Uniqueness and energy balance for isentropic Euler equation with stochastic forcing

Abstract

In this article, we prove uniqueness and energy balance for isentropic Euler system driven by a cylindrical Wiener process. Pathwise uniqueness result is obtained for weak solutions having H\"older regularity Cα,α>1/2 in space and satisfying one-sided Lipschitz bound on velocity. We prove Onsager's conjecture for isentropic Euler system with stochastic forcing, that is, energy balance equation for solutions enjoying H\"older regularity Cα,α>1/3. Both the results have been obtained in a more general setting by considering regularity in Besov space.