Tien-Cuong Dinh, Viet-Anh Nguyen, Tuyen Trung Truong
Published 2016-01-15Version 1
We show that any dominant meromorphic self-map f of a compact Kaehler manifold X is an Artin-Mazur map. More precisely, if P_n(f) is the number of its isolated periodic points of period n (counted with multiplicity), then P_n(f) grows at most exponentially fast with respect to n and the exponential rate is at most equal to the algebraic entropy of f. Further estimates are given when X is a surface. Among the techniques introduced in this paper, the h-dimension of the density between two arbitrary positive closed currents on a compact Kaehler surface is obtained.
Entropy of meromorphic maps and dynamics of birational maps
Equidistribution for meromorphic maps with dominant topological degree
Hyperbolic dimension of Julia sets of meromorphic maps with logarithmic tracts
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