Matematicheskiĭ institut im. V.A. Steklova
Overview
Works:  326 works in 519 publications in 4 languages and 6,738 library holdings 

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Most widely held works about
Matematicheskiĭ institut im. V.A. Steklova
Most widely held works by
Matematicheskiĭ institut im. V.A. Steklova
Mathematics, its content, methods, and meaning by
Matematicheskiĭ institut im. V.A. Steklova(
Book
)
18 editions published between 1963 and 1993 in English and held by 1,322 WorldCat member libraries worldwide
This major survey features the work of 18 outstanding mathematicians. Primary subjects include analytic geometry, algebra, ordinary and partial differential equations, the calculus of variations, functions of a complex variable, prime numbers, and theories of probability and functions. Other topics include linear and nonEuclidean geometry, topology, functional analysis, more
18 editions published between 1963 and 1993 in English and held by 1,322 WorldCat member libraries worldwide
This major survey features the work of 18 outstanding mathematicians. Primary subjects include analytic geometry, algebra, ordinary and partial differential equations, the calculus of variations, functions of a complex variable, prime numbers, and theories of probability and functions. Other topics include linear and nonEuclidean geometry, topology, functional analysis, more
Proceedings of the Steklov Institute of Mathematics by
Matematicheskiĭ institut im. V.A. Steklova(
)
in English and Undetermined and held by 902 WorldCat member libraries worldwide
Proceedings of the Steklov Institute of Mathematics is a covertocover translation of the Trudy Matematicheskogo Instituta imeni V.A. Steklova of the Russian Academy of Sciences. Each issue ordinarily contains either one booklength article or a collection of articles pertaining to the same topic
in English and Undetermined and held by 902 WorldCat member libraries worldwide
Proceedings of the Steklov Institute of Mathematics is a covertocover translation of the Trudy Matematicheskogo Instituta imeni V.A. Steklova of the Russian Academy of Sciences. Each issue ordinarily contains either one booklength article or a collection of articles pertaining to the same topic
Stability problems for stochastic models : proceedings of the 6th international seminar, held in Moscow, USSR, April 1982 by
Vladimir Vi︠a︡cheslavovich Kalashnikov(
Book
)
6 editions published between 1983 and 1985 in English and held by 556 WorldCat member libraries worldwide
6 editions published between 1983 and 1985 in English and held by 556 WorldCat member libraries worldwide
Stability problems for stochastic models : proceedings of the 11th International Seminar held in Sukhumi (Abkhazian Autonomous
Republic) USSR, Sept. 25Oct. 1, 1987 by
Vladimir Vi︠a︡cheslavovich Kalashnikov(
Book
)
2 editions published in 1989 in English and held by 254 WorldCat member libraries worldwide
Traditionally the Stability seminar, organized in Moscow but held in different locations, has dealt with a spectrum of topics centering around characterization problems and their stability, limit theorems, probabil ity metrics and theoretical robustness. This volume likewise focusses on these main topics in a series of original and recent research articles
2 editions published in 1989 in English and held by 254 WorldCat member libraries worldwide
Traditionally the Stability seminar, organized in Moscow but held in different locations, has dealt with a spectrum of topics centering around characterization problems and their stability, limit theorems, probabil ity metrics and theoretical robustness. This volume likewise focusses on these main topics in a series of original and recent research articles
Selected works by
I. M Vinogradov(
Book
)
7 editions published between 1984 and 1985 in English and held by 251 WorldCat member libraries worldwide
I.M. Vinogradov (1891  1983) was one of the creators of modern analytic number theory. He graduated from the University of St. Petersburg, where in 1920 he became a Professor. From 1934 he was a Director of the Steklov Institute of Mathematics, a position he held for the rest of his life, except for five years during World War II. This edition includes a selection of articles, chosen by the author himself, which highlight the important stages of his scientific career. In addition to some early works, it contains the initial proofs of many of Vinogradov's basic theorems as well as the later improved versions, and also two substantial monographs
7 editions published between 1984 and 1985 in English and held by 251 WorldCat member libraries worldwide
I.M. Vinogradov (1891  1983) was one of the creators of modern analytic number theory. He graduated from the University of St. Petersburg, where in 1920 he became a Professor. From 1934 he was a Director of the Steklov Institute of Mathematics, a position he held for the rest of his life, except for five years during World War II. This edition includes a selection of articles, chosen by the author himself, which highlight the important stages of his scientific career. In addition to some early works, it contains the initial proofs of many of Vinogradov's basic theorems as well as the later improved versions, and also two substantial monographs
