In this paper we present a generalization of the Petryshyn–Leggett–Williams fixed point theorem using an axiomatic index theory. In [5] Leggett and Williams ...
Introduction. In this paper we present a generalization of the Petryshyn–Leggett–Williams fixed point theorem using an axiomatic index theory.
We conclude by applying the techniques of Agarwal and O'Regan [11] to generalize the fixed point theorem to maps which obey an axiomatic index theory, so in ...
Title: A generalization of the Petryshyn-Leggett-Williams fixed point theorem with applications to integral inclusions. Authors: Agarwal, R.P.
Sep 25, 2001 · A generalization of the Petryshyn-Leggett-Williams fixed point theorem with applications to integral inclusions. Authors: Ravi P. Agarwal.
The existence of three fixed points is established for multivalued maps which satisfy an axiomatic index theory. Our results enable us to develop criteria ...
Our results enable us to develop criteria for the existence of three nonnegative solutions to integral inclusions. 论文关键词:Axiomatic index theory,Multiple ...
Ravi P. Agarwal, Donal O'Regan: A generalization of the Petryshyn-Leggett-Williams fixed point theorem with applications to integral inclusions. Appl. Math.
A generalization of the Petryshyn-Leggett-Williams fixed point theorem with applications to integral inclusions · Existence of Three Solutions to Integral and ...
Jan 8, 2015 · The hypotheses of the Leggett-Williams Fixed Point Theorem are based upon the relationships between the operator, the norm and a continuous ...
Missing: Petryshyn- inclusions.