On semilinear Tricomi equations in one space dimension

Abstract

For 1-D semilinear Tricomi equation ∂t2 u-t∂x2u=|u|p with initial data (u(0,x), ∂t u(0,x)) =(u0(x), u1(x)), where t 0, x∈R, p>1, and ui∈ C0∞(R) (i=0,1), we shall prove that there exists a critical exponent p crit=5 such that the small data weak solution u exists globally when p>p crit; on the other hand, the weak solution u, in general, blows up in finite time when 1<p<p crit. We specially point out that for 1-D semilinear wave equation ∂t2 v-∂x2v=|v|p, the weak solution v will generally blow up in finite time for any p>1. By this paper and HWYin1-HWYin3, we have given a systematic study on the blowup or global existence of small data solution u to the equation ∂t2 u-t u=|u|p for all space dimensions. One of the main ingredients in the paper is to establish a crucial weighted Strichartz-type inequality for 1-D linear degenerate equation ∂t2 w-t∂x2 w=F(t,x) with (w(0,x), ∂t w(0,x))=(0,0), i.e., an inequality with the weight (49t3-|x|2)α between the solution w and the function F is derived for some real numbers α.