Long-time stability in systems of conservation laws, using relative entropy/energy

We study the long-time stability of shock-free solutions of hyperbolic systems of conservations laws, under arbitrarily large initial disturbance in L2∩L∞. We use the relative entropy method, a robust tool which allows us to consider rough and large disturbances. We display practical examples in several space dimensions, for scalar equations as well as isentropic gas dynamics. For full gas dynamics, we use a trick due to Chen [1], in which the estimate is made in terms of the relative mechanical energy instead of the relative mathematical entropy.