Eigenvalues and dynamical degrees of self-maps on abelian varieties

Abstract

Let X be a smooth projective variety over an algebraically closed field, and f X X a surjective self-morphism of X. The i-th cohomological dynamical degree i(f) is defined as the spectral radius of the pullback f* on the \'etale cohomology group Hi\'et(X, Q) and the k-th numerical dynamical degree λk(f) as the spectral radius of the pullback f* on the vector space Nk(X)R of real algebraic cycles of codimension k on X modulo numerical equivalence. Truong conjectured that 2k(f) = λk(f) for all 0 k X as a generalization of Weil's Riemann hypothesis. We prove this conjecture in the case of abelian varieties. In the course of the proof we also obtain a new parity result on the eigenvalues of self-maps of abelian varieties in prime characteristic, which is of independent interest.