English

(T)-structures over 2-dimensional F-manifolds: formal classification

Differential Geometry 2019-07-17 v2

Abstract

A (TE)(TE)-structure \nabla over a complex manifold MM is a meromorphic connection defined on a holomorphic vector bundle over C×M\mathbb{C}\times M, with poles of Poincar\'e rank one along {0}×M.\{ 0 \} \times M. Under a mild additional condition (the so called unfolding condition), \nabla induces a multiplication on TMTM and a vector field on MM (the Euler field), which make MM into an FF-manifold with Euler field. By taking the pull-backs of \nabla under the inclusions {z}×MC×M\{ z\} \times M \rightarrow \mathbb{C}\times M we obtain a family of flat connections on vector bundles over MM, parameterized by zCz\in \mathbb{C}^{*}. The properties of such a family of connections give rise to the notion of (T)(T)-structure. Therefore, any (TE)(TE)-structure underlies a (T)(T)-structure but the converse is not true. The unfolding condition can be defined also for (T)(T)-structures. A (T)(T)-structure with the unfolding condition induces on its parameter space the structure of an FF-manifold (without Euler field). After a brief review on the theory of (T)(T) and (TE)(TE)-structures, we determine normal forms for the equivalence classes, under formal isomorphisms, of (T)(T)-structures which induce a given irreducible germ of 22-dimensional FF-manifolds.

Keywords

Cite

@article{arxiv.1811.03406,
  title  = {(T)-structures over 2-dimensional F-manifolds: formal classification},
  author = {Liana David and Claus Hertling},
  journal= {arXiv preprint arXiv:1811.03406},
  year   = {2019}
}

Comments

28 pages; with respect to the previous version, some arguments (based on the new Lemma 14) are simplified; the main results are the same; Remarks 17, 20 and 22 are added

R2 v1 2026-06-23T05:08:57.557Z