Higher chromatic Thom spectra via unstable homotopy theory

Abstract

We investigate implications of an old conjecture in unstable homotopy theory related to the Cohen-Moore-Neisendorfer theorem and a conjecture about the E2-topological Hochschild cohomology of certain Thom spectra (denoted A, B, and T(n)) related to Ravenel's X(pn). We show that these conjectures imply that the orientations MSpin ko and MString tmf admit spectrum-level splittings. This is shown by generalizing a theorem of Hopkins and Mahowald, which constructs HFp as a Thom spectrum, to construct BPn-1, ko, and tmf as Thom spectra (albeit over T(n), A, and B respectively, and not over the sphere). This interpretation of BPn-1, ko, and tmf offers a new perspective on Wood equivalences of the form bo Cη bu: they are related to the existence of certain EHP sequences in unstable homotopy theory. This construction of BPn-1 also provides a different lens on the nilpotence theorem. Finally, we prove a C2-equivariant analogue of our construction, describing HZ as a Thom spectrum.