Invariant subvarieties with small dynamical degree

Abstract

Let f:X X be a dominant self-morphism of an algebraic variety over an algebraically closed field of characteristic zero. We consider the set f∞ of f-periodic (irreducible closed) subvarieties of small dynamical degree, the subset Sf∞ of maximal elements in f∞, and the subset Sf of f-invariant elements in Sf∞. When X is projective, we prove the finiteness of the set Pf of f-invariant prime divisors with small dynamical degree, and give an optimal upper bound (of cardinality) Pfn d1(f)n(1+o(1)) as n ∞, where d1(f) is the first dynamic degree of f. When X is an algebraic group (with f being a translation of an isogeny), or a (not necessarily complete) toric variety (with f stabilizing the big torus), we give an optimal upper bound Sfn d1(f)n·(X)(1+o(1)) as n ∞, which slightly generalizes a conjecture of S.-W. Zhang for polarized f.