Conjugate boundary value problems, via Sperner's lemma

where f E C ([0, 1] x R~,~+), R+ = [0, ~) associated to the Lidstone boundary conditions Existence of a solution of boundary value problems (BVP) (1),(2) such that x(2i)(t)>O, 0 0, 0<t<l, i=0,1 .... ,2n-1. We further prove analogous results for the case when -f E C([0, 1] x Rn\\_,R\\_), i.e., deriva

In this paper we investigate the existence of multiple nontrivial solutions of a nonlinear heat flow problem with nonlocal boundary conditions. Our approach relies on the properties of a vector field on the phase plane and utilizes Sperner's Lemma, combined with the continuum property of the solutio

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

For 1 k n&1, solutions are obtained for the boundary value problem, (&1) n&k y (n) = f(x, y), y (i) (0)=0, 0 i k&1, and y ( j) (1)=0, 0 j n&k&1, where f (x, y) is singular at y=0. An application is made of a fixed point theorem for operators that are decreasing with respect to a cone. 1997 Academic