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On quadratic embedding constants of star product graphs

Wojciech Młotkowski, Nobuaki Obata

2020Hokkaido Mathematical Journal14 citationsDOI

Abstract

A connected graph $G$ is of QE class if it admits a quadratic embedding in a Hilbert space, or equivalently if the distance matrix is conditionally negative definite, or equivalently if the quadratic embedding constant $\mathrm{QEC}(G)$ is non-positive. For a finite star product of (finite or infinite) graphs $G=G_1\star\cdots \star G_r$ an estimate of $\mathrm{QEC}(G)$ is obtained after a detailed analysis of the minimal solution of a certain algebraic equation. For the path graph $P_n$ an implicit formula for $\mathrm{QEC}(P_n)$ is derived, and by limit argument $\mathrm{QEC}(\mathbb{Z})=\mathrm{QEC}(\mathbb{Z}_+)=-1/2$ is shown. During the discussion a new integer sequence is found.

Topics & Concepts

MathematicsEmbeddingStar (game theory)CombinatoricsProduct (mathematics)Algebraic numberInteger (computer science)GraphDiscrete mathematicsMathematical analysisComputer scienceArtificial intelligenceGeometryProgramming languageMatrix Theory and AlgorithmsGraph theory and applicationsSpectral Theory in Mathematical Physics
On quadratic embedding constants of star product graphs | Litcius