Higher Semiadditive Character Theory
Abstract
We introduce and develop the theory of semiadditive characters in the higher semiadditive setting, generalizing both the $T(n)$-local monoidal character and the $K(t)$-local transchromatic character.
These are natural transformations compatible with restriction and transfer maps along $\pi$-finite spaces, with an $(n-t)$-fold $p$-typical free loop space correction built into the target.
We show that every $\infty$-commutative monoid admits a universal $(n-t)$-fold character.
This universal character has several strong structural properties: it exhibits blue shift, satisfies higher cyclotomic descent, and is compatible with the semiadditive Fourier transform.
We compute it for an arbitrary $K(n)$-local object and show that, for Morava $E$-theory, it recovers the $K(t)$-local transchromatic character.
By functoriality, the universal character carries a natural action of the profinite group $\mathrm{GL}_{n-t}(\mathbb{Z}_p)$.
When $t=0$, the fixed points of this action recover rationalization.
As a consequence, we derive an explicit description of $L_{\mathbb{Q}}(S^A_{K(n)})$ for every $\pi$-finite space $A$ and compute the ring of rational $K(n)$-local power operations.
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