and C.B. Wilson. The mathematical description of sharpe and form . Ellis Horwood ,
J-H. Lorenzi and J-J. Payan. L’universteù maltraiteùe . Plon , Paris , 2003.
L. Lovasz, Combinatorial Problems and
Exercises, Akademial Kiado,
Y.L. Luke . Mathematical functions and
their approximations. (russian) Mir ,
Ñoå Vaên Löu . Giaûi tích Lipschitz NXB Khoa Hoïc vaø Kyõ Thuaät , Haø Noäi , 1999.
Yu.I. Lyubich and
R.E. Maeder. Programming in Mathematica .
J. Maly and P. Ziemer, Fine Regularity of
Solutions of Elliptic Partial Differential Equations, AMS,
A.I. Markushevich. Remarkable curves, Mir,
A.I. Markushevich. Complex numbers and comformal mappings, Mir,
A.A. Martuniuk and R. Gutovski. Integral inequalities and stability of motions . Naukoba Dumka ,
W.S. Massey . Algebraic topology : and introduction,
Springer,
J. Mawhin . Topological
degree methods in nonlinear boundary value problems, Regional conference
series in Math. 40, AMS, (1979).
J. Mawhin. Problems de Dirichlet variationnels
nonlinéaires . Presses de
l’universite de Montreal ,
J. Mawhin and M. Willem . Critical
point theory and Hamilonian systems, Springer,
V. G. Maz’ja . Sobolev spaces , Springer,
S. McLane and Birkhoff. Algeøbre
- T1 : Structures fondamentales,Gauthier-Villars,
S. McLane and Birkhoff. Algeøbre
- T2 : Les grandes theùoreømes,Gauthier-Villars,
P. Meinhold and G. Miltzlaff. Feld- und Potentialtheorie . Veb
Fachbuchverlag,
X. Merlin. Methodix analyse . Ellipses , Paris , 1994 .
X. Merlin. Methodix algeøbre . Ellipses , Paris , 1995 .
R. E. Meyer. Introduction to mathematical fluid dynamics . Wiley-Interscience , New-York , 1971? .
P-A. Meyer. Probabiliteùs et potentiel . Hermann , Paris , 1966 .
Y. Meyer and R. Coifman. Wavelets
: Caderoùn-Zigmund and multilinear operators .
University Press ,
F.A. Mikhailov . Theory and
methods in studies of non-stationary linear systems.(russian) Nauk ,
V.P. Mikhailov . Partial
Differential Equations. Mir ,
S.G. Mikhlin and S. Pro¨ ssdorf . Singular Integral Operators. Springer,
J.W. Milnor. Topology from the differentiable viewpoint . University Press of
1969.
A.S. Mishchenko, Yu P. Solovyev and A.T. Fomenko . Problems in differential
geometry and topology.
Mir ,
Moiseev. Asymptotic
methods of nonlinear mechanics . Nauk ,
R.J. Moore. QuickC programmer’s guide . QUE , , 1990.
F. Morgan. Geometric
measure theory . Academic Press , New-York , 1988
.
C.B. Morrey,Jr.. Multiple integrals in the calculus of variations. Springer ,
J. Morrow and K. Kodaira . Complex manifolds. Holt,Rinehart and
J. Mossino. Ineùgaliteùs isopeùrimeùtriques et applications en
physique. Hermann , Paris , 1984.
G.D. Mostow, J.H. Sampson and J-P.
Meyer. Fundamental structures of algebra,McGraw-Hill, New
L. Motz and J.H. Weaver. The story of mathematics . Plenum
Press ,
C.J. Mozzochi. On the pointwise convergence of Fourier series. Springer ,
J.R. Munkres. Elements of algebraic topology.
R.K. Nagleand E.B. Saff. Foundamentals
of differential equations and boundary value problems .
M.S. Narashimhan, R.R. Simha, R.
Narashimhanand C.S Seshadri. Riemannian surfaces - Algebraic
topology . Tata Institute of Fundamental
research ,
M.S. Narashimhan. Differential geometry . ICTP, ,
1982.
R. Narashihan . Giaûi tích treân ña taïp thöïc vaø phöùc , NXB Ñaïi Hoïc vaø Trung hoïc Chuyeân nghieäp,
Haø Noäi, (1984).
