Oriented hypergraphic matrix-tree type theorems and bidirected minors via Boolean order ideals

Rusnak, Lucas J.; Robinson, Ellen Beth; Schmidt, Martin; Shroff, Piyush

doi:10.1007/s10801-018-0831-5

Cited by 13 publications

(24 citation statements)

References 22 publications

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“…The upper limit on the number of spanning trees is computed by Cayley's theorem: the complete graph with v vertices has v v−2 spanning trees, and a complete bipartite graph with v, q vertices has v q−1 • q v−1 spanning trees (Buekenhout and Parker 1998;Rusnak et al 2018). For a small social network such as the Highland Tribes (Read 1954) in Fig.…”

Section: Graphb: Spanning Tree-sampling Balancing Algorithmmentioning

confidence: 99%

Characterizing attitudinal network graphs through frustration cloud

Rusnak

Tešić

2021

Data Min Knowl Disc

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Attitudinal network graphs are signed graphs where edges capture an expressed opinion; two vertices connected by an edge can be agreeable (positive) or antagonistic (negative). A signed graph is called balanced if each of its cycles includes an even number of negative edges. Balance is often characterized by the frustration index or by finding a single convergent balanced state of network consensus. In this paper, we propose to expand the measures of consensus from a single balanced state associated with the frustration index to the set of nearest balanced states. We introduce the frustration cloud as a set of all nearest balanced states and use a graph-balancing algorithm to find all nearest balanced states in a deterministic way. Computational concerns are addressed by measuring consensus probabilistically, and we introduce new vertex and edge metrics to quantify status, agreement, and influence. We also introduce a new global measure of controversy for a given signed graph and show that vertex status is a zero-sum game in the signed network. We propose an efficient scalable algorithm for calculating frustration cloud-based measures in social network and survey data of up to 80,000 vertices and half-a-million edges. We also demonstrate the power of the proposed approach to provide discriminant features for community discovery when compared to spectral clustering and to automatically identify dominant vertices and anomalous decisions in the network.

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Section: Graphb: Spanning Tree-sampling Balancing Algorithmmentioning

confidence: 99%

Characterizing attitudinal network graphs through frustration cloud

Rusnak

Tešić

2021

Data Min Knowl Disc

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“…Due to the nature of the incidence-maps it is possible for a path to fold back on itself creating a backstep of the form v, i, e, i, v -these are the entries in the hypergraphic degree matrix. A contributor can be regarded as a permutation clone that is a generalized cycle covers similar to Sachs' Theorem to determine characteristic polynomial coefficients [8,1,7]; contributors naturally form Boolean lattices when G is a bidirected graph [14]. The set of contributors of an oriented hypergraph is denoted C(G).…”

Section: Incidence Orientations and Signed Graphsmentioning

confidence: 99%

“…Two examples appear in Figure 6. The concept of tail-equivalence is a generalization of circle activation classes of bidirected graphs in [14],…”

Section: Tail Equivalencementioning

confidence: 99%

“…Let A(G) denote a tail-equivalence class of G. As with restricted and reduced contributors we let A(u; w; G) be the elements of tail-equivalency class A(G) where u i ↦ w i , and Â(u; w; G) be the elements of A(u; w; G) with u i ↦ w i removed for each i. From [14], the activation classes and their restricted subclasses (order ideals) of a bidirected graph are Boolean. It was also shown in [10] that the reduced contributors in single element activation classes Â≠0 (u; w; L 0 (G)) are unpacking equivalent to k-arborescences.…”

Section: Tail Equivalencementioning

confidence: 99%

“…This is accomplished by using the incidence-theoretic approach introduced in [13] to study hypergraphic Laplacians, and the incidence-path mapping families, called contributors, from [7] that generalize cycle covers to classify various hypergraphic characteristic polynomials similar to Sachs' Theorem [1,8]. It was shown in [14] that if all edges are size 2 these generalized cycle covers form Boolean lattices that generalize the Matrix-tree theorem. These Boolean families are naturally cancellative when G is a graph with the trivial single-element classes corresponding to spanning trees -providing "conservation" for the graphic Kirchhoff Laws.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Generalizing Kirchhoff laws for Signed Graphs

Rusnak,

Reynes,

Johnson

et al. 2020

Preprint

Self Cite

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Kirchhoff-type Laws for signed graphs are characterized by generalizing transpedances through the incidence-oriented structure of bidirected graphs. The classical 2-arborescence interpretation of Tutte is shown to be equivalent to single-element Boolean classes of reduced incidence-based cycle covers, called contributors. A generalized contributor-transpedance is introduced using entire Boolean classes that naturally cancel in a graph; classical conservation is proven to be property of the trivial Boolean classes. The contributor-transpedances on signed graphs are shown to produce non-conservative Kirchhoff-type Laws, where every contributor possesses the unique source-sink path property. Finally, the maximum value of a contributor-transpedance is calculated through the signless Laplacian.

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Graphs, Simplicial Complexes and Hypergraphs: Spectral Theory and Topology

Mulas

Horak²,

Jost

2022

Understanding Complex Systems

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Oriented hypergraphic matrix-tree type theorems and bidirected minors via Boolean order ideals

Cited by 13 publications

References 22 publications

Characterizing attitudinal network graphs through frustration cloud

Characterizing attitudinal network graphs through frustration cloud

Generalizing Kirchhoff laws for Signed Graphs

Graphs, Simplicial Complexes and Hypergraphs: Spectral Theory and Topology

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