Two Generalizations of Stampacchia Lemma and Applications

Abstract

We present two generalizations of the classical Stampacchia Lemma which contain a non-decreasing non-negative function g, and give applications. As a first application, we deal with variational integrals of the form J (u;) = ∫\ f(x,Du(x))dx. We consider a minimizer u: ⊂ Rn R among all functions with a fixed boundary value u on ∂ . Under some nonstandard growth conditions of the integrand f(x,) we derive some regularity results; as a second application, we consider elliptic equations of the form cases - div ( a(x, u(x)) D u(x) ) = f(x), & x ∈ , u(x) = 0, & x ∈ ∂ , cases under the conditions α (1+|s|) θ θ (e+|s|) a (x,s) β, \ \ \ 0<α β <∞, \ θ 0, we obtain some regularity properties of its weak solutions.