Sharp estimates and existence for anisotropic elliptic problems with general growth in the gradient
Abstract
In this paper, we prove sharp estimates and existence results for anisotropic nonlinear elliptic problems with lower order terms depending on the gradient. Our prototype is: \ arrayll - Qpu =[H(Du)]q+f(x) &in ,\\ u=0&on ∂. array . Here is a bounded open set of RN, N 2, 0<p-1<q p<N, and Qp is the anisotropic operator Qp u = div( [H(Du)]p-1H(Du) ), where H is a suitable norm of RN. Moreover, f belongs to an appropriate Marcinkiewicz space.
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