English

Orthogonally spherical objects and spherical fibrations

Algebraic Geometry 2015-10-21 v2

Abstract

We introduce a relative version of the spherical objects of Seidel and Thomas. Define an object E in the derived category D(Z x X) to be spherical over Z if the corresponding functor from D(Z) to D(X) gives rise to autoequivalences of D(Z) and D(X) in a certain natural way. Most known examples come from subschemes of X fibred over Z. This categorifies to the notion of an object of D(Z x X) orthogonal over Z. We prove that such an object is spherical over Z if and only if it has certain cohomological properties similar to those in the original definition of a spherical object. We then interpret this geometrically in the case when our objects are actual flat fibrations in X over Z.

Keywords

Cite

@article{arxiv.1011.0707,
  title  = {Orthogonally spherical objects and spherical fibrations},
  author = {Rina Anno and Timothy Logvinenko},
  journal= {arXiv preprint arXiv:1011.0707},
  year   = {2015}
}

Comments

29 pages; v2: A missing assumption reinstated in Prop. 3.7, some notation cleaned up. The final version to appear in Adv. in Math

R2 v1 2026-06-21T16:37:58.330Z