Blow-Up Theory and Liouville-Type Theorem for Solutions of a Class of Generalized Camassa-Holm-Kadomtsev-Petviashvili Equations

Abstract

We investigate the blow-up behavior and Liouville-type theorems of solutions to a class of generalized Camassa-Holm-Kadomtsev-Petviashvili (CH-KP) equations with a generally smooth nonlinear term g(u). First, using the continuation method, we establish a blow-up criterion that is independent of the regularity index of initial data. Under the assumption that g'(u) is uniformly bounded, we prove the blow-up theorem and a weighted blow-up result by means of characteristic lines, a priori estimates and the Riccati inequality. Moreover, we extend these blow-up results to the setting where g'(u) is polynomially controlled, which includes typical nonlinearities such as g(u)= u+3u2 for the classical CH-KP equations. Furthermore, a Liouville-type uniqueness theorem is established under the condition g(u) ≥ γ u2 with u ≠ 0, g(u)>γ u2.