Modifications of the Gehring lemma appearing in the study of parabolic initial-boundary-value problems

Abstract

Some modifications of the Gehring lemma are required in the study of solutions to parabolic initialboundary-value problems, The Gehring lemma assert that if a function satisfies the reverse Holder inequalitites in a cube, then the integrability degree of this function in Q increases in this cube. Earlier, the author formulated some generalizations of the Gehring lemma and used them in the study of parabolic quasilinear systems with controlled nonlinearity orders. In this paper, the proof of these generalizations are given. On the basis of the modification of the Gehring lemma proposed by the author, the theorem on the reverse Holder inequalities is formulated in a form convenient for obtaining Lp-estimates for the derivatives of solutions to parabolic problems. An application of this theorem is also demonstrated. Bibliography: 19 titles.