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On the Karlsson-Nussbaum conjecture for resolvents of nonexpansive mappings

Published 31 Oct 2023 in math.FA | (2310.20262v1)

Abstract: Let $D\subset \mathbb{R}{n}$ be a bounded convex domain and $F:D\rightarrow D$ a $1$-Lipschitz mapping with respect to the Hilbert metric $d$ on $D$ satisfying condition $d(sx+(1-s)y,sz+(1-s)w)\leq \max {d(x,z),d(y,w) }$. We show that if $F$ does not have fixed points, then the convex hull of the accumulation points (in the norm topology) of the family ${R_{\lambda }}_{\lambda >0}$ of resolvents of $F$ is a subset of $\partial D.$ As a consequence, we show a Wolff-Denjoy type theorem for resolvents of nonexpansive mappings acting on an ellipsoid $D$.

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