R: Number of edges in the underlying or reflexivity graph of...

num.edgesPEstd.tri {pcds.ugraph}

R Documentation

Number of edges in the underlying or reflexivity graph of Proportional Edge Proximity Catch Digraphs (PE-PCDs) - standard equilateral triangle case

Description

An object of class "NumEdges". Returns the number of edges of the underlying or reflexivity graph of Proportional Edge Proximity Catch Digraphs (PE-PCDs) whose vertices are the given 2D numerical data set, Xp in the standard equilateral triangle. It also provides number of vertices (i.e., number of data points inside the triangle) and indices of the data points that reside in the triangle.

PE proximity region N_{PE}(x,r) is defined with respect to the standard equilateral triangle T_e=T(v=1,v=2,v=3)=T((0,0),(1,0),(1/2,\sqrt{3}/2)) with expansion parameter r \ge 1 and vertex regions are based on the center M=(m_1,m_2) in Cartesian coordinates or M=(\alpha,\beta,\gamma) in barycentric coordinates in the interior of T_e; default is M=(1,1,1), i.e., the center of mass of T_e. For the number of edges, loops are not allowed so edges are only possible for points inside T_e for this function.

Usage

num.edgesPEstd.tri(
  Xp,
  r,
  M = c(1, 1, 1),
  ugraph = c("underlying", "reflexivity")
)

Arguments

`Xp`	A set of 2D points which constitute the vertices of the underlying or reflexivity graphs based on the PE-PCD.
`r`	A positive real number which serves as the expansion parameter for PE proximity region; must be `\ge 1`.
`M`	A 2D point in Cartesian coordinates or a 3D point in barycentric coordinates which serves as a center in the interior of the standard equilateral triangle `T_e`; default is `M=(1,1,1)` i.e. the center of mass of `T_e`.
`ugraph`	The type of the graph based on PE-PCDs, `"underlying"` is for the underlying graph, and `"reflexivity"` is for the reflexivity graph (default is `"underlying"`).

Value

A list with the elements

`desc`	A short description of the output: number of edges and quantities related to the standard equilateral triangle
`und.graph`	Type of the graph as "Underlying" or "Reflexivity" for the PE-PCD
`num.edges`	Number of edges of the underlying or reflexivity graphs based on the PE-PCD with vertices in the standard equilateral triangle `T_e`
`num.in.tri`	Number of `Xp` points in the standard equilateral triangle, `T_e`
`ind.in.tri`	The vector of indices of the `Xp` points that reside in `T_e`
`tess.points`	Tessellation points, i.e., points on which the tessellation of the study region is performed, here, tessellation is the support triangle `T_e`.
`vertices`	Vertices of the underlying or reflexivity graph, `Xp`.

Author(s)

Elvan Ceyhan

References

Ceyhan E (2016). “Edge Density of New Graph Types Based on a Random Digraph Family.” Statistical Methodology, 33, 31-54.

Examples

#\donttest{
A<-c(0,0); B<-c(1,0); C<-c(1/2,sqrt(3)/2);
n<-10

set.seed(1)
Xp<-pcds::runif.std.tri(n)$gen.points

M<-c(.6,.2)

Nedges = num.edgesPEstd.tri(Xp,r=1.25,M)
Nedges
summary(Nedges)
plot(Nedges)
#}

[Package pcds.ugraph version 0.1.1 Index]