Your search keyword '"05C25, 05C50, 05C75"' showing total 4 results

1. Expansion in Cayley graphs, Cayley sum graphs and their twists

Author

Biswas, Arindam and Saha, Jyoti Prakash

Subjects

Mathematics - Combinatorics, 05C25, 05C50, 05C75

Abstract

The Cayley graphs of finite groups are known to provide several examples of families of expanders, and some of them are Ramanujan graphs. Babai studied isospectral non-isomorphic Cayley graphs of the dihedral groups. Lubotzky, Samuels and Vishne proved that there are isospectral non-isomorphic Cayley graphs of $\mathrm{PSL}_d(\mathbb F_q)$ for every $d\geq 5$ ($d \neq 6$) and prime power $q> 2$. In this article, we focus on three variants of Cayley graphs, viz., the Cayley sum graphs, the twisted Cayley graphs, and the twisted Cayley sum graphs. We prove the existence of non-isomorphic expander families of bounded degree, whose spectra are related by the values of certain characters. We also provide several new examples of expander families, and examples of non-expanders and Ramanujan graphs formed by these three variants.

Published

2021

2. A Cheeger type inequality in finite Cayley sum graphs

Author

Biswas, Arindam and Saha, Jyoti Prakash

Subjects

Mathematics - Combinatorics, Mathematics - Group Theory, 05C25, 05C50, 05C75

Abstract

Let $G$ be a finite group and $S$ be a symmetric generating set of $G$ with $|S| = d$. We show that if the undirected Cayley sum graph $C_{\Sigma}(G,S)$ is an expander graph and is non-bipartite, then the spectrum of its normalised adjacency operator is bounded away from $-1$. We also establish an explicit lower bound for the spectrum of these graphs, namely, the non-trivial eigenvalues of the normalised adjacency operator lies in the interval $\left(-1+\frac{h(G)^{4}}{\eta}, 1-\frac{h(G)^{2}}{2d^{2}}\right]$, where $h(G)$ denotes the (vertex) Cheeger constant of the $d$-regular graph $C_{\Sigma}(G,S)$ and $\eta = 2^{9}d^{8}$. Further, we improve upon a recently obtained bound on the non-trivial spectrum of the normalised adjacency operator of the non-bipartite Cayley graph $C(G,S)$., Comment: Grant number added

Published

2019

3. Laplacian eigenvalues of the zero divisor graph of the ring $\mathbb{Z}_{n}$

Author

Chattopadhyay, Sriparna, Patra, Kamal Lochan, and Sahoo, Binod Kumar

Subjects

Mathematics - Spectral Theory, Mathematics - Combinatorics, 05C25, 05C50, 05C75

Abstract

We study the Laplacian eigenvalues of the zero divisor graph $\Gamma\left(\mathbb{Z}_{n}\right)$ of the ring $\mathbb{Z}_{n}$ and prove that $\Gamma\left(\mathbb{Z}_{p^t}\right)$ is Laplacian integral for every prime $p$ and positive integer $t\geq 2$. We also prove that the Laplacian spectral radius and the algebraic connectivity of $\Gamma\left(\mathbb{Z}_{n}\right)$ for most of the values of $n$ are, respectively, the largest and the second smallest eigenvalues of the vertex weighted Laplacian matrix of a graph which is defined on the set of proper divisors of $n$. The values of $n$ for which algebraic connectivity and vertex connectivity of $\Gamma\left(\mathbb{Z}_{n}\right)$ coincide are also characterized.

Published

2019

4. A Cheeger type inequality in finite Cayley sum graphs

Author

Arindam Biswas and Jyoti Prakash Saha

Subjects

Vertex (graph theory), Finite group, Cayley graph, 010102 general mathematics, Spectrum (functional analysis), 05C25, 05C50, 05C75, 0102 computer and information sciences, Group Theory (math.GR), 01 natural sciences, Cheeger constant (graph theory), Combinatorics, 010201 computation theory & mathematics, FOS: Mathematics, Mathematics - Combinatorics, Discrete Mathematics and Combinatorics, Interval (graph theory), Adjacency list, Expander graph, Combinatorics (math.CO), 0101 mathematics, Mathematics - Group Theory, Mathematics

Abstract

Let $G$ be a finite group and $S$ be a symmetric generating set of $G$ with $|S| = d$. We show that if the undirected Cayley sum graph $C_{\Sigma}(G,S)$ is an expander graph and is non-bipartite, then the spectrum of its normalised adjacency operator is bounded away from $-1$. We also establish an explicit lower bound for the spectrum of these graphs, namely, the non-trivial eigenvalues of the normalised adjacency operator lies in the interval $\left(-1+\frac{h(G)^{4}}{\eta}, 1-\frac{h(G)^{2}}{2d^{2}}\right]$, where $h(G)$ denotes the (vertex) Cheeger constant of the $d$-regular graph $C_{\Sigma}(G,S)$ and $\eta = 2^{9}d^{8}$. Further, we improve upon a recently obtained bound on the non-trivial spectrum of the normalised adjacency operator of the non-bipartite Cayley graph $C(G,S)$., Comment: Grant number added

Published

2019