THE REFINED SOBOLEV SCALE, INTERPOLATION, AND ELLIPTIC PROBLEMS

被引：32

作者：

Mikhailets, Vladimir A. ^{[1
]}

Murach, Aleksandr A. ^{[1
,2
]}

机构：

[1] Natl Acad Sci Ukraine, Inst Math, UA-01601 Kiev 4, Ukraine

[2] Chernigiv State Technol Univ, UA-14027 Chernigiv, Ukraine

来源：

BANACH JOURNAL OF MATHEMATICAL ANALYSIS | 2012年 / 6卷 / 02期

关键词：

Sobolev scale; Hormander spaces; interpolation with function parameter; elliptic operator; elliptic boundary-value problem; DIFFERENTIAL EQUATIONS; CONTINUITY ENVELOPES; FUNCTION PARAMETER; BOUNDARY-PROBLEMS; SHARP EMBEDDINGS; SPACES; OPERATORS; EIGENVALUES; SYSTEMS; LP;

D O I：

10.15352/bjma/1342210171

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

The paper gives a detailed survey of recent results on elliptic problems in Hilbert spaces of generalized smoothness. The latter are the isotropic Hormander spaces H-s,H-phi := B-2,B-mu with mu(xi) = <xi >(s) phi(<xi >) is an element of R-n. They are parametrized by both the real number s and the positive function phi varying slowly at +infinity in the Karamata sense. These spaces form the refined Sobolev scale, which is much finer than the Sobolev scale {H-8} equivalent to {H-s,H-1} and is closed with respect to the interpolation with a function parameter. The Fredholm property of elliptic operators and elliptic boundary-value problems is preserved for this new scale. Theorems of various type about a solvability of elliptic problems are given. A local refined smoothness is investigated for solutions to elliptic equations. New sufficient conditions for the solutions to have continuous derivatives are found. Some applications to the spectral theory of elliptic operators are given.

引用

页码：211 / 281

页数：71

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