Combinatorial Problems on Algebraic Configured Graphs

Rilwan, N. Mohamed and Radha, R. (2022) Combinatorial Problems on Algebraic Configured Graphs. In: Novel Research Aspects in Mathematical and Computer Science Vol. 6. B P International, pp. 102-115. ISBN 978-93-5547-602-9

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Abstract

Zero divisor graph and unitary addition Cayley graph are the targeted algebraic networks. Our first objective is to allocate the frequencies to their every channel (nodes) at the same time reduce the consumption of their spectral domain, in this case upper frequency bound is denoted by . Next, decycle the aimed networks in order to reconstruct as trees or forest which has the less proximity than others. Let ( UA(Rn)) denotes the decycling number of UA(Rn) which is the cardinality of the smallest decycling set of the unitary addition Cayley graph UA(Rn) and A( UA(Rn); x) denotes the acyclic polynomial of UA(Rn). In this chapter, we obtained the frequency bound by the distance labeling constraint which is defined based on the diameter of a graph. Here, 2;1( Rp ) and 3;2;1( Rp ) denotes the least upper frequency bounds of zero divisor graphs. Also we obtained the acyclic number bounds and we derived the acyclic polynomial with their roots.

Item Type: Book Section
Subjects: Asian STM > Mathematical Science
Depositing User: Managing Editor
Date Deposited: 07 Oct 2023 09:42
Last Modified: 07 Oct 2023 09:42
URI: http://journal.send2sub.com/id/eprint/2211

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