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Figure S2: Plot of DIC Against the Number of K Clusters, and Tess Plots for K = 2 to K = 6
doi 10.7717/peerj.5660/supp-2
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Figure S1: Structure Plots for K = 1 to K = 6
Dalitz Plot Analysis of the Decay B+ -> K+k+k-
Dalitz Plot Analysis of the Decay B+ -> K+k+k-
Figure S4: Inferring Optimal Number of Genetic Clusters From STRUCTURE Analysis Based on Distribution of Pr(K) at K Ranging From 1 to 6
Figure 4: Bayesian Individual Assignment Implemented Using STRUCTURE for K = 2 Clusters (A), K = 3 Clusters (B) and K = 5 Clusters (C) Without Using Geographical Area as a Prior.
Figure 6: Bayesian Clustering as Determined by STRUCTURE Analysis of Nuclear Microsatellite Data at K = 2 − 5. (A) Structure With K = 2; (B) Structure With K = 3; (C) Structure With K = 4; (D) Structure With K = 5.
Interior Melting of the C3B16 and C2B14− Clusters Between 1000 K and 2000 K
Condensed Matter
Figure 6: (A) Behavior of Accuracy in Terms of Number of Clusters and (B) Confusion Matrix With Best Results (Clusters = 11) Using K-Means Algorithm.
The Slater and Sub-K-Domination Number of a Graph With Applications to Domination and K-Domination
Discussiones Mathematicae - Graph Theory
Combinatorics
Applied Mathematics
Discrete Mathematics
