tmf Is Not a Ring Spectrum Quotient of String Bordism

Abstract

This paper shows that tmf[1/6] is not a ring spectrum quotient of MO8[1/6]. In fact, for any prime p>3 and any sequence X of homogeneous elements of π*MO8, the π*MO8-module π*(MO8(p)/X) is not (even abstractly) isomorphic to π*tmf(p). It does so by showing that, for any commutative ring spectrum R and any sequence X of homogeneous elements of π*(R), there is an isomorphism of graded Q-vector spaces π*(R/X)Q H*(Tot(K(X)))Q, where the right-hand side is the rational homology of the (total) Koszul complex of X, which is strictly bigger than π*(R)/(X)Q unless X is a π*(R)Q-quasi-regular sequence. The result then follows from the fact that the kernel of the p-local Witten genus cannot be generated by a π*MO8Q-quasi-regular sequence.