K. Narendra and M.A.L. Thathachar. Learning automata .
J. Necas. Les methodes directe en theùorie des eùquations
elliptiques , Masson et Cie, Paris, (1967).
J. Necas. Introduction
to the theory of nonlinear elliptic equations ,
John Wiley and Sons, New-
T.
J. Neggess and H.S. Kim. Basic
posets,World
J. W. Neuberger. Sobolev gradients and differential equations , Springer,
J. Neveu. Probabiliteùs . Masson , Paris , 1970 .
J. Neveu and N.E. Karoui. Bases mathematiques du calcul des
probabiliteùs .Ecole
Polytechnique ,
Paris , 1998 .
J. Neveu and N. El Karoui, Probabiliteùs, Deùpartement de Matheùmatiques
Appliqueùes, Ecole Polytecnique,
Paris, (1998).
Nguyeãn Hoäi Nghóa . Haøm suy roäng, NXB ÑHQG Thaønh phoá Hoà Chí Minh,
(2004).
Nguyeãn Hoäi Nghóa . Giaûi tích haøm, NXB ÑHQG Thaønh phoá Hoà Chí Minh,
(2004).
M. Nicolesco. Les fonctions polyharmoniques. Hermann , Paris , 1936.
S. Nikitin. Global
controllability and stabilization of nonlinear systems,World
(1994).
S.M. Nikolsky. A course of mathematical analysis . Mir
,
L. Nirenberg. Topics in nonlinear functional analysis . Courant Instite of Mathematics Sciences,
New-York, 1974 .
L. Nirenberg. Baøi giaûng veà giaûi tích phi tuyeán,
NXB Ñaïi Hoïc vaø Trung hoïc Chuyeân nghieäp, Haø
Noäi, (1986).
S.P. Novikov and A.T. Formenko. Elements of differential geometry and topology (russian) . Nauk,
L.V. Obsiannikov, N.I. Makarenko, V.I. Nalimov, V.Yu.
Liapidebskii, P.I. Plotnikov, I.V. Cturoba,V.I.
Bukreeb and V.A. Vladimirov. Nonlinear problems on surfaces and interior waves . Nauk ,
1985 .
H.C. Ohanian. Classical electrodynamics, Allyn and
Bacon,
G.O. Okikiolu . Aspects of the theory of bounde integral operators in Lp-spaces, Academic, Londonn,
(1971).
B. Opic and A. Kufner. Hardy-type
inequalities , Longman Scientific and
Technical,
Z-C. Ou-Yang, J-X. Liu and Y-Z. Xie. Geometric
methods in the elastic theory of membranes in
liquid crystal phases,World
Scientific,
F. Pacard and T. Rivieøre. Linear and nonlinear aspects of vortices - The Ginzburg-Landau
model.
Birkhauser, Basel, 2000.
R.S. Palais . Foundations of
global non-linear analysis, W.A.
J. Palis, Jr. and W. De Melo . Introducao aos sistemas dinˆamicos,
IMPA, S˜ao Paulo, (1978).
J. Palis, Jr. and W. De Melo . Geometric theory of dynamical systems,
Springer,
G. Papelier. Formulaire de matheùmatiques speùciales, Vuibert, Paris, (1958).
J. R. Partington, Interpolation,
Identification, and Sampling, Clarendon Press,
I.A. Pavliouk, V.M. Burum and Iu.A. Pasenschtenko. Approximate-analytical solutions of nonautonomous
differential equations (russian) . Nauk,
L.E. Payne. Improperly
posed problems in partial differential equations . Society for Industrial and
Applied Mathematics ,
A. Pazy. Semigroups of linear operators and
applications to partial differential equations, Springer,
C. M. Pearcy. Some recent developments in operator theory , Regional Conference series in Math.
36, Amer.Math. Soc.,
P. Pedregal. Parametrized measures and variational principles. Birkhauser,
H-O. Peitgen and H-O Walther . Functional differential equations and approximation of fixed
points, Lecture Notes in Math. 730, Springer,
W.V. Petryshyn. Generalized topological degree and semilinear equations,
Press. 117, Cambride, (1995).
Vuõ Ngoïc Phaùt. Contrained control problems of discrete processes,World Scientific,
N. D. Plessis, An Introduction to
Potential Theory, Oliver & Boyd,
R.R. Phelps. Convex functions, monotone operators and differentiability . Lecture Notes in Math.
