Hyperbolicity of the time-like extremal surfaces in minkowski spaces

Abstract

In this paper, it is established, in the case of graphs, that time-like extremal surfaces of dimension 1+n in the Minkowski space of dimension 1+n+m can be described by a symmetric hyperbolic system of PDEs with the very simple structure (reminiscent of the inviscid Burgers equation) ∂\t W + Σ\j=1n A\j(W)∂\x\j W =0,\;\;\;W:\;(t,x)∈R1+n→ W(t,x)∈Rn+m+m+nn,where each A\j(W) is just a (n+m+m+nn)×(n+m+m+nn) symmetric matrix dependinglinearly on W.