Almost mathematics, Persistence module, and Tamarkin category
Abstract
We precisely uniform 3 theories that are widely used for symplectic geometers: (Almost) modules over Novikov ring, Persistence module, and Tamarkin category. Along with our method, we also give a neat understanding and language for the related results, in particular, Vaintrob's Novikov/log-perfectoid mirror symmetry for Novikov toric varieties. The results of this paper can also be treated as a study of persistent homology from a higher algebra point of view. Some of our results are shown in the literature, but our method is higher-categorical and sophisticated. As applications, we discuss a Novikov ring coefficient homological mirror symmetry for toric varieties and propose a conjecture for Novikov ring coefficient homological mirror symmetry for log Calabi-Yau varieties.
Keywords
Cite
@article{arxiv.2503.15933,
title = {Almost mathematics, Persistence module, and Tamarkin category},
author = {Tatsuki Kuwagaki and Bingyu Zhang},
journal= {arXiv preprint arXiv:2503.15933},
year = {2025}
}
Comments
41 pages. Comments are welcome! v2: Remove the projectivity condition of fans in related results. And some minor changes and corrections