Concerning ill-posedness for semilinear wave equations

Abstract

In this paper, we investigate the problem of optimal regularity for derivative semilinear wave equations to be locally well-posed in Hs with spatial dimension n ≤ 5. We show this equation, with power 2 p 1+4/(n-1), is (strongly) ill-posed in Hs with s = (n+5)/4 in general. Moreover, when the nonlinearity is quadratic we establish a characterization of the structure of nonlinear terms in terms of the regularity. As a byproduct, we give an alternative proof of the failure of the local in time endpoint scale-invariant Lt4/(n-1)Lx∞ Strichartz estimates. Finally, as an application, we also prove ill-posed results for some semilinear half wave equations.