Fixed point theorems for maps on cones in Fréchet spaces via the projective limit approach

Dedicated to Professor Ioan A. Rus on the occasion of his 80th anniversary

Authors

Keywords:

Fixed point, Fréchet space, cone, fixed point index, cone-compressing and cone-extending conditions, multivalued map, monotone iterative method.

Abstract

We present fixed point results for admissibly compact maps on cones in Fréchet spaces. We first extend the Krasnosel'ski fixed point theorem with order type cone-compression and cone-expansion conditions. Then, we extend the monotone iterative method to this context. Finally, we present fixed point results under a combination of the assumptions of the previous results. More precisely, we combine a cone-compressing or cone-extending condition only on one side of the boundary of an annulus with an assumption on the existence of an upper fixed point. In addition, we show that the usual monotonicity condition can be weaken.

Mathematics Subject Classification (2010): 47H10, 47H04.

References

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Published

2016-12-30

How to Cite

FRIGON, M. (2016). Fixed point theorems for maps on cones in Fréchet spaces via the projective limit approach : Dedicated to Professor Ioan A. Rus on the occasion of his 80th anniversary. Studia Universitatis Babeș-Bolyai Mathematica, 61(4), 393–408. Retrieved from https://studia.reviste.ubbcluj.ro/index.php/subbmathematica/article/view/5623

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