Invariant varieties of periodic points for some higher dimensional integrable maps
Abstract
By studying various rational integrable maps on Cd with p invariants, we show that periodic points form an invariant variety of dimension p for each period, in contrast to the case of nonintegrable maps in which they are isolated. We prove the theorem: `If there is an invariant variety of periodic points of some period, there is no set of isolated periodic points of other period in the map.'
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