On certain variant of strongly nonlinear interpolation inequality in dimension n

Abstract

We obtain the inequality ∫|∇ u(x)|ph(u(x))dx≤ C(n,p)∫ ( |∇(2) u(x)|| Th,C(u(x))|)ph(u(x))dx, where ⊂eq Rn and n 2, u:→ R is in certain subset in second order Sobolev space W2,1loc(), ∇(2) u is the Hessian matrix of u, Th,C(u) is certain transformation of the continuous function h(·). Such inequality is the generalization of similar inequality holding in one dimension, obtained earlier by second author and Peszek.