Bifurcations of Bounded Solutions of 1-Parameter ODE's

We consider an algorithm for analyzing bifurcation structure and for branch switching in solution branches of one-parameter dependent problems. Based on Liapunov-Schmidt methods and analyses of scales of solutions, we verify the existence of bifurcating solution branches successively via truncated T

Revww of ~denttficatton of parameter-bounding models and thetr role tn pre&ctton and control reveals the computattonal reqmrements and the hm~tattons of existing parameterbounding algorithms

The aim of this article is to prove global bifurcation theorems for S 1 -equivariant potential operators of the form ''compact perturbation of identity.'' As an application we prove that components of the set of nontrivial solutions of system which bifurcate from the set of trivial solutions are un

## Abstract This paper presents necessary and sufficient conditions for an __n__ ‐th order differential equation to have a non‐continuable solution with finite limits of its derivatives up to the order __l__ at the right‐hand end point of the interval of its definition, __l__ ≤ __n__ – 2 (© 2010 WI