Endomorphisms of positive characteristic tori: entropy and zeta function
Abstract
Let F be a finite field of order q and characteristic p. Let ZF=F[t], QF=F(t), RF=F((1/t)) equipped with the discrete valuation for which 1/t is a uniformizer, and let TF=RF/ZF which has the structure of a compact abelian group. Let d be a positive integer and let A be a d× d-matrix with entries in ZF and non-zero determinant. The multiplication-by-A map is a surjective endomorphism on TFd. First, we compute the entropy of this endomorphism; the result and arguments are analogous to those for the classical case Td=Rd/Zd. Second and most importantly, we resolve the algebraicity problem for the Artin-Mazur zeta function of all such endomorphisms. As a consequence of our main result, we provide a complete characterization and an explicit formula related to the entropy when the zeta function is algebraic.
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