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On Generalized Strongly Regular Graphs
Graphs and Combinatorics, 2018zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Jia, Dongdong +2 more
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2022
Strongly regular graphs lie at the intersection of statistical design, group theory, finite geometry, information and coding theory, and extremal combinatorics. This monograph collects all the major known results together for the first time in book form, creating an invaluable text that researchers in algebraic combinatorics and related areas will ...
Andries E. Brouwer, H. Van Maldeghem
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Strongly regular graphs lie at the intersection of statistical design, group theory, finite geometry, information and coding theory, and extremal combinatorics. This monograph collects all the major known results together for the first time in book form, creating an invaluable text that researchers in algebraic combinatorics and related areas will ...
Andries E. Brouwer, H. Van Maldeghem
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2011
A graph (simple, undirected, and loopless) of order v is called strongly regular with parameters v, k,λ,μ whenever it is not complete or edgeless.
Andries E. Brouwer, Willem H. Haemers
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A graph (simple, undirected, and loopless) of order v is called strongly regular with parameters v, k,λ,μ whenever it is not complete or edgeless.
Andries E. Brouwer, Willem H. Haemers
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2001
In this chapter we return to the theme of combinatorial regularity with the study of strongly regular graphs. In addition to being regular, a strongly regular graph has the property that the number of common neighbours of two distinct vertices depends only on whether they are adjacent or nonadjacent.
Chris Godsil, Gordon Royle
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In this chapter we return to the theme of combinatorial regularity with the study of strongly regular graphs. In addition to being regular, a strongly regular graph has the property that the number of common neighbours of two distinct vertices depends only on whether they are adjacent or nonadjacent.
Chris Godsil, Gordon Royle
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Regular two-graphs from strongly regular graphs
2022In this talk we will give a classification of strongly regular graphs with parameters (41, 20, 9, 10) that have a nontrivial automorphism. We will talk about the construction of regular two-graphs with 42 vertices from these strongly regular graphs and about the construction of regular two-graphs with 38 vertices.
Maksimović, Marija, Rukavina, Sanja
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A Generalization of Strongly Regular Graphs
Southeast Asian Bulletin of Mathematics, 2003zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Deza, Michel, Huang, Tayuan
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On strongly regular self ‐ complementary graphs
Journal of Graph Theory, 1981AbstractIt is shown that certain conditions assumed on a regular self‐complementary graph are not sufficient for the graph to be strongly regular, answering in the negative a question posed by Kotzig in [1].
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Regular and Strongly Regular Selfcomplementary Graphs
1982The graphs given in the title are studied using boolean techniques. First we investigate the change of certain simple graphical parameters (like the number of triangles through a vertex) of a regular self-complementary graphs under a complementing permutation.
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