Smooth solutions for a p-system of mixed type

Abstract

In this note we analyze smooth solutions of a p-system of the mixed type. Motivating example for this is a 2-components reduction of the Benney moments chain which appears to be connected to theory of integrable systems. We don't assume a-priory that the solutions in question are in the Hyperbolic region. Our main result states that the only smooth solutions of the system which are periodic in x are necessarily constants. As for initial value problem we prove that if the initial data is strictly hyperbolic and periodic in x then the solution can not extend to [t0;+∞) and shocks are necessarily created.