1364, Springer,
Nguyeãn Ñình Phö. Lyù thuyeát oån ñònh vaø öùng duïng.
NXB Giaùo Duïc, Thaønh phoá Hoà Chí Minh,
(1996).
Nguyeãn Ñình Phö. Reõ Nhaùnh trong phöông trình vi phaân. Giaùo Duïc, Thaønh phoá Hoà Chí Minh,
(2000).
Nguyeãn Ñình Phö. Phöông trình vi phaân , NXB ÑHQG,
Thaønh phoá Hoà Chí Minh, (2002).
Nguyeãn Ñình Phö. Toång quan veà lyù thuyeát heä thoáng , NXB ÑHQG, Thaønh phoá Hoà Chí Minh,
(2003).
Nguyeãn Ñình Phö, Nguyeãn Coâng Taâm, Ñinh Ngoïc Thanh and Ñaëng Ñöùc Troïng. Giaùo trình giaûi
tích haøm moät bieán, NXB DHQG,
Thaønh phoá Hoà Chí Minh, (2002).
Nguyeãn Ñình Phö, Nguyeãn Coâng Taâm, Ñinh Ngoïc Thanh and Ñaëng Ñöùc Troïng. Giaùo trình giaûi
tích haøm nhieàu bieán, NXB
DHQG,Thaønh phoá Hoà Chí Minh, (2002).
J-P. Pier. Development
of mathematics 1990-1950, Birhasser,
G. Pisier. The
volume of convex bodies and Banach space geometry .
,
N. Piskunov. Differential and integral calculus. Vol.1, Mir,
H. Poincare . Mathematics and science : Last essays,
L.C. Pontriangin. Continuous groups (russian). Nauk ,
K.R. Popper . The logic of scientific discovery,
Hutchinson, London, (1972).
M.H. Protter and H.F. Weinberger. Maximum principles in differential equations . Springer-Verlag ,
Berlin , 1984.
J. Purdum . QuickC
Programming, Macmillan, (1991).
G.E. Pukhov. Differential stranformation mappings and equations (russian). Naukova Dumka ,
Moscow , 1980.
P.H. Rabinowitz. Minimax methods in critical point theory with applications to
differential equations
, Regional Conference series in Math. 65, Amer.Math. Soc., Providence,
(1984?).
A. Ralston and H.S. Wilf. Mathematical
methods for digital computers,John Wiley and Sons,
New
York, (1960).
A.G. Ramm and A.I. Katsevich. The Radon transform and local tomography,CRC Press, New York,
(1996).
M. Range, Holomorphic Functions and Integral
Representations in Several Complex Variables,
Springer Verlag, New York, (1986).
M.M. Rao and Z.D. Ren. Theory
of Orlicz space , Marcel Dekker, New York, (1991)
R. Rautmann. Approximation methods for Navier-Stokes problems, Springer, Berlin, (1980).
H.W. Reddick and F.H. Miller. Avanced mathematics for engineers,John
Wiley and Son, New York,
(1969).
M. Reed and B. Simon. Methods
of modern mathematical physics II : Fourier analysis, selfadjointness
. Academic Press , New-York , 1975
.
M. Reed and B. Simon. Methods
of modern mathematical physics III : Scattering theory . Academic
Press , New-York , 1979 .
M. Reed and B. Simon. Methods
of modern mathematical physics IV : Analysis of operators . Academic
Press , New-York , 1978 .
J.R. Reitz, F.J. Milford and R.W.Christy. Foundations of electromagnetic theory,
Addison-Wesley,
Reading, (1993).
H-K. Rhee, R. Aris and N.R. Amundson. First order partial differential equations. Vol. II - Theory
and application of hyperbolic systems of quasi linear rquations, Prentice Hall, New-Jersey, (1989)
B. Ricceri and S. Simons. Minimax
theory and applications, Kluwer, Dordrecht, (1998)
A.P. Robertson and W. Robertson. Topological vector spaces (russian). Mir
, Moscow , 1967.
J. S. Robertson. Engineering mathematics with mathematica . McGraw-Hill , New York , 1994?.
K.H. Rosen. Elementary
number theory number theory and its applications . Addison-Wesley , New
W. A. Rosenkrantz, An
Introduction to Probability and Statistics for Scientists and Engineers,
McGraw-Hill Companies, Inc.,
K.P. Rybakowski. The homotopy index and partial differential equations, Springer,
W. Rudin. Principles
of mathematical analysis .
