Syntomic cohomology of truncated Brown--Peterson spectra

Abstract

We compute the MU-based syntomic cohomologies, mod (p,v1,·s,vn), of all E1 MU-algebra forms of the truncated Brown--Peterson spectrum BP n. As qualitative consequences, we resolve the Lichtenbaum--Quillen, telescope, and redshift questions for the algebraic K-theories of all E1 MU-algebra forms of BP n. This extends work of the Hahn and Wilson. We also explicitly compute the algebraic K-theory of arbitrary E1 MU-algebra forms of BP 2 at all primes p 5 extending previous work of the author, Ausoni, Culver, Höning, and Rognes.A dditionally, we present a new computation of mod (p, v1, v2, v3) algebraic K-theory of arbitrary E1 MU-algebra forms of BP 3 at all primes p 7, the first explicit computation of algebraic K-theory of an E1-ring of height 3.