Mathematics, its content, methods and meaning by
Matematicheskiĭ institut im. V.A. Steklova(
Book
)
in English and held by 250 WorldCat member libraries worldwide
in English and held by 250 WorldCat member libraries worldwide
Trudy Matematicheskogo instituta imeni V.A. Steklova = Travaux de l'Institut mathématique Stekloff by
Matematicheskiĭ institut im. V.A. Steklova(
)
in 3 languages and held by 220 WorldCat member libraries worldwide
in 3 languages and held by 220 WorldCat member libraries worldwide
Toeplitz operators and spectral function theory : essays from the Leningrad Seminar on Operator Theory by Seminar on Operator Theory(
Book
)
3 editions published in 1989 in English and held by 173 WorldCat member libraries worldwide
The volume contains selected papers of the Spectral Function Theory seminar, Leningrad Branch of Steklov Mathematical Institute. The papers are mostly devoted to the theory of Toeplitz and model operators. These subjects are considered here from various points of view. Several papers concern the relationships of Toeplitz operators to weighted polynomial approximation. Namely, two papers by B. Solomyak and A. Volberg intensively treat the problem of spectra! multiplicity f~r analytic Toeplitz operators (which are, in fact, multiplication operators) and my paper can serve as an introduction to the problem. This theme of multiplicities is continued in a paper by V. Vasyunin where the multiplicity of the spectrum is computed for Hilbert space contractions with finite defect indices. V. Peller's paper deals with a perturbation theory problem for Toeplitz operators. In a paper by D. Yakubovich a new similarity model for a class of Toeplitz operators is constructed. S. Treil' presents a survey of a part of spectral function theory for vector valued function (SzegoKolmogorov extreme prob!ems for operator weights, bases of vector rational functions, estimations of Hilbert transform with respect to operator weights, the operator corona problem). As a concluding remark I dare only note that the whole collection convinces us once more without a doubt of the fruitfullness of the natural union of operator theory and complex analysis (if at all the union of these fields is at all different from their intersection)
3 editions published in 1989 in English and held by 173 WorldCat member libraries worldwide
The volume contains selected papers of the Spectral Function Theory seminar, Leningrad Branch of Steklov Mathematical Institute. The papers are mostly devoted to the theory of Toeplitz and model operators. These subjects are considered here from various points of view. Several papers concern the relationships of Toeplitz operators to weighted polynomial approximation. Namely, two papers by B. Solomyak and A. Volberg intensively treat the problem of spectra! multiplicity f~r analytic Toeplitz operators (which are, in fact, multiplication operators) and my paper can serve as an introduction to the problem. This theme of multiplicities is continued in a paper by V. Vasyunin where the multiplicity of the spectrum is computed for Hilbert space contractions with finite defect indices. V. Peller's paper deals with a perturbation theory problem for Toeplitz operators. In a paper by D. Yakubovich a new similarity model for a class of Toeplitz operators is constructed. S. Treil' presents a survey of a part of spectral function theory for vector valued function (SzegoKolmogorov extreme prob!ems for operator weights, bases of vector rational functions, estimations of Hilbert transform with respect to operator weights, the operator corona problem). As a concluding remark I dare only note that the whole collection convinces us once more without a doubt of the fruitfullness of the natural union of operator theory and complex analysis (if at all the union of these fields is at all different from their intersection)
Geometry, topology, and mathematical physics : S.P. Novikov's seminar, 20062007 by
S.P Novikov(
Book
)
2 editions published in 2008 in English and held by 161 WorldCat member libraries worldwide
"This volume contains a selection of papers based on presentations given in 20062007 at the S.P. Novikov Seminar at the Steklov Mathematical Institute in Moscow. The articles address topics in geometry, topology, and mathematical physics. The volume is suitable for graduate students and researchers interested in the corresponding areas of mathematics and physics."Jacket
2 editions published in 2008 in English and held by 161 WorldCat member libraries worldwide
"This volume contains a selection of papers based on presentations given in 20062007 at the S.P. Novikov Seminar at the Steklov Mathematical Institute in Moscow. The articles address topics in geometry, topology, and mathematical physics. The volume is suitable for graduate students and researchers interested in the corresponding areas of mathematics and physics."Jacket
