2020
DOI: 10.48550/arxiv.2007.15981
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Compression and Symmetry of Small-World Graphs and Structures

Abstract: For various purposes and, in particular, in the context of data compression, a graph can be examined at three levels. Its structure can be described as the unlabeled version of the graph; then the labeling of its structure can be added; and finally, given then structure and labeling, the contents of the labels can be described. Determining the amount of information present at each level and quantifying the degree of dependence between them, requires the study of symmetry, graph automorphism, entropy, and graph… Show more

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Cited by 2 publications
(3 citation statements)
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References 29 publications
(52 reference statements)
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“…These observations are directly related to the common confusion between unlabeled graph models and delabeled graph models [39,40]. A delabeled graph model starts with a labeled graph model, generates a labeled graph, and then simply removes the node labels in it.…”
Section: Labeled Vs Unlabeled Networkmentioning
confidence: 99%
See 1 more Smart Citation
“…These observations are directly related to the common confusion between unlabeled graph models and delabeled graph models [39,40]. A delabeled graph model starts with a labeled graph model, generates a labeled graph, and then simply removes the node labels in it.…”
Section: Labeled Vs Unlabeled Networkmentioning
confidence: 99%
“…We first recall a very simple and general relation between the labeled and delabeled entropies [39,40]. We call the latter the unlabeled entropy below, since unlabeled RGGs are identical to delabeled RGGs.…”
mentioning
confidence: 99%
“…We directly discard such nuisances from the data to improve compression. Others have used symmetries in X for lossless compression of multisets [21], graphs [56][57][58], or structured images [59][60][61][62][63]. We, instead, use invariance of the tasks Y for lossless prediction.…”
Section: Related Workmentioning
confidence: 99%