On The Telescopic Picard Group
Abstract
We prove that for any prime p and height n 1, the telescopic Picard group Pic(SpTn) contains a subgroup of the form Zp × Z/ap(pn-1), where ap = 1 if p = 2 and ap = 2 if p is odd. Using Kummer theory, we obtain an (Fpn× Z/n)-Galois extension of ST(n), obtaining the first example of a lift of a non-Abelian Galois extension of the K(n)-local sphere to the telescopic world, at arbitrary positive height and prime. Our proof proceeds by setting up a higher categorical framework for the periodicity theorem, utilizing the symmetries of this framework to construct Picard elements.
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