Improvement of conditions for finite time blow-up in a fourth-order nonlocal parabolic equation

Abstract

This paper is devoted to the study of blow-up phenomenon for a fouth-order nonlocal parabolic equation with Neumann boundary condition, equation* \arrayll ut+uxxxx=|u|p-1u-1a∫0a|u|p-1u\ dx, & ux(0)=ux(a)=uxxx(0)=uxxx(a)=0, & u(x,0)=u0(x)∈ H2(0, a),\ \ ∫0au0(x)\ dx=0, &array. equation* where a is a positive constant and p>1. The existing results on the problem suggest that the weak solution will blow up in finite time if I(u0)<0 and the initial energy satisfies some appropriate assumptions, here I(u0) is the initial Nehari functional. In this paper, we extend the previous blow-up conditions with proving that those assumptions on the energy functional are superfluous and only I(u0)<0 is sufficient to ensure the weak solution blowing up in finite time. Our conclusion depicts the significant influence of mass conservation on the dynamic behavior of solution.