Fujita type results for quasilinear parabolic inequalities with nonlocal terms

Abstract

In this paper we investigate the nonexistence of nonnegative solutions of parabolic inequalities of the form cases &ut L A u≥ (K up)uq in RN × (0,∞),\, N≥ 1,\\ &u(x,0) = u0(x)0 \,\, in RN,cases (P) where u0∈ L1loc( RN), LA denotes a weakly m-coercive operator, which includes as prototype the m-Laplacian or the generalized mean curvature operator, p,\,q>0, while K up stands for the standard convolution operator between a weight K>0 satisfying suitable conditions at infinity and up. For problem (P-) we obtain a Fujita type exponent while for (P+) we show that no such critical exponent exists. Our approach relies on nonlinear capacity estimates adapted to the nonlocal setting of our problems. No comparison results or maximum principles are required.