Periodic points for meromorphic self-maps of Fujiki varieties

Abstract

Let f X X be a dominant meromorphic self-map of a compact complex variety X in the Fujiki class C. If the topological degree of f is strictly larger than the other dynamical degrees of f, we show that the number of isolated f-periodic points grows exponentially fast similarly to the topological degrees of the iterates of f; in particular, we give a positive answer to a conjecture of Shou-Wu Zhang. In the general case, we show that the exponential growth of the number of isolated f-periodic points is at most the algebraic entropy of f.

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