Symplectomorphisms and spherical objects in the conifold smoothing
Abstract
Let denote the `conifold smoothing', the symplectic Weinstein manifold which is the complement of a smooth conic in , or equivalently the plumbing of two copies of along a Hopf link. Let denote the `conifold resolution', by which we mean the complement of a smooth divisor in . We prove that the compactly supported symplectic mapping class group of splits off a copy of an infinite rank free group, in particular is infinitely generated; and we classify spherical objects in the bounded derived category (the three-dimensional `affine -case'). Our results build on work of Chan-Pomerleano-Ueda and Toda, and both theorems make essential use of working on the `other side' of the mirror.
Cite
@article{arxiv.2301.10525,
title = {Symplectomorphisms and spherical objects in the conifold smoothing},
author = {Ailsa Keating and Ivan Smith},
journal= {arXiv preprint arXiv:2301.10525},
year = {2026}
}
Comments
v3: 42 pages, 5 figures; incorporates corrigendum (accepted for publication), main results are unaffected