Idom.num2PEtri: The indicator for two points constituting a dominating set...
In elvanceyhan/pcds: Proximity Catch Digraphs and Their Applications

Idom.num2PEtri

R Documentation

The indicator for two points constituting a dominating set for Proportional Edge Proximity Catch Digraphs (PE-PCDs) - one triangle case

Description

Returns I({p1,p2} is a dominating set of the PE-PCD) where the vertices of the PE-PCD are the 2D data set Xp, that is, returns 1 if {p1,p2} is a dominating set of PE-PCD, and returns 0 otherwise.

Point, p1, is in the region of vertex rv1 (default is NULL) and point, p2, is in the region of vertex rv2 (default is NULL); vertices (and hence rv1 and rv2) are labeled as 1,2,3 in the order they are stacked row-wise in tri.

PE proximity regions are defined with respect to the triangle tri and vertex regions are based on center M=(m_1,m_2) in Cartesian coordinates or M=(\alpha,\beta,\gamma) in barycentric coordinates in the interior of the triangle tri or circumcenter of tri; default is M=(1,1,1), i.e., the center of mass of tri.

ch.data.pnts is for checking whether points p1 and p2 are data points in Xp or not (default is FALSE), so by default this function checks whether the points p1 and p2 would be a dominating set if they actually were in the data set.

See also (\insertCiteceyhan:Phd-thesis,ceyhan:masa-2007,ceyhan:dom-num-NPE-Spat2011,ceyhan:mcap2012;textualpcds).

Usage

Idom.num2PEtri(
  p1,
  p2,
  Xp,
  tri,
  r,
  M = c(1, 1, 1),
  rv1 = NULL,
  rv2 = NULL,
  ch.data.pnts = FALSE
)

Arguments

`p1, p2`	Two 2D points to be tested for constituting a dominating set of the PE-PCD.
`Xp`	A set of 2D points which constitutes the vertices of the PE-PCD.
`tri`	A `3 \times 2` matrix with each row representing a vertex of the triangle.
`r`	A positive real number which serves as the expansion parameter in 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 triangle `tri` or the circumcenter of `tri` which may be entered as "CC" as well; default is `M=(1,1,1)`, i.e., the center of mass of `tri`.
`rv1, rv2`	The indices of the vertices whose regions contains `p1` and `p2`, respectively. They take the vertex labels as `1,2,3` as in the row order of the vertices in `tri` (default is `NULL` for both).
`ch.data.pnts`	A logical argument for checking whether points `p1` and `p2` are data points in `Xp` or not (default is `FALSE`).

Value

I({p1,p2} is a dominating set of the PE-PCD) where the vertices of the PE-PCD are the 2D data set Xp, that is, returns 1 if {p1,p2} is a dominating set of PE-PCD, and returns 0 otherwise.

Author(s)

Elvan Ceyhan

References

\insertAllCited

Examples

## Not run: 
A<-c(1,1); B<-c(2,0); C<-c(1.5,2);
Tr<-rbind(A,B,C);
n<-10  #try also n<-20

set.seed(1)
Xp<-runif.tri(n,Tr)$g

M<-as.numeric(runif.tri(1,Tr)$g)  #try also M<-c(1.6,1.0)

r<-1.5  #try also r<-2

Idom.num2PEtri(Xp[1,],Xp[2,],Xp,Tr,r,M)

ind.gam2<-vector()
for (i in 1:(n-1))
  for (j in (i+1):n)
  {if (Idom.num2PEtri(Xp[i,],Xp[j,],Xp,Tr,r,M)==1)
   ind.gam2<-rbind(ind.gam2,c(i,j))}
ind.gam2

#or try
rv1<-rel.vert.tri(Xp[1,],Tr,M)$rv;
rv2<-rel.vert.tri(Xp[2,],Tr,M)$rv
Idom.num2PEtri(Xp[1,],Xp[2,],Xp,Tr,r,M,rv1,rv2)

Idom.num2PEtri(Xp[1,],c(1,2),Xp,Tr,r,M,ch.data.pnts = FALSE)
#gives an error message if ch.data.pnts = TRUE
#since not both points, p1 and p2, are data points in Xp

## End(Not run)

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