Khruslov, E. I︠A︡ (Evgeniĭ I︠A︡kovlevich)
Overview
Works:  10 works in 44 publications in 2 languages and 824 library holdings 

Roles:  Editor, Author, Other 
Publication Timeline
.
Most widely held works by
E. I︠A︡ Khruslov
Homogenization of partial differential equations by
V. A Marchenko(
)
24 editions published between 2005 and 2008 in English and Undetermined and held by 611 WorldCat member libraries worldwide
Homogenization is a method for modeling processes in microinhomogeneous media, which are encountered in radiophysics, filtration theory, rheology, elasticity theory, and other domains of mechanics, physics, and technology. These processes are described by PDEs with rapidly oscillating coefficients or boundary value problems in domains with complex microstructure. From the technical point of view, given the complexity of these processes, the best techniques to solve a wide variety of problems involve constructing appropriate macroscopic (homogenized) models. The present monograph is a comprehensive study of homogenized problems, based on the asymptotic analysis of boundary value problems as the characteristic scales of the microstructure decrease to zero. The work focuses on the construction of nonstandard models: nonlocal models, multicomponent models, and models with memory. Along with complete proofs of all main results, numerous examples of typical structures of microinhomogeneous media with their corresponding homogenized models are provided. Graduate students, applied mathematicians, physicists, and engineers will benefit from this monograph, which may be used in the classroom or as a comprehensive reference text
24 editions published between 2005 and 2008 in English and Undetermined and held by 611 WorldCat member libraries worldwide
Homogenization is a method for modeling processes in microinhomogeneous media, which are encountered in radiophysics, filtration theory, rheology, elasticity theory, and other domains of mechanics, physics, and technology. These processes are described by PDEs with rapidly oscillating coefficients or boundary value problems in domains with complex microstructure. From the technical point of view, given the complexity of these processes, the best techniques to solve a wide variety of problems involve constructing appropriate macroscopic (homogenized) models. The present monograph is a comprehensive study of homogenized problems, based on the asymptotic analysis of boundary value problems as the characteristic scales of the microstructure decrease to zero. The work focuses on the construction of nonstandard models: nonlocal models, multicomponent models, and models with memory. Along with complete proofs of all main results, numerous examples of typical structures of microinhomogeneous media with their corresponding homogenized models are provided. Graduate students, applied mathematicians, physicists, and engineers will benefit from this monograph, which may be used in the classroom or as a comprehensive reference text
Spectral theory and differential equations : V.A. Marchenko's 90th anniversary collection by
V. A Marchenko(
Book
)
8 editions published in 2014 in English and held by 167 WorldCat member libraries worldwide
A feschrift of contributed articles in honor of V. A. Marchenko's 90th birthday. 
8 editions published in 2014 in English and held by 167 WorldCat member libraries worldwide
A feschrift of contributed articles in honor of V. A. Marchenko's 90th birthday. 
