Wilson Spaces, Snaith Constructions, and Elliptic Orientations

Abstract

We construct a canonical family of even periodic E∞-ring spectra, with exactly one member of the family for every prime p and chromatic height n. At height 1 our construction is due to Snaith, who built complex K-theory from CP∞. At height 2 we replace CP∞ with a p-local retract of BU 6 , producing a new theory that orients elliptic, but not generic, height 2 Morava E-theories. In general our construction exhibits a kind of redshift, whereby BP n-1 is used to produce a height n theory. A familiar sequence of Bocksteins, studied by Tamanoi, Ravenel, Wilson, and Yagita, relates the K(n)-localization of our height n ring to work of Peterson and Westerland building EnhSG from K(Z,n+1).