Figure 10
From: Inverse Resolution Limit of Partition Density and Detecting Overlapping Communities by Link-Surprise
The inverse resolution limit of Link-Surprise. The change of Link-Surprise due to the separation of a triangle is calculated when (A) 2 or (B) 3 nodes are shared between the triangle and its neighboring link community (see Fig. 2). Blue and red dots correspond to the conditions where the separation of a triangle is favorable and unfavorable, respectively. Magenta and green lines correspond to the conditions where the separation of a triangle is unfavorable and favorable with partition density. The conditions located between the magenta and green lines conditionally favors the separation of a triangle and those located below the green line always favors the separation of a triangle.
