Abstract

In this paper, we investigate the regularity of the solutions of a class of two-parameter Stochastic Volterra-type equations in the anisotropic Besov–Orlicz space B τ,ω 0 modulated by the Young function τ( t)=exp( t 2)−1 and the modulus of continuity ω( t)=( t(1+log(1/ t))) 1/2. Moreover, we derive in the Besov–Orlicz norm a large deviation estimate of Freidlin–Wentzell type for the solution.

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