Interactions with lattice polytopes : Magdeburg, Germany, September 2017

This book collects together original research and survey articles highlighting the fertile interdisciplinary applications of convex lattice polytopes in modern mathematics. Covering a diverse range of topics, including algebraic geometry, mirror symmetry, symplectic geometry, discrete geometry, and algebraic combinatorics, the common theme is the study of lattice polytopes. These fascinating combinatorial objects are a cornerstone of toric geometry and continue to find rich and unforeseen applications throughout mathematics. The workshop Interactions with Lattice Polytopes assembled many top researchers at the Otto-von-Guericke-Universitat Magdeburg in 2017 to discuss the role of lattice polytopes in their work, and many of their presented results are collected in this book. Intended to be accessible, these articles are suitable for researchers and graduate students interested in learning about some of the wide-ranging interactions of lattice polytopes in pure mathematics.

Gennadiy Averkov, Difference between families of weakly and strongly maximal integral lattice-free polytopes.- Victor Batyrev, Alexander Kasprzyk, and Karin Schaller, On the Fine interior of three-dimensional canonical Fano polytopes.- Monica Blanco, Lattice distances in 3-dimensional quantum jumps.- Amanda Cameron, Rodica Dinu, Mateusz Michalek, and Tim Seynnaeve, Flag matroids: algebra and geometry.- Daniel Cavey and Edwin Kutas, Classification of minimal polygons with specified singularity content.- Tom Coates, Alessio Corti, and Genival da Silva Jr, On the topology of Fano smoothings.- Sandra Di Rocco and Anders Lundman, Computing Seshadri constants on smooth toric surfaces.- Akihiro Higashitani, The characterisation problem of Ehrhart polynomials of lattice polytopes.- Johannes Hofscheier, The ring of conditions for horospherical homogeneous spaces.- Katharina Jochemko, Linear recursions for integer point transforms.- Valentina Kiritchenko and Maria Padalko, Schubert calculus on Newton-Okounkov polytopes.- Bach Le Tran, An Eisenbud-Goto-type upper bound for the Castelnuovo-Mumford regularity of fake weighted projective spaces.- Milena Pabiniak, Toric degenerations in symplectic geometry.- Andrea Petracci, On deformations of toric Fano varieties Thomas Prince, Polygons of finite mutation type.- Hendrik Suss, Orbit spaces of maximal torus actions on oriented Grassmannians of planes .- Akiyoshi Tsuchiya, The reflexive dimension of (0, 1)-polytopes