Chromatic Noshift
Abstract
The chromatic redshift philosophy, introduced by Ausoni and Rognes, suggests that algebraic -theory raises chromatic height by . We show that the analogue of this philosophy fails in the case of rigid symmetric monoidal stable -categories. More precisely, we construct examples of rigid -local categories where a refinement of the dimension morphism induces an equivalence and for which therefore vanishes -locally. In fact, we prove that this equivalence always holds for -Nullstellensatzian rigid -local categories in the sense of Burklund, Schlank and Yuan. We study more in depth the rational version of these results to find a rigid rational additive -category witnessing the failure of redshift at height . Finally, we use our methods to prove and generalize a conjecture of Levy about categorification of ordinary rings.
Cite
@article{arxiv.2604.01863,
title = {Chromatic Noshift},
author = {Maxime Ramzi},
journal= {arXiv preprint arXiv:2604.01863},
year = {2026}
}
Comments
47 pages, comments welcome !