Well-posedness results for hyperbolic operators with coefficients rapidly oscillating in time

Abstract

In the present paper, we consider second order strictly hyperbolic linear operators of the form Lu\,=\,∂t2u\,-\, div(A(t,x)∇ u), for (t,x)∈[0,T]×Rn. We assume the coefficients of the matrix A(t,x) to be smooth in time on \,]0,T]×Rn, but rapidly oscillating when t 0+; they match instead minimal regularity assumptions (either Lipschitz or log-Lipschitz regularity conditions) with respect to the space variable. Correspondingly, we prove well-posedness results for the Cauchy problem related to L, either with no loss of derivatives (in the Lipschitz case) or with a finite loss of derivatives, which is linearly increasing in time (in the log-Lipschitz case).