A novel approach for solving multi-term time fractional Volterra-Fredholm partial integro-differential equations

This article deals with an efficient numerical technique to solve a class of multi-term time fractional Volterra-Fredholm partial integro-differential equations of first kind. The fractional derivatives are defined in Caputo sense. The Adomian decomposition method is used to construct the scheme. For simplicity of the analysis, the model problem is converted into a multi-term time fractional Volterra-Fredholm partial integro-differential equation of second kind. In addition, the convergence analysis and the condition for existence and uniqueness of the solution are provided. Several numerical examples are illustrated in support of the theoretical analysis.