Strictly hyperbolic Cauchy problems with coefficients low-regular in time and space

Abstract

We consider the strictly hyperbolic Cauchy problem align* &Dtm u - Σj = 0m-1 Σ|γ|+j = m am-j,\,γ(t,\,x) Dxγ Dtj u = 0, &Dtk-1u(0,\,x) = gk(x),\,k = 1,\,…,\,m, align* for (t,\,x) ∈ [0,\,T]× Rn with coefficients belonging to the Zygmund class Cs in x and having a modulus of continuity below Lipschitz in t. Imposing additional conditions to control oscillations, we obtain a global (on [0,\,T]) L2 energy estimate without loss of derivatives for s ≥ \1+,\,2m02-m0\, where m0 is linked to the modulus of continuity of the coefficients in time.