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On Spectral Properties of Signed Laplacians with Connections to Eventual Positivity

Signed graphs have appeared in a broad variety of applications, ranging from social networks to biological networks, from distributed control and computation to power systems. In this paper, we investigate spectral properties of signed Laplacians for undirected signed graphs. We find conditions on the negative weights under which a signed Laplacian is positive semidefinite via the Kron reduction and multiport network theory. For signed Laplacians that are indefinite, we characterize their inertias with the same framework. Furthermore, we build connections between signed Laplacians, generalized M-matrices, and eventually exponentially positive matrices.

preprint2020arXivOpen access
Wei ChenDan WangJi LiuYongxin ChenSei Zhen KhongTamer BaşarKarl H. JohanssonLi Qiu
Systems and Controleess.SY
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Wei ChenDan WangJi LiuYongxin ChenSei Zhen KhongTamer BaşarKarl H. JohanssonLi Qiu

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