The Witt filtration of Lubin-Tate deformation rings
Abstract
This note is a meditation on a generalization WE of the classical p-typical Witt vectors Wp, which arises (geometrically) from isogenies of deformations of formal groups, or (topologically) from the theory of power operations on Morava E-theory. For formal groups of height 1 we have WE=Wp, but the WE are richer when height is ≥ 2. We show that Wp splits naturally from WE. A key property of WE is the isomorphism π0E≈ WE(π0E/m), the ``cofreeness of the Morava E-theory'' proved by Burklund, Schlank, and Yuan. This isomorphism determines a natural ``Witt filtration'' on π0 E. We describe how this Witt filtration interpolates between the p-adic filtration and a geometric filtration on π0E/(p). We use this to give a new proof of cofreeness.
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