中文

Monopole triangle over integers

几何拓扑 2026-06-29 v1 微分几何

摘要

We prove the surgery exact triangle for monopole (Seiberg--Witten) Floer homology over integer coefficients, extending the work of Kronheimer--Mrowka--Ozsv\'{a}th--Szab\'{o} over Z/2\mathbb{Z}/2, Lin--Ruberman--Saveliev over Q\mathbb{Q}, and Freeman over Z[1]\mathbb{Z}[\sqrt{-1}]. Our proof is based on a modification of Kronheimer--Mrowka's local system on monopole Floer homology and an adaptation of Freeman's computation. As a standard application, following Bloom and Scaduto, we obtain a spectral sequence Kh~odd(L)HM~(Σ2(L))\widetilde{Kh}_{\mathrm{odd}}(L)\Rightarrow \widetilde{HM}_\bullet(-\Sigma_2(L)) over integer coefficients for an oriented link LS3L\subset S^3, thereby solving Ozsv\'{a}th--Rasmussen--Szab\'{o}'s conjecture.

引用

@article{arxiv.2606.29882,
  title  = {Monopole triangle over integers},
  author = {Haochen Qiu and Fan Ye},
  journal= {arXiv preprint arXiv:2606.29882},
  year   = {2026}
}

备注

35 pages, 6 figures. Comments are welcome