English

Finite Morphisms between Projective Varieties and Skeleta

Algebraic Geometry 2015-06-12 v2 Logic

Abstract

In this paper we study finite morphisms between irreducible projective varieties in terms of the morphisms they induce between the respective analytifications. The background for the principal result is as follows. Let VV' and VV be irreducible, projective varieties over an algebraically closed, non- archimedean valued field kk and ϕ\phi be a finite morphism ϕ:VV\phi : V' \to V. Let xVan(L)x \in V^{an}(L), where L/kL/k is an algebraically closed complete non-archimedean valued field extension. We associate canonically to xx an LL-point of the space (V×kL)an(V \times_k L)^{an} which lies on the fiber over xx and denote this point xLx_L. The embedding of VV into some nn-dimensional projective space defines in a natural way a family of open neighbourhoods OxL\mathcal{O}_{x_L} in (V×kL)an(V \times_k L)^{an} of xLx_L. Each element of this family is parametrized by an (n+1)2(n + 1)^2-tuple which quantifies its size. Of particular interest to us will be those elements OO of the set OxL\mathcal{O}_{x_L} whose preimage for the morphism (ϕ×idL)an(\phi \times id_L)^{an} decomposes into the disjoint union of homeomorphic copies of OO via (ϕ×idL)an(\phi \times id_L)^{an}. Let GxLOxL\mathcal{G}_{x_L} \subset \mathcal{O}_{x_L} denote the sub collection of elements of this form. Theorem 1.3 shows that there exists a deformation retraction of the space VV onto a finite simplicial complex such that along the fibers of the retraction the size of the largest element belonging to GxL\mathcal{G}_{x_L} is constant.

Keywords

Cite

@article{arxiv.1210.4781,
  title  = {Finite Morphisms between Projective Varieties and Skeleta},
  author = {John Welliaveetil},
  journal= {arXiv preprint arXiv:1210.4781},
  year   = {2015}
}
R2 v1 2026-06-21T22:23:24.251Z