Minimal regularity solutions of semilinear generalized Tricomi equations

Abstract

We prove the local existence and uniqueness of minimal regularity solutions u of the semilinear generalized Tricomi equation ∂t2 u-tm u =F(u) with initial data (u(0,·), ∂t u(0,·)) ∈ Hγ( Rn) × Hγ-2m+2( Rn) under the assumption that |F(u)| |u| and |F'(u)| |u| -1 for some >1. Our results improve previous results of M. Beals [2] and of ourselves [15-17]. We establish Strichartz-type estimates for the linear generalized Tricomi operator ∂t2 -tm from which the semilinear results are derived.