Abstract
We show that, providing a metric space $X$ has a boundary that is in some
sense similar to the boundary of hyperbolic space, the iterates of a
contraction $f:X\to X$ converge locally uniformly to a point in, or on the
boundary of, $X$. This generalises the Denjoy–Wolff theorem for analytic
self-maps of the unit disc in the complex plane, and also shows that if $D$
is a bounded strictly convex subdomain of ${\Bbb R}^n$, then any contraction
of $D$ with respect to the Hilbert metric of $D$ converges to a point in the closure of $D$.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,General Mathematics
Cited by
34 articles.
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