An Lp-maximal regularity estimate of moments of solutions to second-order stochastic partial differential equations

Abstract

We obtain uniqueness and existence of a solution u to the following second-order stochastic partial differential equation (SPDE) : align abs eqn du= ( aij(ω,t)uxixj+ f )dt + gk dwkt, t ∈ (0,T); u(0,·)=0, align where T ∈ (0,∞), wk (k=1,2,…) are independent Wiener processes, ( aij(ω,t)) is a (predictable) nonnegative symmetric matrix valued stochastic process such that ||2 ≤ aij(ω,t) i j ≤ K ||2 ∀ (ω,t,) ∈ × (0,T) × Rd for some , K ∈ (0,∞), f ∈ Lp( (0,T) × Rd, dt × dx ; Lr(, F ,dP) ), and g, gx ∈ Lp( (0,T) × Rd, dt × dx ; Lr(, F ,dP; l2) ) with 2 ≤ r ≤ p < ∞ and appropriate measurable conditions.