The existence and singularity structure of low regularity solutions of higher-order degenerate hyperbolic equations

Abstract

This paper is a continuation of our previous work [21], where we have established that, for the second-order degenerate hyperbolic equation (t2-tmx)u=f(t,x,u), locally bounded, piecewise smooth solutions u(t,x) exist when the initial data (u,t u)(0,x) belongs to suitable conormal classes. In the present paper, we will study low regularity solutions of higher-order degenerate hyperbolic equations in the category of discontinuous and even unbounded functions. More specifically, we are concerned with the local existence and singularity structure of low regularity solutions of the higher-order degenerate hyperbolic equations t(t2-tmx)u=f(t,x,u) and (t2-tm1x)(t2-tm2x)v=f(t,x,v) in +×n with discontinuous initial data tiu(0,x)=φi(x) (0 i 2) and tjv(0,x)=j(x) (0 j 3), respectively; here m, m1, m2∈, m1≠ m2, x∈n, n 2, and f is C∞ smooth in its arguments. When the φi and j are piecewise smooth with respect to the hyperplane \x1=0\ at t=0, we show that local solutions u(t,x), v(t,x)∈ L∞((0,T)×n) exist which are C∞ away from 0 m and m1m2 in [0,T]×n, respectively; here 0=\(t,x): t 0, x1=0\ and the k = \(t,x): t 0, x1= 2t(k+2)/2k+2\ are two characteristic surfaces forming a cusp. When the φi and j belong to C0∞(n\0\) and are homogeneous of degree zero close to x=0, then there exist local solutions u(t,x), v(t,x)∈ Lloc∞((0,T]×n) which are C∞ away from m l0 and m1m2 in [0,T]×n, respectively; here k=\(t,x): t 0, |x|2=4tk+2(k+2)2\ (k=m, m1, m2) is a cuspidal conic surface and l0=\(t,x): t 0, |x|=0\ is a ray.