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Nill, Benjamin
108
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Online (108)
Mediatypes
E-Books (1)
Articles (Online) (36)
OpenAccess-fulltext (68)
Thesis (Online) (3)
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1
Thin Polytopes: Lattice Polytopes With Vanishing Local h*-P..:
Borger, Christopher
;
Kretschmer, Andreas
;
Nill, Benjamin
International Mathematics Research Notices. 2024 (2023) 7 - p. 5619-5657 , 2023
Link:
https://doi.org/10.1093/..
?
2
Proof of a Conjecture of Batyrev and Juny on Gorenstein Pol..:
Nill, Benjamin
Discrete & Computational Geometry. , 2023
Link:
https://doi.org/10.1007/..
?
3
Interactions with Lattice Polytopes: Magdeburg, Germany, Se..
Springer Proceedings in Mathematics & Statistics, 386
Kasprzyk, Alexander M
;
Nill, Benjamin
- 1st ed. 2022 . , 2022
Link:
https://doi.org/10.1007/..
?
4
On the maximum dual volume of a canonical Fano polytope:
Balletti, Gabriele
;
Kasprzyk, Alexander M.
;
Nill, Benjamin
Forum of Mathematics, Sigma. 10 (2022) - p. , 2022
Link:
https://doi.org/10.1017/..
?
5
Generalized flatness constants, spanning lattice polytopes,..:
Averkov, Gennadiy
;
Hofscheier, Johannes
;
Nill, Benjamin
manuscripta mathematica. 170 (2021) 1-2 - p. 147-165 , 2021
Link:
https://doi.org/10.1007/..
?
6
On defectivity of families of full-dimensional point config..:
Borger, Christopher
;
Nill, Benjamin
Proceedings of the American Mathematical Society, Series B. 7 (2020) 4 - p. 43-51 , 2020
Link:
https://doi.org/10.1090/..
?
7
The Mixed Degree of Families of Lattice Polytopes:
Nill, Benjamin
Annals of Combinatorics. 24 (2020) 1 - p. 203-216 , 2020
Link:
https://doi.org/10.1007/..
?
8
Gorenstein polytopes with trinomial $$h^*$$-polynomials:
Higashitani, Akihiro
;
Nill, Benjamin
;
Tsuchiya, Akiyoshi
Beiträge zur Algebra und Geometrie / Contributions to Algebra and Geometry. , 2020
Link:
https://doi.org/10.1007/..
?
9
A note on discrete mixed volume and Hodge–Deligne numbers:
Di Rocco, Sandra
;
Haase, Christian
;
Nill, Benjamin
Advances in Applied Mathematics. 104 (2019) - p. 1-13 , 2019
Link:
https://doi.org/10.1016/..
?
10
Lattice Simplices with a Fixed Positive Number of Interior ..:
Nill, Benjamin
;
Krümpelmann, Jan
;
Averkov, Gennadiy
International Mathematics Research Notices. 2020 (2018) 13 - p. 3871-3885 , 2018
Link:
https://doi.org/10.1093/..
?
11
Smooth polytopes with negative Ehrhart coefficients:
Castillo, Federico
;
Liu, Fu
;
Nill, Benjamin
.
Journal of Combinatorial Theory, Series A. 160 (2018) - p. 316-331 , 2018
Link:
https://doi.org/10.1016/..
?
12
Mini-Workshop: Lattice Polytopes: Methods, Advances, Applic..:
Hibi, Takayuki
;
Higashitani, Akihiro
;
Jochemko, Katharina
.
Oberwolfach Reports. 14 (2018) 3 - p. 2659-2701 , 2018
Link:
https://doi.org/10.4171/..
?
13
Ehrhart Theory of Spanning Lattice Polytopes:
Hofscheier, Johannes
;
Katthän, Lukas
;
Nill, Benjamin
International Mathematics Research Notices. 2018 (2017) 19 - p. 5947-5973 , 2017
Link:
https://doi.org/10.1093/..
?
14
MINIMALITY AND MUTATION-EQUIVALENCE OF POLYGONS:
KASPRZYK, ALEXANDER
;
NILL, BENJAMIN
;
PRINCE, THOMAS
Forum of Mathematics, Sigma. 5 (2017) - p. , 2017
Link:
https://doi.org/10.1017/..
?
15
The degree of point configurations: Ehrhart theory, Tverber..:
Nill, Benjamin
;
Padrol, Arnau
European Journal of Combinatorics. 50 (2015) - p. 159-179 , 2015
Link:
https://doi.org/10.1016/..
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