On the critical regularity of nonlinearities for semilinear classical wave equations

Abstract

In this paper, we consider the Cauchy problem for semilinear classical wave equations equation* utt- u=|u|pS(n)μ(|u|) equation* with the Strauss exponent pS(n) and a modulus of continuity μ=μ(τ), which provides an additional regularity of nonlinearities in u=0 comparing with the power nonlinearity |u|pS(n). We obtain a sharp condition on μ as a threshold between global (in time) existence of small data radial solutions by deriving polynomial-logarithmic type weighted L∞tL∞r estimates, and blow-up of solutions in finite time even for small data by applying iteration methods with slicing procedure. These results imply the critical regularity of source nonlinearities for semilinear classical wave equations.