Duals of higher real K-theories at p=2
Abstract
We study K(h)-local Spanier-Whitehead duality for C2n-equivariant Lubin-Tate spectra, Eh, at the prime 2 and heights h divisible by 2n-1. We determine a C2n-equivariant equivalence DEh-Vh Eh, for an explicit C2n-representation, Vh. We then study the RO(C2n)-periodicities of Eh at some low heights. With these ingredients, we determine the self-duality of some higher real K-theories up to a specified suspension shift, at some low-heights. In particular, we show that DE4hC8 112E4hC8.
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