Numerical solution of the fourth-order partial integro-differential equation with multi-term kernels by the Sinc-collocation method based on the double exponential transformation

Highlights：

• A Sinc-collocation method based on the double exponential (DE) transformation is proposed.

• The DE transformation for solving the fourth-order partial integro-differential equation with multiterm kernels is novel.

• The DE scheme in this paper is superexponentially convergent in the spatial direction.

• The numerical experiments are performed to verify the theoretical analysis and show the high efficiency of our method by comparing with that of the single exponential (SE) transformation.