On approximation of solutions of stochastic delay differential equations via randomized Euler scheme

We investigate existence, uniqueness and approximation of solutions to stochastic delay differential equations (SDDEs) under Caratheodory-type drift coefficients. Moreover, we also assume that both drift f = f (t, x, z) and diffusion g = g(t, x, z) coefficient are Lipschitz continuous with respect to the space variable x, but only Holder continuous with respect to the delay variable z. We provide a construction of randomized Euler scheme for approximation of solutions of Caratheodory SDDEs, and investigate its upper error bound. Finally, we report results of numerical experiments that confirm our theoretical findings.