The Z/p-equivariant spectrum BPR for an odd prime p

Abstract

In the present paper, we construct a Z/p-equivariant analog of the Z/2-equivariant spectrum BPR previously constructed by Hu and Kriz. We prove that this spectrum has some of the properties conjectured by Hill, Hopkins, and Ravenel. Our main construction method is an Z/p-equivariant analog of the Brown-Peterson tower of BP, based on a previous description of the Z/p-equivariant Steenrod algebra with constant coefficients by the authors. We also describe several variants of our construction and comparisons with other known equivariant spectra.

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