Lifespan estimate for the semilinear regular Euler-Poisson-Darboux-Tricomi equation
Abstract
In this paper, we begin by establishing local well-posedness for the semilinear regular Euler-Poisson-Darboux-Tricomi equation. Subsequently, we derive a lifespan estimate with the Strauss index given by p=pS(n+μm+1, m) for any δ>0, where δ is a parameter to describe the interplay between damping and mass. This is achieved through the construction of a new test function derived from the Gaussian hypergeometric function and a second-order ordinary differential inequality, as proven by Zhou Zhou2014. Additionally, we extend our analysis to prove a blow-up result with the index p=\pS(n+μm+1, m), pF((m+1)n+μ-1-δ2)\ by applying Katos Lemma ( i.e., Lemma katolemma ), specifically in the case of δ=1.
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