The Averaging Principle for Caputo Type Fractional Stochastic Differential Equations with Lévy Noise

In this paper, the averaging principle for Caputo type fractional stochastic differential equations with L & eacute;vy noise is investigated with consideration of a new method for dealing with singular integrals. Firstly, the estimate on higher moments for the solution is given. Secondly, under some suitable assumptions, we prove the averaging principle for Caputo type fractional stochastic differential equations with L & eacute;vy noise by using the H & ouml;lder inequality. Finally, a simulation example is given to verify the theoretical results.