Homogenization : in memory of Serguei Kozlov
Author(s)
Bibliographic Information
Homogenization : in memory of Serguei Kozlov
(Series on advances in mathematics for applied sciences, vol. 50)
World Scientific, c1999
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Hokkaido University, Library, Graduate School of Science, Faculty of Science and School of Science図書
515.353/K8492070475118
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Description and Table of Contents
Description
This is a memorial volume in honor of Serguei Kozlov, one of the founders of homogenization, a new branch of mathematical physics. This volume contains original contributions of leading world experts in the field.
Table of Contents
- Serguei Kozlov - a review of scientific contributions, A. Beliaev and V. Jikov
- critical path analysis of transport in highly disordered random media, K.M. Golden and S.M. Kozlov
- multiscaled homogenization, V.V. Jikov and S.M. Kozlov
- the effective thermoconductivity and shear modulus of a lattice structure - an asymptotic analysis, S.M. Kozlov and G.P. Panasenko
- multiparametric problems of homogenization theory, N.S. Bakhvalov and M.E. Eglit
- nonlinear Darcy law in a random porous medium, A. Yu Beliaev
- distribution of minimum values of weakly stochastic functionals, V. Berdichevsky
- asymmetric strain-stress distribution function for crystal with random point defects, L. Beryland
- optimal design for uncertain loading condition, A. Cherkaev and E. Cherkaeva
- effective properties of a plane two-phase elastic composites - coupled bulk-shear moduli bounds, L.V. Gibiansky
- homogenization of the Laplace equation in a partially perforated domain, W. Jager and A. Mikelic
- control in the coefficients of linear hyperbolic equations via spacio-temporal components, K.A. Lurie
- multiscale avergaging for ordinary differential equations - applications to the spectral theory of one-dimensional Schrodinger operators with sparse potentials, S.A. Molchanov
- remarks on an estimate of Serguei Kozlov, U. Mosco
- central limit theorem and spectral asymptotics for nonlinear stochastic partial differential equation with weak nonlinearity, A.L. Piatnitski.
by "Nielsen BookData"