Large Deviations for Stochastic Porous Media Equation on General Measure Spaces

Abstract

In this paper, we establish the large deviation principles for stochastic porous media equations driven by time-dependent multiplicative noise on σ-finite measure space (E,B(E),μ), and the Laplacian replaced by a negative definite self-adjoint operator. The coefficient is only assumed to satisfy the increasing Lipschitz nonlinearity assumption without the restrictions to its monotone behavior at infinity for L2(μ)-initial data or compact embeddings in the associated Gelfand triple. Applications include fractional powers of the Laplacian, i.e. L=-(-)α,\ α∈(0,1], generalized Schrodinger operators, i.e. L=+2∇ ·∇, and Laplacians on fractals.