Non-parametric estimation of non-linear diffusion coefficient in parabolic SPDEs

Abstract

In this article, we introduce a novel non-parametric predictor, based on conditional expectation, for the unknown diffusion coefficient function σ in the stochastic partial differential equation Lu = σ(u)W, where L is a parabolic second order differential operator and W is a suitable Gaussian noise. We prove consistency and derive an upper bound for the error in the Lp norm, in terms of discretization and smoothening parameters h and . We illustrate the applicability of the approach and the role of the parameters with several interesting numerical examples.