Well-posedness for stochastic scalar conservation laws on Riemannian manifolds
Abstract
We consider the scalar conservation law with stochastic forcing ∂t u +divg f(,u)= (,u) dW, \ \ x ∈ M, \ \ t≥ 0 on a smooth compact Riemannian manifold (M,g) where W is the Wiener process and x f(,) is a vector field on M for each ∈ R. We introduce admissibility conditions, derive the kinetic formulation and use it to prove well posedness.
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