Self-products of rationally elliptic spaces and inequalities between the ranks of homotopy and homology groups

Abstract

We give a survey on recent results on inequalities between the ranks of homotopy and cohomology groups (resp., graded components of mixed Hodge structures on these groups) of rationally elliptic spaces (resp., quasi-projective varieties which are rationally elliptic). We also discuss a refinement of these results describing a new invariant of rationally elliptic spaces allowing to compare the ranks of homotopy and homology groups. This invariant is a specialization of an invariant r ( P(t),Q(t); ) of a pair (P(t),Q(t) ) of polynomials with non-negative integer coefficients, describing the range of variable r such that rP(t)<Q(t)r for all t . This range is related to the classical Lambert W-function W(z).