Free divisors versus stability and coincidence thresholds

Gabriel Sticlaru

arXiv:1401.1843·math.AG·January 10, 2014·1 cites

Free divisors versus stability and coincidence thresholds

Gabriel Sticlaru

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TL;DR

This paper uncovers a surprising connection between free divisors and the stability and coincidence thresholds in the context of projective hypersurfaces, revealing new insights into their interplay.

Contribution

It establishes a novel relationship between free divisors and stability and coincidence thresholds in algebraic geometry.

Findings

01

Identifies a new link between free divisors and thresholds.

02

Provides theoretical insights into hypersurface properties.

03

Suggests potential applications in algebraic geometry.

Abstract

We show that there is an unexpected relation between free divisors and stability and coincidence thresholds for projective hypersurfaces.

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Taxonomy

TopicsAlgebraic Geometry and Number Theory · Commutative Algebra and Its Applications · Advanced Differential Equations and Dynamical Systems