New graph invariants based on $p$-Laplacian eigenvalues
Abstract
We present monotonicity inequalities for certain functions involving eigenvalues of -Laplacians on signed graphs with respect to . Inspired by such monotonicity, we propose new spectrum-based graph invariants, called (variational) cut-off adjacency eigenvalues, that are relevant to certain eigenvector-dependent nonlinear eigenvalue problem. Using these invariants, we obtain new lower bounds for the -Laplacian variational eigenvalues, essentially giving the state-of-the-art spectral asymptotics for these eigenvalues. Moreover, based on such invariants, we establish two inertia bounds regarding the cardinalities of a maximum independent set and a minimum edge cover, respectively. The first inertia bound enhances the classical Cvetkovi\'c bound, and the second one implies that the -th -Laplacian variational eigenvalue is of the order as tends to infinity whenever is larger than the cardinality of a minimum edge cover of the underlying graph. We further discover an interesting connection between graph -Laplacian eigenvalues and tensor eigenvalues and discuss applications of our invariants to spectral problems of tensors.
Cite
@article{arxiv.2310.08189,
title = {New graph invariants based on $p$-Laplacian eigenvalues},
author = {Chuanyuan Ge and Shiping Liu and Dong Zhang},
journal= {arXiv preprint arXiv:2310.08189},
year = {2023}
}
Comments
30 pages