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Keywords:
multivalued nonexpansive map; fixed points set; Mosco convergence
multivalued nonexpansive map; fixed points set; Mosco convergence
Summary:
Let $K$ be a closed convex subset of a Hilbert space $H$ and $T:K \multimap K$ a nonexpansive multivalued map with a unique fixed point $z$ such that $\{z\}=T(z)$. It is shown that we can construct a sequence of approximating fixed points sets converging in the sense of Mosco to $z$.
References:
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