English

Relative analytic reciprocity laws

Complex Variables 2026-05-06 v2 Algebraic Geometry Differential Geometry

Abstract

We study reciprocity laws involving complex line bundles on fibrations in oriented circles. In particularly, we prove the following reciprocity law. Let BB be a complex manifold and πi:MiB\pi_i : M_i \to B be a fibration in oriented circles, where ii runs through a finite set. Let LiL_i and NiN_i be complex line bundles on every MiM_i. The reciprocity law states that the sum of all (πi)(c1(Li)c1(Ni))(\pi_i)_* \left(c_1(L_i) \cup c_1(N_i) \right), where (πi)(\pi_i)_* is the Gysin map and c1c_1 is the first Chern class, equals zero in H3(B,Z)H^3(B, {\mathbb Z}) when the disjoint union of all MiM_i is embedded into a holomorphic family of compact Riemann surfaces over the base BB such that in every fiber of this family the disjoint union of the embedded circles is the boundary of an embedded compact Riemann surface with boundary, and all LiL_i and all NiN_i are restrictions of holomorphic line bundles on this family.

Keywords

Cite

@article{arxiv.2512.18106,
  title  = {Relative analytic reciprocity laws},
  author = {Denis V. Osipov},
  journal= {arXiv preprint arXiv:2512.18106},
  year   = {2026}
}

Comments

16 pages; minor chnages; to appear in Sbornik: Mathematics

R2 v1 2026-07-01T08:34:27.152Z