Periodicity and finite complexity in higher real K-theories

Abstract

In this paper, we establish periodicity results for higher real K-theories at all heights and for all finite subgroups of the Morava stabilizer group at the prime 2. We further analyze the RO(G)-periodicity lattice of the height-h Lubin--Tate theory, proving new RO(G)-graded periodicities and explicit finiteness results for the RO(G)-graded homotopy groups of Eh. Together, these results provide a foundation for both the structural and computational study of higher real K-theories.

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