Kraevye zadachi v oblasti︠a︡kh s melkozernistoĭ granit︠s︡eĭ by
V. A Marchenko(
Book
)
1 edition published in 1974 in Russian and held by 20 WorldCat member libraries worldwide
1 edition published in 1974 in Russian and held by 20 WorldCat member libraries worldwide
Kraevye zadači v oblastjach s melkozernistoj graničej by
V. A Marchenko(
Book
)
5 editions published in 1974 in Russian and Undetermined and held by 11 WorldCat member libraries worldwide
5 editions published in 1974 in Russian and Undetermined and held by 11 WorldCat member libraries worldwide
Spectral theory and differential equations V.A. Marchenko's 90th anniversary collection(
Book
)
1 edition published in 2014 in English and held by 7 WorldCat member libraries worldwide
1 edition published in 2014 in English and held by 7 WorldCat member libraries worldwide
Global weak solutions of the NavierStokesVlasovPoisson system by Olga Anoschenko(
Book
)
1 edition published in 2008 in English and held by 3 WorldCat member libraries worldwide
1 edition published in 2008 in English and held by 3 WorldCat member libraries worldwide
Usrednennye modeli mikroneodnorodnykh sred by
V. A Marchenko(
Book
)
1 edition published in 2006 in Russian and held by 2 WorldCat member libraries worldwide
1 edition published in 2006 in Russian and held by 2 WorldCat member libraries worldwide
Homogenization Of Partial Differential Equations. Progress in Mathematical Physics, Volume 46(
)
1 edition published in 2006 in English and held by 1 WorldCat member library worldwide
Homogenization is a method for modeling processes in microinhomogeneous media, which are encountered in radiophysics, filtration theory, rheology, elasticity theory, and other domains of mechanics, physics, and technology. These processes are described by PDEs with rapidly oscillating coefficients or boundary value problems in domains with complex microstructure. From the technical point of view, given the complexity of these processes, the best techniques to solve a wide variety of problems involve constructing appropriate macroscopic (homogenized) models. The present monograph is a comprehensive study of homogenized problems, based on the asymptotic analysis of boundary value problems as the characteristic scales of the microstructure decrease to zero. The work focuses on the construction of nonstandard models: nonlocal models, multicomponent models, and models with memory. Along with complete proofs of all main results, numerous examples of typical structures of microinhomogeneous media with their corresponding homogenized models are provided. Graduate students, applied mathematicians, physicists, and engineers will benefit from this monograph, which may be used in the classroom or as a comprehensive reference text
1 edition published in 2006 in English and held by 1 WorldCat member library worldwide
Homogenization is a method for modeling processes in microinhomogeneous media, which are encountered in radiophysics, filtration theory, rheology, elasticity theory, and other domains of mechanics, physics, and technology. These processes are described by PDEs with rapidly oscillating coefficients or boundary value problems in domains with complex microstructure. From the technical point of view, given the complexity of these processes, the best techniques to solve a wide variety of problems involve constructing appropriate macroscopic (homogenized) models. The present monograph is a comprehensive study of homogenized problems, based on the asymptotic analysis of boundary value problems as the characteristic scales of the microstructure decrease to zero. The work focuses on the construction of nonstandard models: nonlocal models, multicomponent models, and models with memory. Along with complete proofs of all main results, numerous examples of typical structures of microinhomogeneous media with their corresponding homogenized models are provided. Graduate students, applied mathematicians, physicists, and engineers will benefit from this monograph, which may be used in the classroom or as a comprehensive reference text
Spectral theory and differential equations : V. A. Marchenko's 90th anniversary collection(
Book
)
1 edition published in 2014 in English and held by 1 WorldCat member library worldwide
1 edition published in 2014 in English and held by 1 WorldCat member library worldwide
Usrednennye modeli mikroneodnorodnyh sred by
V. A Marchenko(
Book
)
1 edition published in 2005 in Russian and held by 1 WorldCat member library worldwide
1 edition published in 2005 in Russian and held by 1 WorldCat member library worldwide
Audience Level
0 

1  
Kids  General  Special 
Related Identities
 Marchenko, V. A. (Vladimir Aleksandrovich) 1922 Honoree Author
 Shepelsky, D. (Dmitry) Translator Editor
 Goncharenko, M. (Mariya) Translator
 Pastur, L. A. (Leonid Andreevich) Editor
 Sternheimer, D. Other
 Berenstein, C. Other
 Tracy, C. Other
 Berry, M. Other
 Fokas, A. S. Other
 Blanchard, P. Other
Useful Links
Associated Subjects
Boundary value problems Differential equations Differential equations, Partial Dynamics Engineering Engineering mathematics Functional analysis Homogenization (Differential equations) Mathematical optimization Mathematical physics Mathematics Physics Spectral theory (Mathematics) Statistical physics
Covers
Alternative Names
Hruslov, E. Â.
Hruslov, Evgenij Âkovlevič.
Khruslov, E.
Khruslov, E. 1937
Khruslov, E. Ya 1937
Khruslov, Evgenii 1937
Khruslov, Evgeniĭ I︠A︡kovlevich
Khruslov, Evgueni Ya.
Khruslov, Evgueni Ya 1937
Khruslov, Evgueni Yakovlevich 1937
Хруслов, Е. Я. (Евгений Яковлевич)
Languages