Modified backward differentiation methods of the Adams-type based on exponential interpolation

Backward differentiation methods based on a new type of mixed interpolation for the first-order initial-value problems whose solutions are known to be periodic are constructed. The angular frequency k is calculated by minimizing the local truncation error within each integration interval. The result

A simple method is presented for peak area correction of overlapping peaks. This correction is necessary for the normal approach of dealing with overlapping peaks by a vertical line at the valley point. The relative area errors caused by this vertical line are calculated as the correction factors in

This paper deals with the mathematical analysis of mathematical models in continuum physics which are described by partial differential equations, in one space dimension, with additional random noise. The first part of the paper provides the framework for the mathematical modelling of a large class

## Abstract In this letter, a high order accurate FDTD method is proposed, in which a fourth‐order accurate staggered backward differentiation integrator is used for time marching and a new finite difference scheme named the optimal central finite difference scheme is used for spatial discretizatio