Positive solutions for (n − 1, 1) conjugate boundary value problems

We consider the following boundary value problems: n > 2, t e (0,1), ## and (-1)n-PAny=F(k,y, Ay,...,An-ly), n>2, 0<k<m, where 1 < p < n -1 is fixed. By employing fixed-point theorems for operators on a cone, existence criteria are developed for multiple (at least three) positive solutions of t

We shall employ some fixed-point theorems for operators on a cone to obtain existence criteria for (at least) three positive solutions of the following continuous and discrete systems of boundary value problems: 2,...,m and (-1) ~-p, A~yi(k) = Fi(k, ~l(k), ~2(k) ..... ~m(k)),

For 1 F k F n y 1, positive solutions are obtained for the boundary value problem ## Ž . Ž . where f x, y G yM, and M is a positive constant. We show the existence of positive solutions by using a fixed point theorem in cones.