Topology, ordinary differential equations, dynamical systems by Eugenii F Mishchenko(
Book
)
2 editions published in 1986 in English and held by 152 WorldCat member libraries worldwide
2 editions published in 1986 in English and held by 152 WorldCat member libraries worldwide
Stochastic differential systems : filtering and control : proceedings of the IFIPWG 7/1 working conference, Vilnius, Lithuania,
USSR, Aug. 28Sept. 2, 1978 by International federation for information processing(
Book
)
5 editions published in 1980 in English and held by 148 WorldCat member libraries worldwide
5 editions published in 1980 in English and held by 148 WorldCat member libraries worldwide
Theory and applications of differentiable functions of several variables by
S. M Nikolʹskiĭ(
Book
)
21 editions published between 1967 and 1994 in English and Russian and held by 138 WorldCat member libraries worldwide
21 editions published between 1967 and 1994 in English and Russian and held by 138 WorldCat member libraries worldwide
Anglorusskiĭ slovar' matematicheskikh terminov / P.S. Aleksandrov ... [i. dr.] by
Matematicheskiĭ institut im. V.A. Steklova(
Book
)
8 editions published between 1962 and 1994 in Russian and English and held by 137 WorldCat member libraries worldwide
8 editions published between 1962 and 1994 in Russian and English and held by 137 WorldCat member libraries worldwide
The RiemannHilbert problem by
D. V Anosov(
Book
)
4 editions published in 1994 in English and held by 120 WorldCat member libraries worldwide
This book is devoted to Hilbert's 21st problem (the RiemannHilbert problem) which belongs to the theory of linear systems of ordinary differential equations in the complex domain. The problem concems the existence of a Fuchsian system with prescribed singularities and monodromy. Hilbert was convinced that such a system always exists. However, this tumed out to be a rare case of a wrong forecast made by hirn. In 1989 the second author (A.B.) discovered a counterexample, thus 1 obtaining a negative solution to Hilbert's 21st problem. After we recognized that some "data" (singularities and monodromy) can be obtai ned from a Fuchsian system and some others cannot, we are enforced to change our point of view. To make the terminology more precise, we shaII caII the foIIowing problem the RiemannHilbert problem for such and such data: does there exist a Fuchsian system having these singularities and monodromy? The contemporary version of the 21 st Hilbert problem is to find conditions implying a positive or negative solution to the RiemannHilbert problem
4 editions published in 1994 in English and held by 120 WorldCat member libraries worldwide
This book is devoted to Hilbert's 21st problem (the RiemannHilbert problem) which belongs to the theory of linear systems of ordinary differential equations in the complex domain. The problem concems the existence of a Fuchsian system with prescribed singularities and monodromy. Hilbert was convinced that such a system always exists. However, this tumed out to be a rare case of a wrong forecast made by hirn. In 1989 the second author (A.B.) discovered a counterexample, thus 1 obtaining a negative solution to Hilbert's 21st problem. After we recognized that some "data" (singularities and monodromy) can be obtai ned from a Fuchsian system and some others cannot, we are enforced to change our point of view. To make the terminology more precise, we shaII caII the foIIowing problem the RiemannHilbert problem for such and such data: does there exist a Fuchsian system having these singularities and monodromy? The contemporary version of the 21 st Hilbert problem is to find conditions implying a positive or negative solution to the RiemannHilbert problem
Topology, geometry, integrable systems, and mathematical physics : Novikov's seminar, 20122014 by S. P. Novikov Seminar(
Book
)
1 edition published in 2014 in English and held by 101 WorldCat member libraries worldwide
Articles in this collection are devoted to modern problems of topology, geometry, mathematical physics, and integrable systems, and they are based on talks given at the famous Novikov's seminar at the Steklov Institute of Mathematics in Moscow in 20122014. The articles cover many aspects of seemingly unrelated areas of modern mathematics and mathematical physics; they reflect the main scientific interests of the organizer of the seminar, Sergey Petrovich Novikov. The volume is suitable for graduate students and researchers interested in the corresponding areas of mathematics and physics
1 edition published in 2014 in English and held by 101 WorldCat member libraries worldwide
