The general iteration algorithm was proved equivalent to the Neumann method.

Finite element dynamic equation and Neumann series method of elastic body attached to a moving base;

Based on the Neumann series and Epsilon-algorithm,a new eigensolution reanalysis method was developed.

The large eigenvalue problem is transformed into an eigenvalue problem in a low dimension subspace by using orthogonal projection technique,and the Neumann series is used in the correction equation for the purpose of precondition.

Discussed in this paper is the existence of solutions for the one dimensional p-Laplace equation(Φp(u′))′=f(t,u,u′),t∈(0,1) subject to the Neumann boundary value problem at u′(0)=0,u′(1)=0,where Φp(s)=| s |p-2s,s≠0.

We discuss the existence of solutions for one dimensional p-Laplace equation(φp(u′))′=f(t,u,u′),t∈(0,1)) subject to Neumann boundary value problem at u′(0)=0,u′(1)=0,where φp(s)=|s|p-2s,s≠0.

The existence results of positive solutions are presented for semipositone second-order Neumann boundary value problems with singular impulsive differential equations.