Patchworking singular algebraic curves, non-Archimedean amoebas and enumerative geometry
Abstract
We prove a new patchworking theorem for singular algebraic curves, which states the following. Given a complex toric threefold which fibers over with a reduced reducible zero fiber and other fibers smooth, and given a reduced curve , the theorem provides a sufficient condition for the existence of a one-parametric family of curves , which induces an equisingular deformation for some singular points of and certain prescribed deformations for the other singularities. As application we give a comment on a recent theorem by G. Mikhalkin on enumeration of nodal curves on toric surfaces via non-Archimedean amoebas [arXiv:math.AG/0209253]. Namely, using our patchworking theorem, we establish link between nodal curves over the field of complex Puiseux series and their non-Archimedean amoebas, what has been done by Mikhalkin in a different way. We discuss also the case of curves with a cusp as well as real nodal curves.
Cite
@article{arxiv.math/0211278,
title = {Patchworking singular algebraic curves, non-Archimedean amoebas and enumerative geometry},
author = {Eugenii Shustin},
journal= {arXiv preprint arXiv:math/0211278},
year = {2007}
}
Comments
50 pages, 5 figures