W. Rudin. Real
and complex analysis .
W. Rudin. Functional
analysis .
W. Rudin. Fourier
analysis on groups ..
W. Rudin, Function Theory in the Unit Ball Cn,
Isabel Maria da Costa Salavessa. Graphs with parallel mean curvature and a variational problem in
conformal geometry . Doctor of
Philosophy Thesis , Uiversity of
J. Salencon. Mecanique des milieux continus. Tome I : Concepts
geùneùraux . Ecole
Polytechnique ,
Paris , 2001 .
J. Salencon. Mecanique des milieux continus. Tome II : Thermoeùlasticiteù . Ecole
Polytechnique ,
Paris , 2001 .
H. Salzmann and al.. Compact projective planes . De Gruyter , Berlin, 1995.
P. Samuel. Theùorie algeùbrique des nombres . Hermann , Paris , 1967?.
W.J. Savitch. Pascal - An introduction to the art and science of programming. Benjamin/Cummings,
New York, 1991.
H. Schlichting. Boudary layer theory . McGrawhill ,
New-York , 1960 .
D. Schneider. Handbook of Quick basic . Brady , New
York , 1991.
F. Schulz . Regularity
theory for quasilinear elliptic systems and Monge-Ampeøre equations in two
dimensions , Lecture Notes in Math. 1445, Springer, Berlin, (1990).
B-W Schulze and G. Wildenhain . Methoden der Potentialtheorie fu¨ r elliptische
Differentialgleichungen
beliebiger Ordnung. Birkha¨
user, Basel , 1977.
J.T. Schwartz. Nonlinear functional analysis, Gordon
and Breach Science, New-York, (1965?).
R.E. Showalter. Hilbert space methods for partial differential equations , Pitman, London, (1977).
A. Schuchat and F. Shultz. The joy
of Mathematica . Addison-Wesley , New York , 1994.
D. Schwalbe and S. Wagon. VisualDsolve-
Visualizing differential equations with Mathematica .
Springer , New York , 1996.
Yu.V. Sidorov, M.V. Fedorov and M.I. Schabunin . Lectures on
theory of functions of conplex
variables. Mir , Moscow , 1982.
G.F. Simon. Topology
and modern analysis . McGrawhill , New-York , 1963 .
L. Simon . Theorems
on regularity and singularity of energy minimizing maps. Lectures in Mathematics
ETH Zu¨ rich, Birkha¨ user, Basel , 1996.
V.Ia. Skorobogatko. Studies on qualitive theory of partial differential equations .
(russian)Nauk,
Moscow , 1980.
I.V. Skrypnik. Methods for analysis of nonlinear elliptic boundary value problems , Translations of
Mathematical Monographs 139, Amer.Math. Soc., Providence, (1994).
E.Ia. Smirnov. Some problems of mathematical theory of equations (russian) . Nauk,
New-York , 1981 .
G.V. Smirnov. Introduction to the theory of differential inclusions, Graduate Studies in Mathematics
41, Amer.Math. Soc.,
M.M. Smirnov. Equations of mixed types. (russian),
V.I. Smirnov. A course of higher mathematics VI - Part II (russian) . Nauk,
1981 .
V.I. Smirnov. A course of higher mathematics V . Pergamon
Press , New-York , 1964 .
H.L. Smith. Monotone
dynamicla systems- An introduction to the theory of competitive and cooperative
systems . AMS ,
J. Smoller. Shock
waves and reaction - Diffusion equations, Springer,
A.S. Solodovnikov. Systems of linear inequalities, Mir,
L.H. Son, W. Tutschke and C.C. Yang. Finite or infinite
dimensional complex analysis and applications
, Kluwer Academic press, 2004,
Nguyeãn Thanh Sôn. Luaän lyù toaùn hoïc, NXB Khoa
Hoïc vaø kyõ thuaät, Haø noäi, (1997).
Nguyeãn Thanh Sôn. Lyù thuyeát taäp hôïp, NXB Khoa
Hoïc vaø kyõ thuaät, Haø noäi, (1999).
