Stochastic degenerate fractional conservation laws

We consider the Cauchy problem for a degenerate fractional conservation laws driven by a noise. In particular, making use of an adapted kinetic formulation, a result of the existence and uniqueness of the solution is established. Moreover, a unified framework is also established to develop the continuous dependence theory. More precisely, we demonstrate L1-continuous dependence estimates on the initial data, the order of fractional Laplacian, the diffusion matrix, the flux function, and the multiplicative noise function present in the equation.