On existence of Ulrich sheaf

Anindya Mukherjee; Pabitra Barik

arXiv:2511.11001·math.AG·November 26, 2025

On existence of Ulrich sheaf

Anindya Mukherjee, Pabitra Barik

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TL;DR

This paper demonstrates the existence of Ulrich sheaves on symmetric powers of varieties, on certain singular varieties like Hillb^{n}C, and on blow-ups of abelian varieties, expanding the known classes of varieties with Ulrich bundles.

Contribution

It constructs Ulrich sheaves on symmetric powers of varieties and on blow-ups of abelian varieties, providing new examples and methods for their existence.

Findings

01

Ulrich sheaves exist on symmetric powers of varieties.

02

Ulrich sheaves are constructed on Hillb^{n}C, a singular variety.

03

Ulrich sheaves are shown to exist on blow-ups of abelian varieties.

Abstract

Let X be a smooth projective variety carrying an Ulrich bundle. In the first part of this note, we construct an Ulrich sheaf on n-th symmetric power of X, which is a singular variety when $D im X > 1$ . As a consequence, we get the existence of an Ulrich bundle on Hillb^{n}C, where C is a smooth projective curve. Let A be an abelian variety which carries an Ulrich bundle. In the second part of this note, we show the existence of Ulrich bundle on the blow up of $A \times A$ along $A \times {0}$ .

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Taxonomy

TopicsAlgebraic Geometry and Number Theory · Homotopy and Cohomology in Algebraic Topology · Geometry and complex manifolds