E. H. Spanier, Algebraic Topology, McGraw-Hill, New York, (1966).
T.A. Springer. Invariant theory (russian) . Mir, Moscow
, 1981 .
M. Spivack. Calculus
on manifolds , W.A. Benjamin, New-York,
(1965).
M. Spivack. A
comrehensive introduction to differential geometry II ,.
M. Spivak. The joy
of TEX , AMS,
V. Starjinski. Meùthodes appliqueùes en theùorie des
oscillations nonlineùaires . Mir , MOscow , 1985.
L.A. Steen and J.A. Seebach . Counterexamples in topology , Springer,
Berlin, (1978).
E.M. Stein. Singular
integrals and differentibility properties of functions , Princeton University
Press, Princeton, (1970).
E.M. Stein and G. Weiss. Introduction
to Fourier analysis on Euclidean spaces , Princeton
University
Press, Princeton, (1971).
E.M. Stein . Harmonic analysis - Real-variable methods, orthogonality, and
oscillatory integrals ,
Princeton University Press, Princeton, (1993).
G. Stephenson. Partial differential equations for scientists and engineers , Longman, London, (1986).
J.J. Stoker. Differential geometry . Harwood
Wiley-Interscience , New-York , 1969 .
G. Strang . Linear
algebra and its applications. (russian), Mir,
Moscow, (1980).
W. A. Strauss. Nonlinear wave equations , Regional
Conference series in Math. 73, Amer.Math.
Soc., Providence, (1989).
E. W. Stredulinsky . Weighted inequalities and degenerate elliptic partial differential
equations,
Lecture Notes in Math. 1074, Springer, Berlin, (1984).
S. Strelkov. Meùchanique, Mir, Moscow, (1978).
M. Struwe. Plateau
problem and the calculus of variations , Princeton
University Press, Princeton,
(1988).
M. Struwe. Variational
methods , Springer, Berlin, (1990).
M. Struwe. Variational
methods , Springer,
A.G. Sveshnikov and A.N. Tikhonov . The theory of functions of a complex variable . Mir ,
T. Suzuki . Semilinear
elliptic equations . Gakhotosho ,
A.T. Taldukii. Elementary applied functional analysis (russian). Higher School ,
Nguyeãn Coâng Taâm. Nhaäp moân phöông trình vaät lyù toaùn, NXB ÑHQG, Thaønh phoá Hoà Chí Minh,
(2001).
S.M. Targ. Giaùo
trình giaûn yeáu cô hoïc lyù thuyeát,(Phaïm Huyeãn di.ch), NXB Ñaïi hoïc
vaø trung hoïc
chuyeân nghieäp, Haø Noäi, (1966).
A. B. Tayler. Mathematical models in Applied mathematics . Clarendon Press ,
M. E. Taylor. Partial differential equations I : Basic theory . Springer ,
M. E. Taylor. Partial differential equations III : Nonlinear equations . Springer ,
R. Temam. Navier-Stokes
equations. Theory and numerical analysis . North-Holland
,
1977 .
R. Temam. Infinite-dimensional
dynamical systems in mechanics and physics . Springer , Berlin ,
1997.
R. Temam. Probleømes matheùmatiques en plasticiteù . Gauthier-Villars , Paris , 1983.
T. Y. Thomas. Tensor analysis and differential geometry . Academic Press , New-York , 1961 .
J.A. Thorpe. Elementary topics in differential geometry . Springer , Berlin , 1979.
J.A. Thorpe. Elementary topics in differential geometry .(russian) Mir , Moscow , 1982.
Nguyeãn Duy Tieán vaø Vuõ Vieát Yeân. Lyù thuyeát xaùx xuaát. NXB Giaùo
duïc, (2003).
A. Tikhonov and V. Arseùnine. Meùthodes de reùsolution de probleømes mal
poseùs , Mir,
Moscou,
(1976)
V. Treùnoguine. Analyse fonctionelle, Mir, Moscow, (1985).
V. Treùnoguine, B.M. Pisarebskii and T.S.Soboleva. Problems and equations in functional analysis.
(russian), Nauk, Moscow, (1984).
H. Triebel. Interpolation
theory function spaces differential operators. (russian), Mir, Moscow, (1980).
G.M. Troianiello. Elliptic differential equations and obstacle problems , Plenum Press, New-York,
(1987).
