English

Decorated marked surfaces: spherical twists versus braid twists

Representation Theory 2018-02-27 v4 Algebraic Geometry Category Theory Geometric Topology

Abstract

We are interested in the 3-Calabi-Yau categories D\mathcal{D} arising from quivers with potential associated to a triangulated marked surface S\mathbf{S} (without punctures). We prove that the spherical twist group ST of D\mathcal{D} is isomorphic to a subgroup (generated by braid twists) of the mapping class group of the decorated marked surface S\mathbf{S}_{\bigtriangleup}. Here S\mathbf{S}_{\bigtriangleup} is the surface obtained from S\mathbf{S} by decorating with a set of decorated points, where the number of points equals the number of triangles in any triangulations of S\mathbf{S}. For instance, when S\mathbf{S} is an annulus, the result implies the corresponding spaces of stability conditions on D\mathcal{D} is contractible.

Cite

@article{arxiv.1407.0806,
  title  = {Decorated marked surfaces: spherical twists versus braid twists},
  author = {Yu Qiu},
  journal= {arXiv preprint arXiv:1407.0806},
  year   = {2018}
}

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Updated version

R2 v1 2026-06-22T04:54:06.902Z