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Related papers: On smooth Gorenstein polytopes

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It is known that a lattice simplex of dimension $d$ corresponds a finite abelian subgroup of $(\mathbb{R}/\mathbb{Z})^{d+1}$. Conversely, given a finite abelian subgroup of $(\mathbb{R}/\mathbb{Z})^{d+1}$ such that the sum of all entries of…

Combinatorics · Mathematics 2020-09-08 Akiyoshi Tsuchiya

We obtain a combinatorial description of Gorenstein spherical Fano varieties in terms of certain polytopes, generalizing the combinatorial description of Gorenstein toric Fano varieties by reflexive polytopes and its extension to Gorenstein…

Algebraic Geometry · Mathematics 2016-04-06 Giuliano Gagliardi , Johannes Hofscheier

Many (if not most) of convex polytopes, important for combinatorial and algebraic geometry, are closely related to secondary polytopes of point configurations, or base polytopes of submodular functions, or their numerous variations and…

Combinatorics · Mathematics 2024-11-05 Alexander Esterov , Arina Voorhaar

Using Cayley trick, we define the notions of mixed toric residues and mixed Hessians associated with $r$ Laurent polynomials $f_1,...,f_r$.We conjecture that the values of mixed toric residues on the mixed Hessians are determined by mixed…

Algebraic Geometry · Mathematics 2007-05-23 Victor V. Batyrev , Evgeny N. Materov

We give an orbifold Riemann-Roch formula in closed form for the Hilbert series of a quasismooth polarized n-fold X,D, under the assumption that X is projectively Gorenstein with only isolated orbifold points. Our formula is a sum of parts…

Algebraic Geometry · Mathematics 2015-06-11 Anita Buckley , Miles Reid , Shengtian Zhou

The classification of toric Fano manifolds with large Picard number corresponds to the classification of smooth Fano polytopes with large number of vertices. A smooth Fano polytope is a polytope that contains the origin in its interior such…

Algebraic Geometry · Mathematics 2015-08-11 Benjamin Assarf , Benjamin Nill

Monotone polytopes, also known as smooth reflexive polytopes, are the polytopes associated to monotone symplectic toric manifolds and Gorenstein Fano toric varieties. We first show that the only monotone polytopes admitting blow-ups at…

Symplectic Geometry · Mathematics 2026-03-20 Álvaro Pelayo , Francisco Santos

We present an algorithm that produces the classification list of smooth Fano d-polytopes for any given d. The input of the algorithm is a single number, namely the positive integer d. The algorithm has been used to classify smooth Fano…

Combinatorics · Mathematics 2007-05-23 Mikkel Øbro

We generalize the toric residue mirror conjecture of Batyrev and Materov to not necessarily reflexive polytopes. Using this generalization we prove the toric residue mirror conjecture for Calabi-Yau complete intersections in Gorenstein…

Algebraic Geometry · Mathematics 2007-05-23 Kalle Karu

We classify indecomposable non-projective Gorenstein-projective modules over a monomial algebra via the notion of perfect paths. We apply this classification to a quadratic monomial algebra and describe explicitly the stable category of its…

Representation Theory · Mathematics 2015-01-14 Xiao-Wu Chen , Dawei Shen , Guodong Zhou

The subject of this paper is a connection between d-orthogonal polynomials and the Toda lattice hierarchy. In more details we consider some polynomial systems similar to Hermite polynomials, but satisfying $d+2$-term recurrence relation, $d…

Mathematical Physics · Physics 2019-04-18 Emil Horozov

Gorenstein Fano polytopes arising from finite partially ordered sets will be introduced. Then we study the problem which partially ordered sets yield smooth Fano polytopes.

Combinatorics · Mathematics 2010-01-19 Takayuki Hibi , Akihiro Higashitani

Using an inclusion of one reflexive polytope into another is a well-known strategy for connecting the moduli spaces of two Calabi-Yau families. In this paper we look at the question of when an inclusion of reflexive polytopes determines a…

Algebraic Geometry · Mathematics 2015-06-18 Karl Fredrickson

In this paper, we introduce and study differential graded (DG for short) polynomial algebras. In brief, a DG polynomial algebra $\mathcal{A}$ is a connected cochain DG algebra such that its underlying graded algebra $\mathcal{A}^{\#}$ is a…

Rings and Algebras · Mathematics 2018-04-25 X. -F. Mao , X. -D. Gao , Y. -N. Yang , J. -H. Chen

We classify the Fano and reflexive polytopes that arise from quasi-finite Feynman integrals. These polytopes appear as scaled Minkowski sums of the Newton polytopes associated with the Symanzik graph polynomials. For one-loop graphs and…

High Energy Physics - Theory · Physics 2026-05-21 Leonardo de la Cruz , Pavel P. Novichkov , Pierre Vanhove

Generalizing work of Athanasiadis for the Birkhoff polytope and Reiner and Welker for order polytopes, in 2007 Bruns and R\"omer proved that any Gorenstein lattice polytope with a regular unimodular triangulation admits a regular unimodular…

Combinatorics · Mathematics 2025-02-17 Benjamin Braun , Alvaro Cornejo

Q-factorial Gorenstein toric Fano varieties X of dimension d with Picard number rho(X) correspond to simplicial reflexive d-polytopes with rho(X)+d vertices. Casagrande showed that any simplicial reflexive d-polytope has at most 3d…

Algebraic Geometry · Mathematics 2016-08-14 Benjamin Nill , Mikkel Øbro

A directed edge polytope $\mathcal{A}_G$ is a lattice polytope arising from root system $A_n$ and a finite directed graph $G$. If every directed edge of $G$ belongs to a directed cycle in $G$, then $\mathcal{A}_G$ is terminal and reflexive,…

Combinatorics · Mathematics 2023-07-14 Selvi Kara , Irem Portakal , Akiyoshi Tsuchiya

One may construct a large class of Calabi-Yau varieties by taking anticanonical hypersurfaces in toric varieties obtained from reflexive polytopes. If the intersection of a reflexive polytope with a hyperplane through the origin yields a…

A toric variety is constructed from a lattice polytope. It is common in algebraic combinatorics to carry this way a notion of an algebraic property from the variety to the polytope. From the combinatorial point of view, one of the most…

Combinatorics · Mathematics 2020-05-19 Michał Lasoń , Mateusz Michałek