When a smooth self-map of a semi-simple Lie group can realize the least number of periodic points

Abstract

There are two algebraic lower bounds of the number of n-periodic points of a self-map f:M M of a compact smooth manifold of dimension at least 3 : NFn(f)=min #Fix(gn) ;g f; g continuous and NJDn(f)=min #Fix(gn) ;g f; g smooth. In general NJDn(f) may be much greater than NFn(f). We show that for a self-map of a semi-simple Lie group, inducing the identity fundamental group homomorphism, the equality NFn(f)=NJDn(f) holds for all n iff all eigenvalues of a quotient cohomology homomorphism induced by f have moduli 1.