--- title: "Positional dominance in networks" output: rmarkdown::html_vignette vignette: > %\VignetteIndexEntry{03 positional dominance in networks} %\VignetteEngine{knitr::rmarkdown} %\VignetteEncoding{UTF-8} --- This vignette describes the concept of positional dominance, the generalization of [neighborhood-inclusion](neighborhood_inclusion.html) for arbitrary network and attribute data. Additionally, some use cases with the `netrankr` package are given. The partial ranking induced by positional dominance can be used to assess [partial centrality](partial_centrality.html) or compute [probabilistic centrality](probabilistic_cent.html). ________________________________________________________________________________ ## Theoretical Background A network can be described as a *dyadic variable* $x\in \mathcal{W}^\mathcal{D}$, where $\mathcal{W}$ is the value range of the network (in the simple case of unweighted networks $\mathcal{W}=\{0,1\}$) and $\mathcal{D}=\mathcal{N}\times\mathcal{A}$ describes the dyadic domain of actors $\mathcal{N}$ and affiliations $\mathcal{A}$. If $\mathcal{A}\neq\mathcal{N}$, we obtain a *two-mode network* and if $\mathcal{A}=\mathcal{N}$ a *one-mode network* consisting of relations among actors. \ \ \ **Definition** Let $x\in \mathcal{W}^\mathcal{D}$ be a network and $i,j \in \mathcal{N}$. We say that $i$ is dominated by $j$ *under the total homogeneity assumption*, denoted by $i \leq j$ if $$ x_{it}\leq x_{jt} \quad \forall t \in \mathcal{N}. $$ If there exists a permutation $\pi: \mathcal{N} \to \mathcal{N}$ such that $$ x_{it}\leq x_{j\pi(t)} \quad \forall t \in \mathcal{N}, $$ we say that $i$ is dominated by $j$ *under the total heterogeneity assumption*, denoted by $i ⪯ j$. It holds that $i\leq j \implies i ⪯ j$ but not vice versa. \ \ \ More about the positional dominance and the positional approach to network analysis can be found in > Brandes, Ulrik. (2016). Network Positions. *Methodological Innovations*, **9**, 2059799116630650. ([link](https://dx.doi.org/10.1177/2059799116630650)) ________________________________________________________________________________ ## Positional Dominance in the `netrankr` Package ```{r setup, warning=FALSE,message=FALSE} library(netrankr) library(igraph) library(magrittr) set.seed(1886) #for reproducibility ``` The function `positional_dominance` can be used to check both, dominance under homogeneity and heterogeneity. In accordance with the analytic pipeline of centrality we use the `%>%` operator. ```{r pos_dom} data("dbces11") g <- dbces11 #neighborhood inclusion can be expressed with the analytic pipeline D <- g %>% indirect_relations(type="adjacency") %>% positional_dominance() ``` More on the `indirect_relations()` function can be found in [this](indirect_relations.html) vignette. The `map` parameter of `positional_dominance` allows to distinguish between dominance under *total heterogeneity* (`map=FALSE`) and *total homogeneity* (`map=TRUE`). In the later case, all relations can be ordered non-decreasingly (or non-increasingly if the relation describes costs, such as distances) and afterwards checked front to back. Dominance under total homogeneity yields a ranking, if the relation is binary (e.g. adjacent or not). ```{r homo_and_hetero} D <- g %>% indirect_relations(type="adjacency") %>% positional_dominance(map=TRUE) comparable_pairs(D) ``` For cost variables like shortest path distances, the `benefit` parameter is set to `FALSE`. ```{r dist} D1 <- g %>% indirect_relations(type="dist_sp") %>% positional_dominance(map=FALSE,benefit=FALSE) ``` From the definition given in the first section, it is clear that there are always at least as many comparable pairs under the total homogeneity assumption as under total heterogeneity. ```{r homo_and_hetero_dist} D1 <- g %>% indirect_relations(type="dist_sp") %>% positional_dominance(map=FALSE,benefit=FALSE) D2 <- g %>% indirect_relations(type="dist_sp") %>% positional_dominance(map=TRUE,benefit=FALSE) c("heterogeneity"=comparable_pairs(D1), "homogeneity"=comparable_pairs(D2)) ``` Additionally, all dominance relations from the heterogeneity assumption are preserved under total homogeneity. (Note: $A\implies B$ is equivalent to $\neg A \lor B$) ```{r homo_in_hetero} all(D1!=1 | D2==1) ```