An upper bound for the rational topological complexity of a family of elliptic spaces

Abstract: In this work, we show that, for any simply-connected elliptic space $S$ admitting a pure minimal Sullivan model with a differential of constant length, we have ${\rm TC}0(S)\leq 2{\rm cat}_0(S)+\chi{\pi}(S)$ where $\chi_{\pi}(S)$ is the homotopy characteristic. This is a consequence of a structure theorem for this type of models, which is actually our main result.