Applications of Algebraic Combinatorics to Algebraic Geometry

David Kazhdan; Tamar Ziegler

arXiv:2005.12542·math.AG·February 9, 2021

Applications of Algebraic Combinatorics to Algebraic Geometry

David Kazhdan, Tamar Ziegler

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TL;DR

This paper explores how techniques from algebraic combinatorics can be applied to derive new results in algebraic geometry, highlighting the interdisciplinary connection between these fields.

Contribution

It introduces novel algebraic geometric results based on combinatorial theorems, specifically deriving from Theorem 2.12 in algebraic combinatorics.

Findings

01

New algebraic geometric results derived from combinatorial methods

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Framework connecting algebraic combinatorics and algebraic geometry

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Outline of derivation process from combinatorial theorem to geometric results

Abstract

We formulate a number of new results in Algebraic Geometry and outline their derivation from Theorem 2.12 which belongs to Algebraic Combinatorics.

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