The maximum number of vertices of primitive regular graphs of orders 2, 3, 4 with exponent 2
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Published:2021
Issue:52
Volume:
Page:97-104
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ISSN:2071-0410
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Container-title:Prikladnaya Diskretnaya Matematika
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language:
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Short-container-title:Applied Discrete Mathematics
Author:
Abrosimov M. B., ,Kostin S. V.,Los I. V., ,
Abstract
In 2015, the results were obtained for the maximum number of vertices nk in regular graphs of a given order k with a diameter 2: n2 = 5, n3 = 10, n4 = 15. In this paper, we investigate a similar question about the largest number of vertices npk in a primitive regular graph of order k with exponent 2. All primitive regular graphs with exponent 2, except for the complete one, also have diameter d = 2. The following values were obtained for primitive regular graphs with exponent 2: np2 = 3, np3 = 4, np4 = 11.
Publisher
Tomsk State University
Subject
Applied Mathematics,Computational Theory and Mathematics,Discrete Mathematics and Combinatorics,Signal Processing,Theoretical Computer Science