Advances in Difference Equations
Volume 2009 (2009), Article ID 671625, 15 pages
doi:10.1155/2009/671625
Abstract
Let T∈ℕ be an integer with T>1, 𝕋:={1,…,T}, 𝕋^:={0,1,…,T+1}. We consider boundary value problems of nonlinear second-order difference equations of the form Δ2u(t−1)+λa(t)f(u(t))=0, t∈𝕋, u(0)=u(T+1)=0, where a:𝕋→ℝ+, f∈C([0,∞),[0,∞)) and, f(s)>0 for s>0, and f0=f∞=0, f0=lims→0+f(s)/s, f∞=lims→+∞f(s)/s. We investigate the global structure of positive solutions by using the Rabinowitz's global bifurcation theorem.