Boundary behavior and interior H\"older regularity of solution to nonlinear stochastic partial differential equations driven by space-time white noise

Abstract

We present uniqueness and existence in weighted Sobolev spaces of the equation ut=(auxx+bux+cu)+ |u|1+λ B, \,\, t>0, \, x∈ (0,1) with initial data u(0,·)=u0 and zero boundary data. Here λ∈ [0,1/2), B is a space-time white noise, and the coefficients a,b,c and the function depend on (ω,t,x) and the initial data u0 depends on (ω,x). More importantly, we obtain various interior H\"older regularities and boundary behaviors of the solution. For instance, if the initial data is in appropriate Lp spaces, then for any small >0 and T<∞, almost surely -1/2-u ∈ C14-2-, 12--t,x([0,T]× (0,1)), ∀\, ∈ (λ, 1/2), where (x) is the distance from x to the boundary. Taking λ, one gets the the maximal H\"older exponents in time and space, which are 1/4-λ/2- and 1/2-λ- respectively. Also, letting 1/2, one gets better decay or behavior near the boundary.