Three solutions of an th order three-point focal type boundary value problem

we are concerned with the discrete right-focal boundary value problem A3z(t) = f(t, z(t + l)), z(ti) = Az(tz) = A2z(ts) = 0, and the eigenvalue problem A3z(t) = Xa(t)f(z(t + 1)) with the same boundary conditions, where tl < t2 < t3. Under various assumptions on f, a, and X, we prove the existence o

The existence, nonexistence, and multiplicity of nonnegative solutions are established for the three-point boundary value problem where β ∈ (0, 1), α ∈ (0, 1/β), and λ is a nonnegative parameter, under appropriate hypotheses. The key idea is that the problem of finding a nonnegative solution is tra

We establish the existence of at least three positive solutions to the second-order three-point boundary value problem, u + f t u = 0 u 0 = 0 αu η = u 1 , where η 0 < η < 1 0 < α < 1/η, and f 0 1 × 0 ∞ → 0 ∞ is continuous. We accomplish this by making growth assumptions on f which can apply to many

We establish the existence of positive solutions for the three-point boundary value problem u" + a(t)f(u) = o, u(0) = 0, u(1) -au(~) = b, where b, c~ > 0, r/ E (0, 1), a~? < 1, are given. Under suitable conditions, we show that there exists a positive number b\* such that the problem has at least on