Multiple positive solutions for semi-positonem-point boundary value problems

theorem of generalized cone expansion and compression a b s t r a c t Using a fixed point theorem of generalized cone expansion and compression we present in this paper criteria which guarantee the existence of at least two positive solutions for semi-positone three-point boundary value problems wit

We improve the results obtained by Erbe, Hu, and Wang in a recent paper. We show that there exist at least two positive solutions of two-point boundary value problems under conditions weaker than those used by Erbe, Hu, and Wang.

This paper deals with the existence of multiple positive solutions for the quasilinear second-order differential equation subject to one of the following boundary conditions: Using the five functionals fixed point theorem, we provide sufficient conditions for the existence of multiple (at least th

consider the following boundary value problem: y(')(O) = 0, o<i<p-1, y(')(l) = 0, p<i<\_n-1, where 1 < p 5 n -1 is fixed. Using a fixed point theorem for operator0 on a cone, we offer eufflcient conditione for the existence of multiple (at least three) positive eolutions of the boundary value probl

Let a e C[0,1], b E C([0, 1], (-ec,0]). Let d e R and d > 0. Let ¢1(t) be the unique solution of the linear boundary value problem u We study the existence of positive solutions for the m-point boundary value problem where ~i E (0, 1) and ai E (0, c~) (for i E {1 ..... m -2}) are given constants s