English

Monodromy of complete intersections and surface potentials

Algebraic Geometry 2014-07-29 v1

Abstract

Following Newton, Ivory and Arnold, we study the Newtonian potentials of algebraic hypersurfaces in RnR^n. The ramification of (analytic continuations of) these potential depends on a monodromy group, which can be considered as a proper subgroup of the local monodromy group of a complete intersection (acting on a {\em twisted} vanishing homology group if nn is odd). Studying this monodromy group we prove, in particular, that the attraction force of a hyperbolic layer of degree dd in RnR^n coincides with appropriate algebraic vector-functions everywhere outside the attracting surface if n=2n=2 or d=2d=2, and is non-algebraic in all domains other than the hyperbolicity domain if the surface is generic and d3d\ge 3 and n3n\ge 3 and n+d8n+d \ge 8. (Later, W. Ebeling has removed the last restriction d+n8d+n \ge 8).

Keywords

Cite

@article{arxiv.1407.7327,
  title  = {Monodromy of complete intersections and surface potentials},
  author = {Victor A. Vassiliev},
  journal= {arXiv preprint arXiv:1407.7327},
  year   = {2014}
}
R2 v1 2026-06-22T05:14:32.187Z