Power variations in fractional Sobolev spaces for a class of parabolic stochastic PDEs

Abstract

We consider a class of parabolic stochastic PDEs on bounded domains D⊂eqRd that includes the stochastic heat equation, but with a fractional power γ of the Laplacian. Viewing the solution as a process with values in a scale of fractional Sobolev spaces Hr, with r < γ - d/2, we study its power variations in Hr along regular partitions of the time-axis. As the mesh size tends to zero, we find a phase transition at r=-d/2: the solutions have a nontrivial quadratic variation when r<-d/2 and a nontrivial pth order variation for p= 2γ/(γ-d/2-r)>2 when r>-d/2. More generally, suitably normalized power variations of any order satisfy a genuine law of large numbers in the first case and a degenerate limit theorem in the second case. When r<-d/2, the quadratic variation is given explicitly via an expression that involves the spectral zeta function, which reduces to the Riemann zeta function when d=1 and D is an interval.