Ñaëng Ñöùc Troïng. Giaùo trình toaùn cao caáp - Phaàn I : Haøm moät bieán. Ñaïi Hoïc Khoa Hoïc Töï Nhieân
Thaønh Phoá Hoà Chí Minh, (1998).
Ngoâ Vieät Trung . Giaùo Trình ñaïi soá tuyeán tính, NXB ÑHQG
Haø noäi, Haø noäi (2001)
Vuõ Troïng Tuaán. Exercices in real and complex analysis . Toång Hôïp, Saigon , 1974.
B.O. Turesson. Nonlinear potential theory and weighted Sobolev spaces . Springer-Verlag , Berlin ,
2000.
Hoaøng Tuïy, Convex Analysis and Global
Optimization, Kluwer, Boston, London,
Bordrecht, (1997).
H. Urakawa. Calculus
of variations and harmonic maps ,
Translations of Mathematical Monographs
132, Amer.Math. Soc., Providence,
(1993).
M.M. Vainberg. Variational methods for the study of nonlinear operators . Holden-Day , Amsterdam
, 1964 .
G. Vainikko . Multidimensional weakly singular integral equations, Lecture Notes in Math. 1549,
Springer,
T. Valent, Boundary Value Problems of
Finite Elasticity, Local Theorems on Existence, Uniqueness
and Analytic Dependence on Data,
Springer-Verlag, World Publishing Corporation, (1988).
G. Valiron. Theùorie des fonctions . Masson , Paris , 1955.
Traàn Ñöùc Vaân . Phöông Trình Ñaïo haøm rieâng. Taäp 1, NXB ÑHQG Haø noäi, Haø noäi
(2000).
Traàn Ñöùc Vaân . Phöông Trình Ñaïo haøm rieâng. Taäp 2, NXB ÑHQG Haø noäi, Haø noäi
(2001).
C.J. Van Wyk. Data structures and C programs .
F.P. Vasilev. Methods of solving of extremal problems (russian) . Nauk,
F. Verhulst . Nonlinear differential equations and dynamical systems, Springer,
W.T. Vetterling, S.A. Teukolsky,W.H. Press and B.P. Flannery. Numerical
reciples - Example book
(pascal), Cambridge University Press,
A. Visintin, Models of phase
transitions,Birkhauser,
V.S. Vladimirov. Generalized functions in mathematical physics. (russian), Mir,
V.S. Vladimirov. Equations in mathematical physics. (russian), Mir, Moscow, (1981).
I.I. Vrabie . Compactness methods for nonlinear evolutions , Pitman, London, (1995).
B.Z. Vuliki. Introduction to the theory of partially ordered spaces , Woltres-Noordhoff, Groningen,
(1967).
S.H. Weintraub. Differential forms . Academic
Press , New-York , 1997 .
N.A. Weiss. Elementary
statistics . Addison-Wesley , Reading , 1993 .
W. L. Wendland, Elliptic Systems in the
Plane, Pitman Press, Bath, (1979).
M. Willem, Minimax theorems,Birkhauser, Boston, (1996).
T.J. Willmore. Total curvature in Riemannian gepmetry . Ellis Horwood , Chichester , 1984.
T.J. Willmore and N.J. Hitchin. Global Riemannian geometry . Ellis
Horwood , Chichester , 1984.
J. Wolf, Regularit"at Schwacher
L"osungen nichlinearer elliptischer und parabolischer systeme partieller
Differentialgleichungen mit Entartung. Der Fall 1 < p < 2. Dissertation,
Humboldtuniversit"
at zu Berlin, (2001).
S. Wolfram. Mathematica-
Reference guide . Addison-Wesley , New York , 1992.
S. Wolfram. Mathematica
(third edition). Addison-Wesley , New York , 1996.
Y-C. Wong. The
topology of uniform convergence on order bounde sets, Lecture Notes in Math.
531, Springer, Berlin, (1976).
Hung-Hsi Wu. The Bochner technique in differential geometry . Harwood Academic , New-York ,
1986? .
A.D. Wunsch. Complex variables with applications . Addison-Wesley , New York , 1994.
G. Wunsch. Fieldtheorie
- Band 1 : Mathematische Grundlagen . Veb Verlag
Technik Berlin , 1973.
K. Yosida . Functional
analysis , Springer, Berlin, (1974).
