Lp-regularity theory for the stochastic reaction-diffusion equation with super-linear multiplicative noise and strong dissipativity

Abstract

We study the existence, uniqueness, and regularity of the solution to the stochastic reaction-diffusion equation (SRDE) with colored noise F: ∂t u = aijuxixj + bi uxi + cu - b u1+β + u1+γ F, (t,x)∈ R+×Rd; u(0,·) = u0, where aij,bi,c, b and are C2 or L∞ bounded random coefficients. Here β>0 denotes the degree of the strong dissipativity and γ>0 represents the degree of stochastic force. Under the reinforced Dalang's condition on F, we show the well-posedness of the SRDE provided γ < (β +1)d+2 where >0 is the constant related to F. Our result assures that strong dissipativity prevents the solution from blowing up. Moreover, we provide the maximal H\"older regularity of the solution in time and space.