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Table 6 Fifty highly ranked divisions out of the 201 detected divisions in 100 computer runs of the Les Misérables network in the influence spreading model with uniformly distributed \(U(0.05, 0.1)\) random link weights

From: Modelling community structure and temporal spreading on complex networks

id # Nodes # Nodes
1 7 17–23 70 1–16,24–77
2 15 1–2,5–10,17–23 62 3–4,11–16,24–77
3 8 1–2,5–10 69 3–4,11–77
4 25 1–2,5–10,47–49,58–68,74–75,77 52 3–4,11–46,50–57,69–73,76
5 12 58–68,77 65 1–57,69–76
6 26 17–23,47–49,56–68,74–75,77 51 1–16,24–46,50–55,69–73,76
7 35 1–10,30,35–39,47–49,56–68,74–75,77 42 11–29,31–34,40–46,50–55,69–73,76
8 17 47–49,58–68,74–75,77 60 1–46,50–57,69–73,76
9 32 17–23,40,47–50,52–68,74–75,77 45 1–16,24–39,41–46,51,69–73,76
10 29 13,17–29,31–32,34,41–44,46,51,69–73,76 48 1–12,14–16,30,33,35–40,45,47–50,52–68,74–75,77
11 31 30,35–40,47–50,52–68,74–75,77 46 1–29,31–34,41–46,51,69–73,76
12 27 1–2,5–10,17–23,58–68,77 50 3–4,11–16,24–57,69–76
13 35 11–16,24–39,41–46,51,69–73,76 42 1–10,17–23,40,47–50,52–68,74–75,77
14 19 17–23,58–68,77 58 1–16,24–57,69–76
15 20 1–2,5–10,58–68,77 57 3–4,11–57,69–76
16 37 3–4,11–16,24–39,41–46,51,69–73,76 40 1–2,5–10,17–23,40,47–50,52–68,74–75,77
17 36 3–4,11–12,14–16,29–30,33,35–39,45–49,56–68,74–75,77 41 1–2,5–10,13,17–28,31–32,34,40–44,50–55,69–73,76
18 22 35–39,47–49,58–68,74–75,77 55 1–34,40–46,50–57,69–73,76
19 37 1–10,13,17–28,31–32,34,41–44,51,69–73,76 40 11–12,14–16,29–30,33,35–40,45–50,52–68,74–75,77
20 30 1–2,5–10,35–39,47–49,58–68,74–75,77 47 3–4,11–34,40–46,50–57,69–73,76
21 36 11–29,31–34,41–46,51,69–73,76 41 1–10,30,35–40,47–50,52–68,74–75,77
22 25 17–23,47–49,56,58–68,74–75,77 52 1–16,24–46,50–55,57,69–73,76
23 33 1–2,5–10,17–23,47–49,56,58–68,74–75,77 44 3–4,11–16,24–46,50–55,57,69–73,76
24 35 3–4,11–16,25–29,32–34,40–46,50–55,69–73,76 42 1–2,5–10,17–24,30–31,35–39,47–49,56–68,74–75,77
25 32 13,17–28,31–32,40–44,50–55,69–73,76 45 1–12,14–16,29–30,33–39,45–49,56–68,74–75,77
26 25 17–26,30–31,35–39,41–43,69–72,76 52 1–16,27–29,32–34,40,44–68,73–75,77
27 33 25–26,28,40–43,47–49,51,53,56–72,74–77 44 1–24,27,29–39,44–46,50,52,54–55,73
28 33 1–10,35–39,47–49,56,58–68,74–75,77 44 11–34,40–46,50–55,57,69–73,76
29 37 1–16,25–29,32–34,41–46,51,69–73,76 40 17–24,30–31,35–40,47–50,52–68,74–75,77
30 30 35–40,47–50,52–68,74–75,77 47 1–34,41–46,51,69–73,76
31 33 11–16,25–29,32–34,40–46,50–55,69–73,76 44 1–10,17–24,30–31,35–39,47–49,56–68,74–75,77
32 33 17–24,30,35–39,47–49,56–68,74–75,77 44 1–16,25–29,31–34,40–46,50–55,69–73,76
33 38 11–12,14–16,30,33,35–40,45,47–50,52–68,74–75,77 39 1–10,13,17–29,31–32,34,41–44,46,51,69–73,76
34 35 1–10,42,47–49,56–72,74–77 42 11–41,43–46,50–55,73
35 37 3–4,11–12,14–16,29–30,33–39,45–49,56–68,74–75,77 40 1–2,5–10,13,17–28,31–32,40–44,50–55,69–73,76
36 33 1–2,5–10,42,47–49,56–72,74–77 44 3–4,11–41,43–46,50–55,73
37 27 13,17–26,30–32,35–39,41–43,69–72,76 50 1–12,14–16,27–29,33–34,40,44–68,73–75,77
38 33 1–2,5–10,17–26,30–31,35–39,41–43,69–72,76 44 3–4,11–16,27–29,32–34,40,44–68,73–75,77
39 36 1–10,17–23,47–49,56–68,74–75,77 41 11–16,24–46,50–55,69–73,76
40 14 1–2,5–10,18–23 63 3–4,11–17,24–77
41 6 18–23 71 1–17,24–77
42 25 42,47–49,56–72,74–77 52 1–41,43–46,50–55,73
43 37 11–34,41–46,51,69–73,76 40 1–10,35–40,47–50,52–68,74–75,77
44 36 3–4,11–24,27,29–39,44–46,50,52,54–55,73 41 1–2,5–10,25–26,28,40–43,47–49,51,53,56–72,74–77
45 38 17–23,30,35–40,47–50,52–68,74–75,77 39 1–16,24–29,31–34,41–46,51,69–73,76
46 36 11–16,24–29,31–34,40–46,50–55,57,69–73,76 41 1–10,17–23,30,35–39,47–49,56,58–68,74–75,77
47 28 13,17–26,28,30–32,35–39,41–43,69–72,76 49 1–12,14–16,27,29,33–34,40,44–68,73–75,77
48 28 11–16,25–29,31–34,41–46,51,69–73,76 49 1–10,17–24,30,35–40,47–50,52–68,74–75,77
49 28 3–4,11–12,14–16,25–29,32–34,41–46,51,69–73,76 49 1–2,5–10,13,17–24,30–31,35–40,47–50,52–68,74–75,77
50 30 25–26,40–43,47–49,56–72,74–77 47 1–24,27–39,44–46,50–55,73