Articles in this collection are devoted to modern problems of topology, geometry, mathematical physics, and integrable systems, and they are based on talks given at the famous Novikov's seminar at the Steklov Institute of Mathematics in Moscow in 20122014. The articles cover many aspects of seemingly unrelated areas of modern mathematics and mathematical physics; they reflect the main scientific interests of the organizer of the seminar, Sergey Petrovich Novikov. The volume is suitable for graduate students and researchers interested in the corresponding areas of mathematics and physics
Algebraic geometry and its applications : proceedings of the 8th Algebraic Geometry Conference, Yaroslavlʹ 1992 by
Alexander Tikhomirov(
Book
)
4 editions published in 1994 in English and German and held by 77 WorldCat member libraries worldwide
This volume consists of articles presented as talks at the Algebraic Geometry Conference held in the State Pedagogical Institute of Yaroslavl'from August 10 to 14, 1992. These conferences in Yaroslavl' have become traditional in the former USSR, now in Russia, since January 1979, and are held at least every two years. The present conference, the eighth one, was the first in which several foreign mathematicians participated. From the Russian side, 36 specialists in algebraic geometry and related fields (invariant theory, topology of manifolds, theory of categories, mathematical physics etc.) were present. As well modern directions in algebraic geometry, such as the theory of exceptional bundles and helices on algebraic varieties, moduli of vector bundles on algebraic surfaces with applications to Donaldson's theory, geometry of Hilbert schemes of points, twistor spaces and applications to string theory, as more traditional areas, such as birational geometry of manifolds, adjunction theory, Hodge theory, problems of rationality in the invariant theory, topology of complex algebraic varieties and others were represented in the lectures of the conference. In the following we will give a brief sketch of the contents of the volume. In the paper of W.L. Baily three problems of algebrogeometric nature are posed. They are connected with hermitian symmetric tube domains. In particular, the 27dimensional tube domain 'Fe is treated, on which a certain real form of E7 acts, which contains a "nice" arithmetic subgroup r e, as observed earlier by W. Baily
4 editions published in 1994 in English and German and held by 77 WorldCat member libraries worldwide
This volume consists of articles presented as talks at the Algebraic Geometry Conference held in the State Pedagogical Institute of Yaroslavl'from August 10 to 14, 1992. These conferences in Yaroslavl' have become traditional in the former USSR, now in Russia, since January 1979, and are held at least every two years. The present conference, the eighth one, was the first in which several foreign mathematicians participated. From the Russian side, 36 specialists in algebraic geometry and related fields (invariant theory, topology of manifolds, theory of categories, mathematical physics etc.) were present. As well modern directions in algebraic geometry, such as the theory of exceptional bundles and helices on algebraic varieties, moduli of vector bundles on algebraic surfaces with applications to Donaldson's theory, geometry of Hilbert schemes of points, twistor spaces and applications to string theory, as more traditional areas, such as birational geometry of manifolds, adjunction theory, Hodge theory, problems of rationality in the invariant theory, topology of complex algebraic varieties and others were represented in the lectures of the conference. In the following we will give a brief sketch of the contents of the volume. In the paper of W.L. Baily three problems of algebrogeometric nature are posed. They are connected with hermitian symmetric tube domains. In particular, the 27dimensional tube domain 'Fe is treated, on which a certain real form of E7 acts, which contains a "nice" arithmetic subgroup r e, as observed earlier by W. Baily
Discrete geometry and geometry of numbers : collected papers dedicated to the 70th birthday of Professor Sergei Sergeevich
Ryshkov by
Sergeĭ Sergeevich Ryshkov(
Book
)
3 editions published in 2002 in English and held by 64 WorldCat member libraries worldwide
3 editions published in 2002 in English and held by 64 WorldCat member libraries worldwide
The boundary value problems of mathematical physics by
O. A Ladyzhenskai︠a︡(
Book
)
9 editions published between 1967 and 1991 in 3 languages and held by 62 WorldCat member libraries worldwide
