Table 1. Open in new tab Topological...

Table 1.

Topological features

Symbol	Description
θ_u	Degree centrality of node u. The in, out and total degree centralities are denoted as $θ_{in (u)}, θ_{out (u)}$ and $θ_{t o t a l (u)}$ ⁠, respectively
α_u	Eigenvector centrality of node u
β_u	Closeness centrality of node u
γ_u	Eccentricity centrality of node u
δ_u	Betweenness centrality of node u
π_u	Bridging coefficient of node u
ζ_u	Bridging centrality of node u
κ_u	Clustering coefficient of node u. The undirected, in, out, cycle and middleman clustering coefficients are denoted as $κ_{u n d i r (u)}, κ_{i n (u)}, κ_{o u t (u)}, κ_{c y c (u)}$ and $κ_{m i d (u)}$ ⁠, respectively
μ_u	Proximity prestige of node u
ω_u	Target downstream effect of node u

Symbol	Description
θ_u	Degree centrality of node u. The in, out and total degree centralities are denoted as $θ_{in (u)}, θ_{out (u)}$ and $θ_{t o t a l (u)}$ ⁠, respectively
α_u	Eigenvector centrality of node u
β_u	Closeness centrality of node u
γ_u	Eccentricity centrality of node u
δ_u	Betweenness centrality of node u
π_u	Bridging coefficient of node u
ζ_u	Bridging centrality of node u
κ_u	Clustering coefficient of node u. The undirected, in, out, cycle and middleman clustering coefficients are denoted as $κ_{u n d i r (u)}, κ_{i n (u)}, κ_{o u t (u)}, κ_{c y c (u)}$ and $κ_{m i d (u)}$ ⁠, respectively
μ_u	Proximity prestige of node u
ω_u	Target downstream effect of node u