Duality for Topological Modular Forms

Abstract

It has been observed that certain localizations of the spectrum of topological modular forms are self-dual (Mahowald-Rezk, Gross-Hopkins). We provide an integral explanation of these results that is internal to the geometry of the (compactified) moduli stack of elliptic curves , yet is only true in the derived setting. When 2 is inverted, a choice of level 2 structure for an elliptic curve provides a geometrically well-behaved cover of , which allows one to consider Tmf as the homotopy fixed points of Tmf(2) , topological modular forms with level 2 structure, under a natural action by GL2(/2) . As a result of Grothendieck-Serre duality, we obtain that Tmf(2) is self-dual. The vanishing of the associated Tate spectrum then makes Tmf itself Anderson self-dual.