ArcsPE: The arcs of Proportional Edge Proximity Catch Digraph...
In elvanceyhan/pcds: Proximity Catch Digraphs and Their Applications

arcsPE

R Documentation

The arcs of Proportional Edge Proximity Catch Digraph (PE-PCD) for 2D data - multiple triangle case

Description

An object of class "PCDs". Returns arcs as tails (or sources) and heads (or arrow ends) of Proportional Edge Proximity Catch Digraph (PE-PCD) whose vertices are the data points in Xp in the multiple triangle case and related parameters and the quantities of the digraph.

PE proximity regions are defined with respect to the Delaunay triangles based on Yp points with expansion parameter r \ge 1 and vertex regions in each triangle are based on the center M=(\alpha,\beta,\gamma) in barycentric coordinates in the interior of each Delaunay triangle or based on circumcenter of each Delaunay triangle (default for M=(1,1,1) which is the center of mass of the triangle). Each Delaunay triangle is first converted to an (nonscaled) basic triangle so that M will be the same type of center for each Delaunay triangle (this conversion is not necessary when M is CM).

Convex hull of Yp is partitioned by the Delaunay triangles based on Yp points (i.e., multiple triangles are the set of these Delaunay triangles whose union constitutes the convex hull of Yp points). For the number of arcs, loops are not allowed so arcs are only possible for points inside the convex hull of Yp points.

See (\insertCiteceyhan:Phd-thesis,ceyhan:arc-density-PE,ceyhan:dom-num-NPE-Spat2011;textualpcds) for more on the PE-PCDs. Also, see (\insertCiteokabe:2000,ceyhan:comp-geo-2010,sinclair:2016;textualpcds) for more on Delaunay triangulation and the corresponding algorithm.

Usage

arcsPE(Xp, Yp, r, M = c(1, 1, 1))

Arguments

`Xp`	A set of 2D points which constitute the vertices of the PE-PCD.
`Yp`	A set of 2D points which constitute the vertices of the Delaunay triangles.
`r`	A positive real number which serves as the expansion parameter in PE proximity region; must be `\ge 1`.
`M`	A 3D point in barycentric coordinates which serves as a center in the interior of each Delaunay triangle or circumcenter of each Delaunay triangle (for this, argument should be set as `M="CC"`), default for `M=(1,1,1)` which is the center of mass of each triangle.

Value

A list with the elements

`type`	A description of the type of the digraph
`parameters`	Parameters of the digraph, the center used to construct the vertex regions and the expansion parameter.
`tess.points`	Points on which the tessellation of the study region is performed, here, tessellation is Delaunay triangulation based on `Yp` points.
`tess.name`	Name of data set used in tessellation, it is `Yp` for this function
`vertices`	Vertices of the digraph, `Xp` points
`vert.name`	Name of the data set which constitute the vertices of the digraph
`S`	Tails (or sources) of the arcs of PE-PCD for 2D data set `Xp` as vertices of the digraph
`E`	Heads (or arrow ends) of the arcs of PE-PCD for 2D data set `Xp` as vertices of the digraph
`mtitle`	Text for `"main"` title in the plot of the digraph
`quant`	Various quantities for the digraph: number of vertices, number of partition points, number of triangles, number of arcs, and arc density.

Author(s)

Elvan Ceyhan

References

\insertAllCited

Examples

## Not run: 
#nx is number of X points (target) and ny is number of Y points (nontarget)
nx<-20; ny<-5;  #try also nx<-40; ny<-10 or nx<-1000; ny<-10;

set.seed(1)
Xp<-cbind(runif(nx,0,1),runif(nx,0,1))
Yp<-cbind(runif(ny,0,.25),runif(ny,0,.25))+cbind(c(0,0,0.5,1,1),c(0,1,.5,0,1))
#try also Yp<-cbind(runif(ny,0,1),runif(ny,0,1))

M<-c(1,1,1)  #try also M<-c(1,2,3)

r<-1.5  #try also r<-2

Arcs<-arcsPE(Xp,Yp,r,M)
#or try with the default center Arcs<-arcsPE(Xp,Yp,r)
Arcs
summary(Arcs)
plot(Arcs)

## End(Not run)

elvanceyhan/pcds documentation built on June 29, 2023, 8:12 a.m.