Coupled fixed points of nonlinear operators with applications

Positive fixed point Superlinear Multi-point boundary value problem a b s t r a c t We study the existence of fixed points for τ -ϕ-convex operators by means of a fixed point theorem of cone expansion and compression. As corollaries, we obtain some fixed point results for e-convex operators and α-c

Some new fixed point theorems are presented for operators of accretive, nonlinear contractive, or nonexpansive type. These results are then used to establish a new existence principle for second order boundary value problems in Hilbert spaces.

We generalize the fixed-point theorem of Leggett-Williams, which is a theorem giving conditions that imply the existence of three fixed points of an operator defined on a cone in a Banach space. We then show how to apply our theorem to prove the existence of three positive solutions to a second-orde