A toric proof of B\'ezout's theorem for weighted projective spaces

Bernt Ivar Utst{\o}l N{\o}dland

arXiv:1604.02348·math.AG·April 11, 2016·1 cites

A toric proof of B\'ezout's theorem for weighted projective spaces

Bernt Ivar Utst{\o}l N{\o}dland

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TL;DR

This paper employs toric geometry to establish a Bezout type theorem specifically tailored for weighted projective spaces, expanding the theoretical framework of algebraic geometry.

Contribution

It provides a novel toric geometric proof of Bezout's theorem adapted to weighted projective spaces, which were not previously covered by classical proofs.

Findings

01

Proves a Bezout type theorem for weighted projective spaces

02

Utilizes toric geometry methods for the proof

03

Extends classical algebraic geometry results to weighted spaces

Abstract

Using toric geometry we prove a B\'ezout type theorem for weighted projective spaces.

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Taxonomy

TopicsCommutative Algebra and Its Applications · Algebraic Geometry and Number Theory · Polynomial and algebraic computation