Gaps in the Milnor-Moore spectral sequence and the Hilali conjecture

Abstract

In his study of Halperin's toral-rank conjecture, M. R. Hilali conjectured that for any simply connected rationally elliptic space X, one must have dimπ*(X) Q ≤ dimH*(X,Q). Let ( V, d) denote a Sullivan minimal model of X and dk the first non-zero homogeneous part of the differential d. In this paper, we use spectral sequence arguments to prove that if ( V, dk) is elliptic, then, there is no gaps in the E∞ term of the Milnor-Moore spectral sequence of X. Consequently, we confirm the Hilali conjecture when V = Vodd or else when k≥ 3 and ( V, dk) is elliptic.