H1 and bmo regularity for wave equations with rough coefficients
Abstract
We consider second-order hyperbolic equations with rough time-independent coefficients. Our main result is that such equations are well posed on the Hardy spaces Hs,1FIO(Rn) and Hs,∞FIO(Rn) for Fourier integral operators if the coefficients have C1,1 Cr regularity in space, for r>n+12, where s ranges over an r-dependent interval. As a corollary, we obtain the sharp fixed-time H1(Rn) and bmo(Rn) regularity for such equations, extending work by Seeger, Sogge and Stein in the case of smooth coefficients.
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