Blow-up results for a logarithmic pseudo-parabolic p(.)-Laplacian type equation

Abstract

In this paper, we consider an initial-boundary value problem for the following mixed pseudo-parabolic p(.)-Laplacian type equation with logarithmic nonlinearity: ut- ut-div( ∇ up(.)-2∇ u) =|u|q(.)-2u(|u|), (x,t)∈×(0,+∞), where ⊂Rn is a bounded and regular domain, and the variable exponents p(.) and q(.) satisfy suitable regularity assumptions. By adapting the first-order differential inequality method, we establish a blow-up criterion for the solutions and obtain an upper bound for the blow-up time. In a second moment, we show that blow-up may be prevented under appropriate smallness conditions on the initial datum, in which case we also establish decay estimates in the H01()-norm as t+∞. This decay result is illustrated by a two-dimensional numerical example.

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