For any non-trivial convex and bounded subset $C$ of a Banach space, we show
that outside of a $\sigma$-porous subset of the space of non-expansive mappings
$C\to C$, all mappings have the maximal Lipschitz constant one witnessed
locally at typical points of $C$. This extends a result of Bargetz and the
author from separable Banach spaces to all Banach spaces and the proof given is
completely independent. We further establish a fine relationship between the
classes of exceptional sets involved in this statement, captured by the
hierarchy of notions of $\phi$-porosity.Comment: A few corrections and improvements made. To appear in Israel Journal
  of Mathematic

Dymond, Michael

English

arXiv

For any non-trivial convex and bounded subset $C$ of a Banach space, we show that outside of a $\sigma$-porous subset of the space of non-expansive mappings $C\to C$, all mappings have the maximal Lipschitz constant one witnessed locally at typical points of $C$. This extends a result of Bargetz and the author from separable Banach spaces to all Banach spaces and the proof given is completely independent. We further establish a fine relationship between the classes of exceptional sets involved in this statement, captured by the hierarchy of notions of $\phi$-porosity

University of Birmingham Research Portal

Porosity phenomena of non-expansive, Banach space mappings

arXiv.org e-Print Archive

http://pure-oai.bham.ac.uk/ws/files/177140827/2110.13722v2.pdf

Porosity phenomena of non-expansive, Banach space mappings

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