Path intersection matrices and applications to networks

Path intersection matrices and applications to networks

For a network G, we introduce a non-singular symmetric matrix, called a path intersection matrix, that will provide a new method for computing the ratio k(G)/k(G/ab) where k(G) is the tree-number of G and G/ab is obtained from G∪ab by contracting the new edge ab between two distinct nodes a and b. T...

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Veröffentlicht in:Linear algebra and its applications 2017-07, Vol.524, p.278-292
Hauptverfasser: Kho, Dong Yeong, Kook, Woong, Lee, JaeHoon, Lee, Jinhyeong, Lee, Kang-Ju
Format: Artikel
Sprache:eng
Schlagworte:
Effective resistance
Finite element analysis
Information centrality
Information management
Laplace transforms
Linear algebra
Mathematical analysis
Matrix
Matrix methods
Networks
Path intersection matrices
Ratio analysis
Resistance
Spanning trees
Symmetry
The matrix-tree theorem
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Zusammenfassung:For a network G, we introduce a non-singular symmetric matrix, called a path intersection matrix, that will provide a new method for computing the ratio k(G)/k(G/ab) where k(G) is the tree-number of G and G/ab is obtained from G∪ab by contracting the new edge ab between two distinct nodes a and b. The quantities k(G)/k(G/ab) appear as invariants for various networks such as effective conductance for an electrical network and an ingredient for information centrality for a social network. We will review several examples of networks where path intersection matrices can be applied.
ISSN:0024-3795
1873-1856
DOI:10.1016/j.laa.2017.03.001