On the lifespan of and the blowup mechanism for smooth solutions to a class of 2-D nonlinear wave equations with small initial data

Abstract

This paper is concerned with the lifespan and the blowup mechanism for smooth solutions to the 2-D nonlinear wave equation t2u-Σi=12i(ci2(u)iu) =0, where ci(u)∈ C∞( Rn), ci(0)≠ 0, and (c1'(0))2+(c2'(0))2≠ 0. This equation has an interesting physics background as it arises from the pressure-gradient model in compressible fluid dynamics and also in nonlinear variational wave equations. Under the initial condition (u(0,x), tu(0,x))=( u0(x), u1(x)) with u0(x), u1(x)∈ C0∞( R2), and >0 is small, we will show that the classical solution u(t,x) stops to be smooth at some finite time T. Moreover, blowup occurs due to the formation of a singularity of the first-order derivatives t,xu(t,x), while u(t,x) itself is continuous up to the blowup time T.