English

An affirmative answer to a conjecture for Metoki class

Differential Geometry 2015-12-03 v1

Abstract

In "The {G}el'fand-{K}alinin-{F}uks class and characteristic classes of transversely symplectic foliations" arXiv:0910.3414, Kotschick and Morita showed that the Gel'fand-Kalinin-Fuks class in \ds\HGF728\ds\HGF{7}{2}{}{8} is decomposed as a product ηω\eta\wedge \omega of some leaf cohomology class η\eta and a transverse symplectic class ω\omega. We show that the same formula holds for Metoki class, which is a non-trivial element in \ds\HGF9214\ds \HGF{9}{2}{}{14}. The result was conjectured by Kotschick and Morita, where they studied characteristic classes of symplectic foliations due to Kontsevich. Our proof depends on Groebner Basis theory using computer calculations.

Keywords

Cite

@article{arxiv.1407.4646,
  title  = {An affirmative answer to a conjecture for Metoki class},
  author = {Kentaro Mikami},
  journal= {arXiv preprint arXiv:1407.4646},
  year   = {2015}
}

Comments

11 plain text files which are output of Maple calculations and also raw materials. These are stored subdirectory anc as ancillary files. You can see the file size on appendices

R2 v1 2026-06-22T05:06:31.623Z