Scalar conservation laws with monotone pure-jump Markov initial conditions

Abstract

In 2010 Menon and Srinivasan published a conjecture for the statistical structure of solutions to scalar conservation laws with certain Markov initial conditions, proposing a kinetic equation that should suffice to describe (x,t) as a stochastic process in x with t fixed. In this article we verify an analogue of the conjecture for initial conditions which are bounded, monotone, and piecewise constant. Our argument uses a particle system representation of (x,t) over 0 ≤ x ≤ L for L > 0, with a suitable random boundary condition at x = L.