Occupation times for superprocesses in random environments

Abstract

Let X=(Xt, t≥ 0) be a superprocess in a random environment governed by a Gaussian noise W=\W(t, x),t≥ 0,x∈Rd\ white in time and colored in space with correlation kernel g. We consider the occupation time process of the model starting from a finite measure. It is shown that the occupation time process of X is absolutely continuous with respect to Lebesgue measure in d≤ 3, whereas it is singular with respect to Lebesgue measure in d≥ 4. Regarding the absolutely continuous case in d≤ 3, we further prove that the associated density function is jointly H\"older continuous based on the Tanaka formula and moment formulas, and derive the H\"older exponents with respect to the spatial variable x and the time variable t.

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