Generalized Dominance Relations

Description

generalized dominance relations that can be computed on one and two mode networks.

Usage

positional_dominance(A, type = "one-mode", map = FALSE, benefit = TRUE)

Arguments

Details

Positional dominance is a generalization of neighborhood-inclusion for arbitrary network data. In the default case, it checks for all pairs u,v if A_{ut} \ge A_{vt} holds for all t if benefit = TRUE or A_{ut} \le A_{vt} holds for all t if benefit = FALSE. This form of dominance is referred to as dominance under total heterogeneity. If map=TRUE, the rows of A are sorted decreasingly (benefit = TRUE) or increasingly (benefit = FALSE) and then the dominance condition is checked. This second form of dominance is referred to as dominance under total homogeneity, while the first is called dominance under total heterogeneity.

Value

Dominance relations as matrix object. An entry ⁠[u,v]⁠ is 1 if u is dominated by v.

Author(s)

David Schoch

References

Brandes, U., 2016. Network positions. Methodological Innovations 9, 2059799116630650.

Schoch, D. and Brandes, U., 2016. Re-conceptualizing centrality in social networks. European Journal of Applied Mathematics 27(6), 971-985.

See Also

neighborhood_inclusion, indirect_relations, exact_rank_prob

Examples

library(igraph)

data("dbces11")

P <- neighborhood_inclusion(dbces11)
comparable_pairs(P)

# positional dominance under total heterogeneity
dist <- indirect_relations(dbces11, type = "dist_sp")
D <- positional_dominance(dist, map = FALSE, benefit = FALSE)
comparable_pairs(D)

# positional dominance under total homogeneity
D_map <- positional_dominance(dist, map = TRUE, benefit = FALSE)
comparable_pairs(D_map)