The structuring effect of a Gottlieb element on the Sullivan minimal model of a space

Abstract

We show a Gottlieb element in the rational homotopy of a simply connected space X implies a structural result for the Sullivan minimal model, with different results depending on parity. In the even-degree case, we prove a rational Gottlieb element is a terminal homotopy element. This fact allows us to complete an argument of Dupont to prove an even-degree Gottlieb element gives a free factor in the rational cohomology of a formal space of finite type. We apply the odd-degree result to affirm a special case of the 2N-conjecture on Gottlieb elements of a finite complex. We combine our results to make a contribution to the realization problem for the classifying space Baut1(X). We prove a simply connected space X satisfying Baut1(XQ) SQ2n must have infinite-dimensional rational homotopy and vanishing rational Gottlieb elements above degree 2n-1 for n= 1, 2, 3.