Real analytic nonexpansive maps on polyhedral normed spaces
Abstract
If a real analytic nonexpansive map on a polyhedral normed space has a nonempty fixed point set, then we show that there is an isometry from an affine subspace onto the fixed point set. As a corollary, we prove that for any real analytic 1-norm or ∞-norm nonexpansive map on Rn, there is a positive integer q such that the period of any periodic orbit divides q and q is the order, or twice the order, of a permutation on n letters. This confirms Nussbaum's 2n Conjecture for ∞-norm nonexpansive maps in the special case where the maps are also real analytic.
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