Abstract
AbstractWe discuss the computation of automorphism groups and normal forms of cones and polyhedra in Normaliz and indicate its implementation via nauty. The types of automorphisms include integral, rational, Euclidean and combinatorial, as well as algebraic for polytopes defined over real algebraic number fields. Examples treated in detail are the icosahedron and linear-ordering polytopes whose Euclidean automorphism groups are determined.
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Computational Mathematics,Mathematics (miscellaneous),Theoretical Computer Science
Reference12 articles.
1. Bremner, D., Sikirić, M.D., Pasechnik, D.V., Rehn, T., Schürmann, A.: Computing symmetry groups of polyhedra. LMS J. Comput. Math. 17, 565–581 (2014)
2. Bruns, W.: On the integral Carathéodory property. Exp. Math. 16, 359–365 (2007)
3. Bruns, W.: ToricExp: experiments in toric geometry. https://www.home.uni-osnabrueck.de/wbruns/ToricExp/index.html
4. Bruns, W., Garcí-a-Sánchez, P., O’Neill, C.: Wilf’s conjecture in fixed multiplicity. Int. J. Algebra Comput. 30, 861–882 (2020)
5. Bruns, W., Gubeladze, J.: Polytopes, Rings and K-theory. Springer, Berlin (2009)
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1. Polytope volume in Normaliz;São Paulo Journal of Mathematical Sciences;2022-07-25