Multiplicity and Regularity Results for Quasilinear Elliptic Systems via Nonsmooth Critical Point Theory

Abstract

We study the quasilinear elliptic system \[ -div(A(x, u)|D u|p-2D u) +1p∇ sA(x, u)|D u|p = g(x, u) in , u = 0 on ∂, \] where p>1, ⊂ RN is a bounded domain with N>1, and g satisfies a subcritical growth condition. In this setting, the associated energy functional is, in general, neither differentiable nor locally Lipschitz in the natural Sobolev space. By exploiting a nonsmooth critical point theory, we prove the existence of infinitely many weak solutions by means of an Equivariant Mountain Pass Theorem. In addition, we establish L∞-bounds for weak solutions by adapting a Moser-type iteration.

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