Degenerate nonlinear boundary-value problems

In the present paper we are concerned with boundary-value problems (BVP) for the generalized Emden-Fowler equations. Asymptotic expansions of the solution are obtained near the endpoints. We use a finite-difference scheme to approximate the solution and the convergence is accelerated by means of ext

We examine a class of initial-boundary value problems of vector-valued solutions defined over a bounded domain in Rn. The presence of degeneracy in this class leads to loss of hyperbolicity at the null solution which gives rise to breakdown on the boundary of the domain when Dirichlet boundary condi

The exact number of positive solutions of a degenerate quasilinear two-point boundary value problem is investigated. For the generalization of earlier results concerning the non-degenerate case with convex nonlinearity, suitably deÿned p-convex nonlinearities are considered. Strictly p-convex C 2 fu