Liouville results for supersolutions of fractional p-Laplacian equations with gradient nonlinearities

Abstract

We prove that any nonnegative viscosity solution of the inequality (-p)s u(x) ≥ ut |∇ u|m in \; RN,\; N≥ 2, must be constant. This result holds for parameters p∈ (1, ∞), s∈ (0, 1), t, m≥ 0, satisfying t (N-sp) + m(N-(sp-p+1)) < N(p-1), with the additional condition that either m≤ p-1 if p-1<sp, or m<sp if p-1≥ sp.

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