Anna-Lena Winz scite author profile

Anna-Lena Winz

5Publications

41Citation Statements Received

98Citation Statements Given

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Freie Universität Berlin

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Immaculate line bundles on toric varieties

Altmann

Buczyński

Kastner

et al. 2020

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We call a sheaf on an algebraic variety immaculate if it lacks any cohomology including the zero-th one, that is, if the derived version of the global section functor vanishes. Such sheaves are the basic tools when building exceptional sequences, investigating the diagonal property, or the toric Frobenius morphism.In the present paper we focus on line bundles on toric varieties. First, we present a possibility of understanding their cohomology in terms of their (generalized) momentum polytopes. Then we present a method to exhibit the entire locus of immaculate divisors within the class group. This will be applied to the cases of smooth toric varieties of Picard rank two and three and to those being given by splitting fans.The locus of immaculate line bundles contains several linear strata of varying dimensions. We introduce a notion of relative immaculacy with respect to certain contraction morphisms. This notion will be stronger than plain immaculacy and provides an explanation of some of these linear strata.

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Cellular Sheaf Cohomology in Polymake

Kastner

Shaw

Winz

2017

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This chapter provides a guide to our polymake extension cellularSheaves. We first define cellular sheaves on polyhedral complexes in Euclidean space, as well as cosheaves, and their (co)homologies. As motivation, we summarise some results from toric and tropical geometry linking cellular sheaf cohomologies to cohomologies of algebraic varieties. We then give an overview of the structure of the extension cellularSheaves for polymake. Finally, we illustrate the usage of the extension with examples from toric and tropical geometry.

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Canonical Hilbert-Burch matrices for power series

Homs

Winz

2021

Journal of Algebra

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Immaculate line bundles on toric varieties

Altmann¹,

Buczyński²,

Kastner³

et al. 2018

Preprint

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Toric geometry in polymake

Kastner¹,

Lorenz²,

Paffenholz³

et al. 2018

ACM Commun. Comput. Algebra

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We give an overview of the application 'fulton' for toric geometry of the software framework polymake. Using two-dimensional cyclic quotient singularities as our main example, we will show how to create toric varieties and divisors on these. The Singular interface of polymake allows one to go back to the algebraic side in case there is no combinatorial algorithm known yet, in order to develop new conjectures and algorithms.

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Anna-Lena Winz

Immaculate line bundles on toric varieties

Cellular Sheaf Cohomology in Polymake

Canonical Hilbert-Burch matrices for power series

Immaculate line bundles on toric varieties

Toric geometry in polymake

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