A vector parameter global bifurcation result

We study the nonlinear eigenvalue problem is shown that 0 = 0 is a global bifurcation point of the eigenvalue problem provided: a standard transversality condition is satisfied, the dimension of the null space of A is an odd number and each B j , j = 1, 2, . . . , k, is a positive operator on the f

In this paper we prove certain bifurcation results for the following degenerate quasilinear system where Ω is a bounded and connected subset of R N , with N ≥ 2. This is achieved by applying topological degree and global bifurcation theory (in the sense of Rabinowitz).

We consider the nonlinear Sturm-Liouville boundary value problem where L is the linear Sturm-Liouville operator (Lu)(t) = -(p(t)u ′ (t)) ′ + q(t)u(t). We obtain a global bifurcation result for a related bifurcation problem. We then use this to obtain multiple (at least eight) solutions of the Sturm

We consider the structure of the solution set of a nonlinear Sturm-Liouville boundary value problem defined on a general time scale. Using global bifurcation theory we show that unbounded continua of nontrivial solutions bifurcate from the trivial solution at the eigenvalues of the linearization, an