Critical curve for weakly coupled system of semilinear Euler-Poisson-Darboux-Tricomi equations

Abstract

This paper investigates a weakly coupled system of semilinear Euler-Poisson-Darboux-Tricomi equations (EPDTS) with power-type nonlinear terms. More precisely, in the case where the damping terms dominate over the mass terms, the critical curve in the p-q plane that delineates the threshold between global existence and blow-up for the EPDTS is given by equation* m(n,p,q,β1,β2)=0, equation* where m is defined by (gammam). Through the construction of new test functions, the blow-up problem is addressed when m(n,p,q,β1,β2)≥0. Based on the (L1 L2)-L2 estimates of the solution to the corresponding linear equation established in our previous work LiGuo2025, we derive the global existence of solutions with small initial data when m(n,p,q,β1,β2)<0, provided that the damping terms prevail over the mass terms.

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