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Fig. 8 | Applied Network Science

Fig. 8

From: Establish the expected number of induced motifs on unlabeled graphs through analytical models

Fig. 8

Super-motifs resulting from the overlap between all NRPs of the induced 3-nodes path with s=2 nodes. Results are shown in a matrix fashion, where the entry at row i and column j is the super-motif originating from the NRP at the i-th row and the NRP at the j-th columnn. Nodes of each super-motif contain node ids of the starting NRPs. Nodes in the overlapping region are colored in red. Red dashed lines represent edges between overlapping nodes coming from only one of the two NRPs. All super-motifs containing red dashed edges are barred, meaning that they are not returned by the overlapping operator \(\cap _{s}^{I}\)

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