On singular perturbation method of perturbed bifurcation problems

Abstract: In this paper, the general mathematical principle is overall explained and a new general technique is presented inorder to calculate uniformly asymptotic expansions of solutions of the perturbed bifurcation problem (1.6) in the vicinity of y=0, A=0. ~:0 , by means of singular perturbation method. Simultaneously, Newton's polygon [4] is generalized. Finally, the calculating results of two examples are given. Null(A*) :span{C*}, [Ir = I~ J then under certain conditions, the solutions of [l] solution at (0,60) Th… Show more

“…A very practical iteration method was given in [9] and in the present case it can be described by the following steps: where ~ is a. positive real variable, < 9 ~ 9 > denotes the inner product in R" and N= Null is a buckled state of the plate near ;~* (it is called a "small" solution). Because of the singularity of F,( 0~ g) at A~ it is very important to find an efficient numerical calculation method.…”

The buckled states of rectangular plates

“…A very practical iteration method was given in [9] and in the present case it can be described by the following steps: where ~ is a. positive real variable, < 9 ~ 9 > denotes the inner product in R" and N= Null is a buckled state of the plate near ;~* (it is called a "small" solution). Because of the singularity of F,( 0~ g) at A~ it is very important to find an efficient numerical calculation method.…”

The buckled states of rectangular plates