L.S.Shi.The spectral radius of irregular graphs.Linear Algebra and its Ap-plications. 2009L. Shi, The spectral radius of irregular graphs, Linear Algebra Appl. 431 (1-2) (2009) 189-196.L.Shi.The spectral radius of irregular graphs. Linear Algebra and itsApplications ....
Signless Laplacian spectral radiusUpper boundIn this paper, we consider simple connected weighted graphs in which the edge weights are positive numbers. We obtain several upper bounds on the spectral radius and the signless Laplacian spectral radius of irregular weighted graphs, which extend some ...
Abstract Graph eigenvalues play a fundamental role in controlling structural properties which are critical considerations in the design of supercomputing interconnection networks, such as bisection bandwidth, diameter, and fault tolerance. This motivates considering graphs with optimal spectral expansion, called...
In “The ground displacementandseismic datasets collected in CFc” section, we present our two input datasets, e.g. the GPS and seismic catalogs, and introduce relevant scientific background. In “Data analysis of GPSandseismic catalogs” section, we measure and discuss the seismicity and uplift ...
The miniaturization of electronic devices and the consequent decrease in the distance between conductive lines have increased the risk of short circuit failure due to electrochemical migration (ECM). The presence of ionic contaminants affects the ECM pro
Deep learning approaches have been extended to irregular graphs [9, 20] and allowed for learning parametric models of 3D meshes. [11] utilises an autoencoder with spectral graph convolutional operations to develop the first deep 3DMM of 3D faces. More recent approaches move away from isotropic ...
Video S1. BM Hole Opening Is Delayed and Irregular in MMP− (Quintuple Mutant) Animals, Related to Figure 2B Video S2. Invadopodia Form Normally in the Absence of MMPs, Related to Figure 3A Video S3. MMP-Invasion, Related to Figures 3B–3D Video S4. BM Breaching in the Absence of MMP...
The laboratory thermal invariably maintains a sharp and well-defined, though irregular, front and side boundary, and one somewhat less well defined to the rear. The density within this boundary exhibits relatively small variations, certainly within the same order of magnitude aa the mean. Actually ...
The Gromov–Wasserstein distance—a generalization of the usual Wasserstein distance—permits comparing probability measures defined on poss
for the analysis of non-uniform schemes. guglielmi et al. [ 20 ] analyzed a 2-point hermite refinement scheme in 2011. they have used the joint spectral radius of the matrices. nowadays, the laurent polynomial technique is commonly used, but this technique has some limitations. in this ...