Nonexistence of global solutions for an inhomogeneous pseudo-parabolic equation

Abstract

In the present paper, we study an inhomogeneous pseudo-parabolic equation with nonlocal nonlinearity ut-k ut- u=Iγ0+(|u|p)+ω(x),\,\ (t,x)∈(0,∞)×RN, where p>1,\,k≥ 0, ω(x)≠0 and Iγ0+ is the left Riemann-Liouville fractional integral of order γ∈(0,1). Based on the test function method, we have proved the blow-up result for the critical case γ=0,\,p=pc for N≥3, which answers an open question posed in Zhou, and in particular when k=0 it improves the result obtained in Bandle. An interesting fact is that in the case γ>0, the problem does not admit global solutions for any p>1 and ∫RNω(x) dx>0.