Long Time Boundedness of Planar Jump Discontinuities for Homogeneous Hyperbolic Systems

Abstract

Suppose that L(∂t,∂x) is a homogeneous constant coefficient strongly hyperbolic partial differential operator on R1+d and H is a characteristic hyperplane. Suppose that in a conic neighborhood of the conormal variety of H, the characteristic variety of L is the graph of a real analytic function τ() with rank\,τ identically equal to zero or the maximal possible value d-1. Suppose that the source function f is compactly supported in t 0 and piecewise smooth with singularities only on H. Then the solution of Lu=f with u=0 for t<0 is uniformly bounded on R1+d. Typically when rank\,τ 0 on the conormal variety, the sup norm of the the jump in the gradient of u across H grows linearly with t.