Toric Geometry

Daniel Erman; Milena Hering; Nathan Ilten; Hendrik Süß

doi:10.4171/owr/2025/19

JournalsowrVol. 22, No. 2pp. 883–940

Toric Geometry

Daniel Erman
University of Hawaiʻi at Mānoa, Honolulu, USA
Milena Hering
The University of Edinburgh, UK
- MathSciNet
- zbMATH Open
Nathan Ilten
Simon Fraser University, Burnaby, Canada
- MathSciNet
- zbMATH Open
Hendrik Süß
Universität Jena, Germany
- MathSciNet
- zbMATH Open

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Abstract

Toric varieties provide a rich class of examples in algebraic geometry that benefit from deep and fruitful interactions with combinatorics. This workshop highlighted recent interactions between toric geometry and mirror symmetry, matroids, deformation theory and moduli spaces, and non-commutative geometry, as well as some exciting new developments within toric geometry itself.

Cite this article

Daniel Erman, Milena Hering, Nathan Ilten, Hendrik Süß, Toric Geometry. Oberwolfach Rep. 22 (2025), no. 2, pp. 883–940

DOI 10.4171/OWR/2025/19