Semisymmetric Zp-covers of the C20 graph

A graph X is said to be G-semisymmetric if it is regular and there exists a subgroup G of A:=Aut(X) acting transitively on its edge set but not on its vertex set. In the case of G=A, we call X a semisymmetric graph. Finding elementary abelian covering projections can be grasped combinatorially via a linear representation of automorphisms acting on the first homology group of the graph. The method essentially reduces to finding invariant subspaces of matrix groups over prime fields. In this study, by applying concept linear algebra, we classify the connected semisymmetric zp-covers of the C20 graph.

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Monomial codes seen as invariant subspaces

Open Mathematics ◽

10.1515/math-2017-0093 ◽

2017 ◽

Vol 15 (1) ◽

pp. 1099-1107 ◽

Cited By ~ 1

Author(s):

María Isabel García-Planas ◽

Maria Dolors Magret ◽

Laurence Emilie Um

Keyword(s):

Finite Field ◽

Linear Algebra ◽

Linear Transformation ◽

Cyclic Codes ◽

Invariant Subspaces ◽

Hyperinvariant Subspaces ◽

Computationally Expensive ◽

The Relationship

Abstract It is well known that cyclic codes are very useful because of their applications, since they are not computationally expensive and encoding can be easily implemented. The relationship between cyclic codes and invariant subspaces is also well known. In this paper a generalization of this relationship is presented between monomial codes over a finite field 𝔽 and hyperinvariant subspaces of 𝔽n under an appropriate linear transformation. Using techniques of Linear Algebra it is possible to deduce certain properties for this particular type of codes, generalizing known results on cyclic codes.

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Invariant subspaces of matrix groups and elementary-abelian covers of K4,4

Filomat ◽

10.2298/fil1104037k ◽

2011 ◽

Vol 25 (4) ◽

pp. 37-53

Author(s):

Bostjan Kuzman

Keyword(s):

Bipartite Graph ◽

Complete Bipartite Graph ◽

Invariant Subspaces ◽

Matrix Groups ◽

Abelian Covers ◽

Groups Of Automorphisms ◽

Transitive Subgroup

We study lifting conditions for groups of automorphisms of the complete bipartite graph K4,4. In particular, for p?2 a prime we construct, up to isomorphism of projections, all minimal p-elementary abelian covers of K4,4 such that the respective covering projections admit a lift of some arc-transitive subgroup of Aut(K4,4).

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ANDERSÉN–LEMPERT-THEORY WITH PARAMETERS: A REPRESENTATION THEORETIC POINT OF VIEW

Journal of Algebra and Its Applications ◽

10.1142/s0219498805001216 ◽

2005 ◽

Vol 04 (03) ◽

pp. 325-340 ◽

Cited By ~ 4

Author(s):

FRANK KUTZSCHEBAUCH

Keyword(s):

Vector Space ◽

Vector Fields ◽

Invariant Subspaces ◽

Linear Representation ◽

Complex Variables ◽

Point Of View ◽

Several Complex Variables ◽

Algebraic Vector ◽

Theoretic Point ◽

Parametric Version

We calculate the invariant subspaces in the linear representation of the group of algebraic automorphisms of ℂnon the vector space of algebraic vector fields on ℂnand more generally we do this in a setting with parameter. As an application to the field of Several Complex Variables we get a new proof of the Andersén–Lempert observation and a parametric version of the Andersén–Lempert theorem. Further applications to the question of embeddings of ℂkinto ℂnare announced.

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Division And Combination In Linear Algebra

JOURNAL OF ADVANCES IN MATHEMATICS ◽

10.24297/jam.v17i0.8413 ◽

2019 ◽

Vol 17 ◽

pp. 39-146

Author(s):

Liang Fang ◽

Rui Chena

Keyword(s):

Linear Algebra ◽

Linear Correlation ◽

Linear Equations ◽

Linear Representation ◽

Deep Levels ◽

High Dimensions ◽

Matrix Operation ◽

The Relationship

In this paper, the relationship between matrix operation, linear equations, linear representation of vector groups and linear correlation is discussed, and the idea of division and combination in linear algebra is discussed to help learners understand the connections between various knowledge points of linear algebra from multiple angles, deep levels, and high dimensions.

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