In the present edition I have included "Supplements and Problems" located at the end of each chapter. This was done with the aim of illustrating the possibilities of the methods contained in the book, as well as with the desire to make good on what I have attempted to do over the course of many years for my studentsto awaken their creativity, providing topics for independent work. The source of my own initial research was the famous twovolume book Methods of Mathematical Physics by D. Hilbert and R. Courant, and a series of original articles and surveys on partial differential equations and their applications to problems in theoretical mechanics and physics. The works of K. o. Friedrichs, which were in keeping with my own perception of the subject, had an especially strong influence on me. I was guided by the desire to prove, as simply as possible, that, like systems of n linear algebraic equations in n unknowns, the solvability of basic boundary value (and initialboundary value) problems for partial differential equations is a consequence of the uniqueness theorems in a "sufficiently large" function space. This desire was successfully realized thanks to the introduction of various classes of general solutions and to an elaboration of the methods of proof for the corresponding uniqueness theorems. This was accomplished on the basis of comparatively simple integral inequalities for arbitrary functions and of a priori estimates of the solutions of the problems without enlisting any special representations of those solutions
9 editions published between 1967 and 1991 in 3 languages and held by 62 WorldCat member libraries worldwide
In the present edition I have included "Supplements and Problems" located at the end of each chapter. This was done with the aim of illustrating the possibilities of the methods contained in the book, as well as with the desire to make good on what I have attempted to do over the course of many years for my studentsto awaken their creativity, providing topics for independent work. The source of my own initial research was the famous twovolume book Methods of Mathematical Physics by D. Hilbert and R. Courant, and a series of original articles and surveys on partial differential equations and their applications to problems in theoretical mechanics and physics. The works of K. o. Friedrichs, which were in keeping with my own perception of the subject, had an especially strong influence on me. I was guided by the desire to prove, as simply as possible, that, like systems of n linear algebraic equations in n unknowns, the solvability of basic boundary value (and initialboundary value) problems for partial differential equations is a consequence of the uniqueness theorems in a "sufficiently large" function space. This desire was successfully realized thanks to the introduction of various classes of general solutions and to an elaboration of the methods of proof for the corresponding uniqueness theorems. This was accomplished on the basis of comparatively simple integral inequalities for arbitrary functions and of a priori estimates of the solutions of the problems without enlisting any special representations of those solutions
Probability theory and mathematical statistics : proceedings of the Fifth Vilnius Conference, June 25July 1, 1989 by Vilnius Conference on Probability Theory and Mathematical Statistics(
Book
)
2 editions published in 1990 in English and held by 35 WorldCat member libraries worldwide
2 editions published in 1990 in English and held by 35 WorldCat member libraries worldwide
Teorii︠a︡ veroi︠a︡tnosteĭ i matematicheskai︠a︡ statistika. Izbr. trudy by
N. V Smirnov(
Book
)
2 editions published in 1970 in Russian and held by 30 WorldCat member libraries worldwide
2 editions published in 1970 in Russian and held by 30 WorldCat member libraries worldwide
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Related Identities
 Aleksandrov, A. D. (Aleksandr Danilovich) 19121999 Author Editor
 Золотарев, В. М Editor
 Всесоюзный научноисследовательский институт системных исследований
 Калашников, Владимир Вячеславович Editor
 American Mathematical Society
 Faddeev, L. D. Editor
 Ужгородський державний університет
 Международный научноисследовательский институт проблем управления
 Novikov, S. P. (Sergeĭ Petrovich)
 Buchstaber, V. M. Editor
Associated Subjects
Boundary value problems Differentiable functions Differential equations Differential equations, Partial Differential equationsNumerical solutions Discrete geometry Distribution (Probability theory) Electronic journals Engineering English language Functions Functions of complex variables Functions of several real variables Geometry Geometry, Algebraic Geometry, Differential Geometry of numbers Hamiltonian systems Hydrodynamics Matematicheskiĭ institut im. V.A. Steklova Mathematical physics Mathematical statistics Mathematics NavierStokes equations Number theory Operator theory Physics Probabilities Programming (Mathematics) Quantum field theory RiemannHilbert problems Russian language Spectral theory (Mathematics) Stability Stochastic differential equations Stochastic processes Stochastic systems System analysis Toeplitz operators Topology Transport theory Variables (Mathematics) Vinogradov, I. M.(Ivan Matveevich),
Alternative Names
Fizikomatematicheskiĭ institut im. V.A. Steklova. Otdel matematicheskiĭ
Académie des Sciences de l'URSS Institut Mathématique Stekloff
Académie des Sciences de Russie Institut Mathématique Stekloff
Academy of Sciences of the USSR Steklov Mathematical Institute
Academy of Sciences of the USSR V. A. Steklov Mathematical Institute
Akademiâ nauk Soûza Sovetskih Socialističeskih Respublik. Matematičeskij Institut im. Steklova.
