On a theorem about Mosco convergence in Hadamard spaces

Published 12 Oct 2020 in math.FA and math.MG | (2010.05554v1)

Abstract: Let $(f^n),f$ be a sequence of proper closed convex functions defined on a Hadamard space. We show that the convergence of proximal mappings $J^{n_{\lambda}x$} to $J_{\lambda}x$, under certain additional conditions, imply Mosco convergence of $f^n$ to $f$. This result is a converse to a theorem of Bacak about Mosco convergence in Hadamard spaces.

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Arian Berdellima

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