Exponential growth in the rational homology of free loop spaces and in torsion homotopy groups

Abstract

Using integral methods we recover and generalize some results by F\'elix, Halperin and Thomas on the growth of the rational homology groups of free loop spaces, and obtain a new family of spaces whose p-torsion in homotopy groups grows exponentially and satisfies Moore's Conjecture for all but finitely many primes. In view of the results, we conjecture that there should be a strong connection between exponential growth in the rational homotopy groups and the p-torsion homotopy groups for any prime p.