Akademiâ nauk SSSR. Matematičeskij institut im. V. A. Steklova.
Akademii︠a︡ nauk SSSR. Matematicheskiĭ institut
Akademii︠a︡ nauk SSSR. Matematicheskiĭ institut im. V.A. Steklova
Akademija nauk SSSR. Institut de mathématiques V.A. Steklov
Akademija Nauk SSSR Institut Mathématique Stekloff
Akademija nauk SSSR. Matematičeskij institut
Akademija nauk SSSR. Matematičeskij institut im. V.A. Steklova
Akademija Nauk SSSR Matematičeskij Institut Imeni V.A. Steklova
Akademija Nauk SSSR Ordena Lenina i Ordena Oktjabrskoj Revoljucii Matematičeskij Institut Imeni V. A. Steklova
Akademija Nauk SSSR Ordena Lenina Matematičeskij Institut Imeni V.A. Steklova
Akademija Nauk SSSR Steklov Institute of Mathematics
Akademija nauk SSSR. Steklov Mathematical Institute
Akademija Nauk SSSR V. A. Steklov Mathematical Institute
Institut de mathématiques V.A. Steklov
Institut matematiki im. V.A. Steklova
Institut mathématique Stekloff
Matematičeskij institut
Matematičeskij institut (Akademija nauk SSSR)
Matematičeskij institut AN SSSR.
Matematičeskij institut im. V.A. Steklova
Matematičeskij institut im. V. A. Steklova AN SSSR.
Matematičeskij institut im. V. A. Steklova RAN.
Matematičeskij institut imeni V.A. Steklova
Matematicheskiĭ institut
Matematicheskiĭ institut (Akademii︠a︡ nauk SSSR)
Matematicheskiĭ institut AN SSSR
Matematicheskiĭ institut im. V.A. Steklova
Matematicheskiĭ institut im. V.A. Steklova AN SSSR
Matematicheskiĭ institut imeni V.A. Steklova
Matematicheskij institut AN SSSR
Matematicheskij institut im. V.A. Steklova AN SSSR
MIAN
Ordena Lenina i ordena Okti︠a︡brʹskoĭ Revoli︠u︡t︠s︡ii Matematicheskiĭ institut imeni V.A. Steklova
Ordena Lenina i Ordena Oktjabrskoj Revoljucii Matematičeskij Institut Imeni V. A. Steklova
Ordena Lenina Matematičeskij Institut Imeni V.A. Steklova
Ordena Lenina Matematicheskiĭ institut imeni V.A. Steklova
Rossiĭskai︠a︡ akademii︠a︡ nauk. Matematicheskiĭ institut im. V.A. Steklova
Rossijskaâ akademiâ nauk. Matematičeskij institut im. V. A. Steklova.
Rossijskaja Akademija Nauk Institut Mathématique Stekloff
Rossijskaja akademija nauk Matematičeskij institut im. V.A. Steklova
Rossijskaja Akademija Nauk Matematičeskij Institut Imeni V. A. Steklova
Rossijskaja Akademija Nauk Steklov Institute of Mathematics
Rossijskaja Akademija Nauk Steklov Mathematical Institute
Rossijskaja Akademija Nauk V. A. Steklov Mathematical Institute
Russian Academy of Sciences Steklov Institute of Mathematics
Russian Academy of Sciences Steklov Mathematical Institute
Russian Academy of Sciences. Steklov V. A. Institute of Mathematics.
Russian Academy of Sciences V. A. Steklov Mathematical Institute
Steklov Institute of Mathematics
Steklov Mathematical Institute
Steklov Mathematical Institute Academy of Sciences of the USSR.
Steklov Mathematical Institute of the Academy of Sciences of the USSR
Steklov Mathematical Institute of the Russian Academy of Sciences.
Steklov V. A. Institute of Mathematics.
V.A. Steklov Institute of Mathematics
V. A. Steklov Mathematical Institute
Академия наук СССР. Математический институт им. В.А. Стеклова
Математический институт им. В.А. Стеклова
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