O. Zariski and P. Samuel, Commutative Algebra, vol. 1, Springer-Verlag, New York, (1958).
O. Zariski and P. Samuel, Commutative Algebra, vol. 2, D. Van Nostrand Company, Inc., Princeton,
New Jersey, (1960).
E. Zeidler . Nonlinear functional analysis and its applications I : Fixed point
theorems , Springer,
E. Zeidler . Nonlinear functional analysis and its applications II/A : Linear
monotone operators,
Springer,
E. Zeidler . Nonlinear functional analysis and its applications II/B : Nonlinear
monotone operators,
Springer,
E. Zeidler . Nonlinear functional analysis and its applications III :
Variational methods and optimization
, Springer,
E. Zeidler . Nonlinear functional analysis and its applications IV :
Applications to mathematical
physics , Springer,
W. P. Ziemer. Weakly differentiable functions , Springer,
K. Zhu, Operator Theory in Function Spaces, Marcel Dekker Inc.,,
A. Zygmund. Trigonometric
series I .
A. Zygmund. Trigonometric
series II .
???. Partial
differential equations , Proceedinds of Symposia in Pure
Mathematics 4, Amer.Math. V.S. Vladimirov. Equations in mathematical physics.
(russian), Mir, Moscow, (1981).
I.I. Vrabie . Compactness methods for nonlinear evolutions , Pitman, London, (1995).
B.Z. Vuliki. Introduction to the theory of partially ordered spaces , Woltres-Noordhoff, Groningen,
(1967).
S.H. Weintraub. Differential forms . Academic
Press , New-York , 1997 .
N.A. Weiss. Elementary
statistics . Addison-Wesley , Reading , 1993 .
W. L. Wendland, Elliptic Systems in the
Plane, Pitman Press, Bath, (1979).
M. Willem, Minimax theorems,Birkhauser, Boston, (1996).
T.J. Willmore. Total curvature in Riemannian gepmetry . Ellis Horwood , Chichester , 1984.
T.J. Willmore and N.J. Hitchin. Global Riemannian geometry . Ellis
Horwood , Chichester , 1984.
J. Wolf, Regularit"at Schwacher
L"osungen nichlinearer elliptischer und parabolischer systeme partieller
Differentialgleichungen mit Entartung. Der Fall 1 < p < 2. Dissertation,
Humboldtuniversit"
at zu Berlin, (2001).
S. Wolfram. Mathematica-
Reference guide . Addison-Wesley , New York , 1992.
S. Wolfram. Mathematica
(third edition). Addison-Wesley , New York , 1996.
Y-C. Wong. The
topology of uniform convergence on order bounde sets, Lecture Notes in Math.
531, Springer, Berlin, (1976).
Hung-Hsi Wu. The Bochner technique in differential geometry . Harwood Academic , New-York ,
1986? .
A.D. Wunsch. Complex variables with applications . Addison-Wesley , New York , 1994.
G. Wunsch. Fieldtheorie
- Band 1 : Mathematische Grundlagen . Veb Verlag
Technik Berlin , 1973.
K. Yosida . Functional
analysis , Springer, Berlin, (1974).
O. Zariski and P. Samuel, Commutative Algebra, vol. 1, Springer-Verlag, New York, (1958).
O. Zariski and P. Samuel, Commutative Algebra, vol. 2, D. Van Nostrand Company, Inc., Princeton,
New Jersey, (1960).
E. Zeidler . Nonlinear functional analysis and its applications I : Fixed point
theorems , Springer,
E. Zeidler . Nonlinear functional analysis and its applications II/A : Linear
monotone operators,
Springer,
E. Zeidler . Nonlinear functional analysis and its applications II/B : Nonlinear
monotone operators,
Springer,
E. Zeidler . Nonlinear functional analysis and its applications III :
Variational methods and optimization
, Springer,
E. Zeidler . Nonlinear functional analysis and its applications IV :
Applications to mathematical
physics , Springer,
W. P. Ziemer. Weakly differentiable functions , Springer,
K. Zhu, Operator Theory in Function Spaces, Marcel Dekker Inc.,,
A. Zygmund. Trigonometric
series I .
A. Zygmund. Trigonometric
series II .
???. Partial
differential equations , Proceedinds of Symposia in Pure
Mathematics 4, Amer.Math.