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Symmetrical $2$-extensions of the $2$-dimensional grid. II
E. A. Konoval'chikab, K. V. Kostousova a Krasovskii Institute of Mathematics
and Mechanics, Ural Branch of the Russian Academy of Sciences, Yekaterinburg, 620990 Russia
b Nosov Magnitogorsk State Technical University, Magnitogorsk, 455000 Russia
Abstract:
The investigation of symmetrical $q$-extensions of a $d$-dimensional cubic grid $\Lambda^{d}$ is of interest both for group theory and for graph theory. For small $d\geq 1$ and $q>1$ (especially for $q=2$), symmetrical $q$-extensions of $\Lambda^{d}$ are of interest for molecular crystallography and some phisycal theories. Earlier V. Trofimov proved that there are only finitely many symmetrical $2$-extensions of $\Lambda^{d}$ for any positive integer $d$. This paper is the second and concluding part of our work devoted to the description of all, up to equivalence, realizations of symmetrical $2$-extensions of $\Lambda^{2}$ (we show that there are $162$ such realizations). In the first part of our work, which was published earlier, we found all, up to equivalence, realizations of symmetrical $2$-extensions of $\Lambda^{2}$ such that only the trivial automorphism fixes all blocks of the imprimitivity system ($87$ realizations). In the present paper, we find the remaining realizations of symmetrical $2$-extensions of $\Lambda^{2}$.
Keywords:
symmetrical extension of a graph, $d$-dimensional grid.
Received: 12.01.2017
Citation:
E. A. Konoval'chik, K. V. Kostousov, “Symmetrical $2$-extensions of the $2$-dimensional grid. II”, Trudy Inst. Mat. i Mekh. UrO RAN, 23, no. 4, 2017, 192–211
Linking options:
https://www.mathnet.ru/eng/timm1479 https://www.mathnet.ru/eng/timm/v23/i4/p192
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Abstract page: | 179 | Full-text PDF : | 45 | References: | 37 | First page: | 2 |
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