Global solutions to the stochastic Volterra Equation driven by L\'evy noise

Abstract

In this article we investigate the existence and uniqueness of the stochastic Volterra equation driven by a noise of pure jump type. In particular, we consider the following type of equation du(t) = ( A∫0 t b(t-s) u(s)\,ds) \, dt + F(t,u(t))\,dt+ ∫ZG(t,u(t), z) η(dz,dt) + ∫ZLGL(t,u(t), z) ηL(dz,dt) ;\, t∈ (0,T], , u(0)=u0, where Z and ZL are Banach spaces, η is a time-homogeneous compensated Poisson random measure on Z with measure capturing the small jumps, and ηL is a time-homogeneous Poisson random measure on ZL with finite measure L capturing the large jumps. Here, A is a selfadjoint operator on a Hilbert space H, b is a scalar memory function and F, G and GL are nonlinear mappings. We provide conditions on b, F G and GL under which a unique global solution exists. Finally, we present an example from the theory of linear viscoelasticity where our result is applicable.