The compact support property for solutions to stochastic heat equations with stable noise
Abstract
We consider weak non-negative solutions to the stochastic partial differential equation \[ ∂t Y(t,x) = Y(t,x) + Y(t,x)γ L(t,x), \] for (t,x) ∈ R+ × Rd, where γ > 0 and L is a one-sided stable noise of index α ∈ (1,2). We prove that solutions with compactly supported initial data have compact support for all times if γ ∈ (2-α, 1) for d=1, and if γ ∈ [1/α,1) in dimensions d ∈ [2,2/(α-1)) N. This complements known results on solutions to the equation with Gaussian noise. We also establish a stochastic integral formula for the density of a solution and associated moment bounds which hold in all dimensions for which solutions are defined.
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