Results 171 to 180 of about 14,423,502 (287)
Journal of Algebra, 1989 Given a graph \(\Gamma=(V,E)\), the graph group \(F\langle\Gamma\rangle\) is the group with presentation \(\langle V\mid [E]\rangle\), where \([E]\) denotes the set of commutators \(\{[a,b]\mid\{a,b\}\in E\}\). The graph group \(F\langle\Gamma\rangle\) is modeled to be a group analog of the graph algebra K(\(\Gamma)\) generated as a free associative ...
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Some infinite classes of asymmetric nearly Hamiltonian snarks
Le Matematiche, 2010 We determine the full automorphism group of each member of three infinite families of connected cubic graphs which are snarks. A graph is said to be nearly hamiltonian if it has a cycle which contains all vertices but one.
Carla Fiori, Beatrice Ruini
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Automorphism group of plane curve computed by Galois points, II [PDF]
, 2018 Recently, the first author [3] classified finite groups obtained as automorphism groups of smooth plane curves of degree d ≥ 4 into five types. He gave an upper bound of the order of the automorphism group for each types. For one of them, the type (a-ii),
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On the symmetry of odd Leech lattice CFT
Journal of High Energy PhysicsWe show that the Mathieu groups M 24 and M 23 in the isometry group of the odd Leech lattice do not lift to subgroups of the automorphism group of its lattice vertex operator (super)algebra.
Masaki Okada
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The automorphism group of M_0n
, 2010 It is proven that the automorphism group of moduli space of n pointed rational curves is the simmetric group on n elements as sson as n is at least
MELLA, Massimiliano
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Automorphism group of the balanced hypercube
Ars Math. Contemp., 2016 Jin-Xin Zhou +3 more
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Characterizing domains by their automorphism group
, 2016 It is generally believed that (up to biholomorphism) very few domains have a large automorphism group and a nice boundary. For instance the Wong-Rosay Ball theorem says that a strongly pseudoconvex domain with non-compact automorphism group must be bi ...
Zimmer, Andrew
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