A Theorem on Multiplicative Cell Attachments with an Application to Ravenel's X(n) Spectra

Abstract

We show that the homotopy groups of a connective Ek-ring spectrum with an Ek-cell attached along a class α in degree n are isomorphic to the homotopy groups of the cofiber of the self-map associated to α through degree 2n. Using this, we prove that the 2n-1st homotopy groups of Ravenel's X(n) spectra are cyclic for all n. This further implies that, after localizing at a prime, X(n+1) is homotopically unique as the E1-X(n)-algebra with homotopy groups in degree 2n-1 killed by an E1-cell. Lastly, we prove analogous theorems for a sequence of Ek-ring Thom spectra, for each odd k, which are formally similar to Ravenel's X(n) spectra and whose colimit is also MU.