On a dynamical version of a theorem of Rosenlicht
Abstract
Consider the action of an algebraic group G on an irreducible algebraic variety X all defined over a field k. M. Rosenlicht showed that orbits in general position in X can be separated by rational invariants. We prove a dynamical analogue of this theorem, where G is replaced by a semigroup of dominant rational self-maps of X. Our semigroup G is not required to have the structure of an algebraic variety and can be of arbitrary cardinality.
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