Detecting $\beta$ elements in iterated algebraic K-theory
Abstract
The Lichtenbaum--Quillen conjecture (LQC) relates special values of zeta functions to algebraic K-theory groups. The Ausoni--Rognes red-shift conjectures generalize the LQC to higher chromatic heights in a precise sense. In this paper, we propose an alternate generalization of the LQC to higher chromatic heights and give evidence for it at height two. In particular, if the -th Greek letter family is detected by a commutative ring spectrum , then we conjecture that the -st Greek letter family will be detected by the algebraic K-theory of . We prove this in the case for modulo where and is a prime power generator of the units in . In particular, we prove that the commutative ring spectrum detects the part of the -primary -family that survives mod . The method of proof also implies that these elements are detected in iterated algebraic K-theory of the integers. Consequently, one may relate iterated algebraic K-theory groups of the integers to integral modular forms satisfying certain congruences.
Cite
@article{arxiv.1810.10088,
title = {Detecting $\beta$ elements in iterated algebraic K-theory},
author = {Gabriel Angelini-Knoll},
journal= {arXiv preprint arXiv:1810.10088},
year = {2022}
}
Comments
33 pages including references. To appear in Trans. Am. Math. Soc. This version may differ slightly from the published version