normalized laplacian spectrum of two new types of join graphs

Authors

m ghorbani

department of mathematics, faculty of science, shahid rajaee teacher training university m hakimi-nezhaad

department of math., faculty of science, shahid rajaee teacher training university

abstract

‎let $g$ be a graph without an isolated vertex‎, ‎the normalized laplacian matrix $tilde{mathcal{l}}(g)$‎‎is defined as $tilde{mathcal{l}}(g)=mathcal{d}^{-frac{1}{2}}mathcal{l}(g) mathcal{d}^{-frac{1}{2}}$‎, where ‎$‎mathcal{‎d}‎$ ‎is a‎ diagonal matrix whose entries are degree of ‎vertices ‎‎of ‎$‎g‎$‎‎. ‎the eigenvalues of‎‎$tilde{mathcal{l}}(g)$ are ‎called ‎ ‎ as ‎the ‎normalized laplacian eigenvalues of $g$‎. ‎in this paper‎, ‎we obtain the normalized laplacian spectrum of two new types of join graphs‎. ‎in continuing‎, ‎we determine the integrality of normalized laplacian eigenvalues of graphs‎. ‎finally‎, ‎the normalized laplacian energy and degree kirchhoff index of these new graph ‎products‎ are derived‎.

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Journal title:
journal of linear and topological algebra (jlta)

جلد ۶، شماره ۰۱، صفحات ۱-۹

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