Litcius/Paper detail

Hearing Euler characteristic of graphs

Michał Ławniczak, Pavel Kurasov, Szymon Bauch, Małgorzata Białous, Vitalii Yunko, Leszek Sirko

2020Physical review. E28 citationsDOIOpen Access PDF

Abstract

The Euler characteristic χ=|V|-|E| and the total length L are the most important topological and geometrical characteristics of a metric graph. Here |V| and |E| denote the number of vertices and edges of a graph. The Euler characteristic determines the number β of independent cycles in a graph while the total length determines the asymptotic behavior of the energy eigenvalues via Weyl's law. We show theoretically and confirm experimentally that the Euler characteristic can be determined (heard) from a finite sequence of the lowest eigenenergies λ_{1},...,λ_{N} of a simple quantum graph, without any need to inspect the system visually. In the experiment quantum graphs are simulated by microwave networks. We demonstrate that the sequence of the lowest resonances of microwave networks with β≤3 can be directly used in determining whether a network is planar, i.e., can be embedded in the plane. Moreover, we show that the measured Euler characteristic χ can be used as a sensitive revealer of the fully connected graphs.

Topics & Concepts

Quantum graphEuler characteristicEuler's formulaMathematicsCombinatoricsEigenvalues and eigenvectorsLambdaPlanar graphGraphPhysicsDiscrete mathematicsTopology (electrical circuits)Mathematical analysisQuantum mechanicsQuantum chaos and dynamical systemsQuantum optics and atomic interactionsGraph theory and applications