SVI solutions to stochastic nonlinear diffusion equations on general measure spaces

Abstract

We establish a framework for the existence and uniqueness of solutions to stochastic nonlinear (possibly multi-valued) diffusion equations driven by multiplicative noise, with the drift operator L being the generator of a transient Dirichlet form on a finite measure space (E,B,μ) and the initial value in Fe*, which is the dual space of an extended transient Dirichlet space. L and Fe* replace the Laplace operator and H-1, respectively, in the classical case. This framework includes stochastic fast diffusion equations, stochastic fractional fast diffusion equations, the Zhang model, and apply to cases with E being a manifold, a fractal or a graph. In addition, our results apply to operators -f(-L), where f is a Bernstein function, e.g. f(λ)=λα or f(λ)=(λ+1)α-1, 0<α<1.