Universal property of the Bousfield--Kuhn functor
Abstract
We present a universal property of the Bousfield--Kuhn functor h of height h, for every positive natural number h. This result is achieved by proving that the costabilisation of the ∞-category of vh-periodic homotopy types is equivalent to the ∞-category of T(h)-local spectra. A key component in our proofs is the spectral Lie algebra model for vh-periodic homotopy types (see arXiv:1803.06325): We relate the costabilisation of the ∞-category of spectral Lie algebras with the costabilisations of the ∞-category of non-unital En-algebras, via our construction of higher enveloping algebras of spectral Lie algebras.
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