Degenerations of Planar Linear Systems

C. Ciliberto (U. of Rome II); R. Miranda (Colorado State U.)

arXiv:alg-geom/9702015·alg-geom·February 3, 2008·37 cites

Degenerations of Planar Linear Systems

C. Ciliberto (U. of Rome II), R. Miranda (Colorado State U.)

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TL;DR

This paper introduces a new recursive approach to determine the dimension of linear systems of plane curves with multiple points, successfully computing these dimensions for various cases, including constant and quasi-homogeneous multiplicities.

Contribution

It presents a novel degeneration-based method that simplifies the calculation of dimensions of linear systems with multiple points, extending previous results.

Findings

01

Successfully computed dimensions for all n with multiplicities up to 3

02

Developed a recursive approach based on plane degenerations

03

Extended results to quasi-homogeneous multiplicity cases

Abstract

Fixing $n$ general points $p_{i}$ in the plane, what is the dimension of the space of plane curves of degree $d$ having multiplicity $m_{i}$ at $p_{i}$ for each $i$ ? In this article we propose an approach to attack this problem, and demonstrate it by successfully computing this dimension for all $n$ and for $m_{i}$ constant, at most 3. This application, while previously known (see \cite{hirschowitz1}), demonstrates the utility of our approach, which is based on an analysis of the corresponding linear system on a degeneration of the plane itself, leading to a simple recursion for these dimensions. We also obtain results in the ``quasi-homogeneous'' case when all the multiplicities are equal except one; this is the natural family to consider in the recursion.

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Taxonomy

TopicsAlgebraic Geometry and Number Theory · Commutative Algebra and Its Applications · Polynomial and algebraic computation