The pseudo-index of horospherical Fano varieties

Boris Pasquier

arXiv:0802.0612·math.AG·February 6, 2008

The pseudo-index of horospherical Fano varieties

Boris Pasquier

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TL;DR

This paper proves a conjecture regarding the pseudo-index of smooth Fano varieties, specifically focusing on horospherical varieties, thereby advancing understanding in algebraic geometry.

Contribution

It establishes the conjecture for the pseudo-index of smooth Fano varieties within the class of horospherical varieties, a special case in algebraic geometry.

Findings

01

Confirmed the conjecture for horospherical Fano varieties

02

Provided new insights into the structure of horospherical varieties

03

Enhanced understanding of pseudo-index bounds in algebraic geometry

Abstract

We prove a conjecture of L.Bonavero, C. Casagrande, O. Debarre and S. Druel, on the pseudo-index of smooth Fano varieties, in the special case of horospherical varieties.

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Taxonomy

TopicsAlgebraic Geometry and Number Theory · Geometry and complex manifolds · Meromorphic and Entire Functions