IarcCSset2pnt.std.tri: The indicator for the presence of an arc from a point in set...
In elvanceyhan/pcds: Proximity Catch Digraphs and Their Applications
IarcCSset2pnt.std.tri R Documentation
The indicator for the presence of an arc from a point in set S to the point p for Central Similarity
Proximity Catch Digraphs (CS-PCDs) - standard equilateral triangle case
Description
Returns I(p in N_{CS}(x,t) for some x in S), that is, returns 1 if p is in \cup_{x in S} N_{CS}(x,t),
returns 0 otherwise, CS proximity region is constructed with respect to the standard equilateral triangle
T_e=T(A,B,C)=T((0,0),(1,0),(1/2,\sqrt{3}/2)) with the expansion parameter t>0 and edge 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 T_e; default is M=(1,1,1) i.e., the center of mass of T_e (which is equivalent to circumcenter of T_e).
Edges of T_e, AB, BC, AC, are also labeled as edges 3, 1, and 2, respectively.
If p is not in S and either p or all points in S are outside T_e, it returns 0,
but if p is in S, then it always returns 1 regardless of its location (i.e., loops are allowed).
See also (\insertCiteceyhan:mcap2012;textualpcds).
Usage
IarcCSset2pnt.std.tri(S, p, t, M = c(1, 1, 1))
Arguments
S
A set of 2D points. Presence of an arc from a point in S to point p is checked
by the function.
p
A 2D point. Presence of an arc from a point in S to point p is checked
by the function.
t
A positive real number which serves as the expansion parameter in CS proximity region in the
standard equilateral triangle T_e=T((0,0),(1,0),(1/2,\sqrt{3}/2)).
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.
Value
I(p is in \cup_{x in S} N_{CS}(x,t)), that is, returns 1 if p is in S or inside N_{CS}(x,t) for at least
one x in S, returns 0 otherwise. CS proximity region is constructed with respect to the standard
equilateral triangle T_e=T(A,B,C)=T((0,0),(1,0),(1/2,\sqrt{3}/2)) with M-edge regions.
Author(s)
Elvan Ceyhan
References
\insertAllCited
See Also
IarcCSset2pnt.tri, IarcCSstd.tri, IarcCStri, and IarcPEset2pnt.std.tri
Examples
## Not run:
A<-c(0,0); B<-c(1,0); C<-c(1/2,sqrt(3)/2);
Te<-rbind(A,B,C);
n<-10
set.seed(1)
Xp<-runif.std.tri(n)$gen.points
M<-as.numeric(runif.std.tri(1)$g) #try also M<-c(.6,.2)
t<-.5
S<-rbind(Xp[1,],Xp[2,]) #try also S<-c(.5,.5)
IarcCSset2pnt.std.tri(S,Xp[3,],t,M)
IarcCSset2pnt.std.tri(S,Xp[3,],t=1,M)
IarcCSset2pnt.std.tri(S,Xp[3,],t=1.5,M)
S<-rbind(c(.1,.1),c(.3,.4),c(.5,.3))
IarcCSset2pnt.std.tri(S,Xp[3,],t,M)
## End(Not run)
elvanceyhan/pcds documentation built on June 29, 2023, 8:12 a.m.
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| IarcCSset2pnt.std.tri | R Documentation |
The indicator for the presence of an arc from a point in set S to the point p for Central Similarity
Proximity Catch Digraphs (CS-PCDs) - standard equilateral triangle case
Description
Returns I(p in N_{CS}(x,t) for some x in S), that is, returns 1 if p is in \cup_{x in S} N_{CS}(x,t),
returns 0 otherwise, CS proximity region is constructed with respect to the standard equilateral triangle
T_e=T(A,B,C)=T((0,0),(1,0),(1/2,\sqrt{3}/2)) with the expansion parameter t>0 and edge 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 T_e; default is M=(1,1,1) i.e., the center of mass of T_e (which is equivalent to circumcenter of T_e).
Edges of T_e, AB, BC, AC, are also labeled as edges 3, 1, and 2, respectively.
If p is not in S and either p or all points in S are outside T_e, it returns 0,
but if p is in S, then it always returns 1 regardless of its location (i.e., loops are allowed).
See also (\insertCiteceyhan:mcap2012;textualpcds).
Usage
IarcCSset2pnt.std.tri(S, p, t, M = c(1, 1, 1))
Arguments
S |
A set of 2D points. Presence of an arc from a point in |
p |
A 2D point. Presence of an arc from a point in |
t |
A positive real number which serves as the expansion parameter in CS proximity region in the
standard equilateral triangle |
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 |
Value
I(p is in \cup_{x in S} N_{CS}(x,t)), that is, returns 1 if p is in S or inside N_{CS}(x,t) for at least
one x in S, returns 0 otherwise. CS proximity region is constructed with respect to the standard
equilateral triangle T_e=T(A,B,C)=T((0,0),(1,0),(1/2,\sqrt{3}/2)) with M-edge regions.
Author(s)
Elvan Ceyhan
References
\insertAllCitedSee Also
IarcCSset2pnt.tri, IarcCSstd.tri, IarcCStri, and IarcPEset2pnt.std.tri
Examples
## Not run:
A<-c(0,0); B<-c(1,0); C<-c(1/2,sqrt(3)/2);
Te<-rbind(A,B,C);
n<-10
set.seed(1)
Xp<-runif.std.tri(n)$gen.points
M<-as.numeric(runif.std.tri(1)$g) #try also M<-c(.6,.2)
t<-.5
S<-rbind(Xp[1,],Xp[2,]) #try also S<-c(.5,.5)
IarcCSset2pnt.std.tri(S,Xp[3,],t,M)
IarcCSset2pnt.std.tri(S,Xp[3,],t=1,M)
IarcCSset2pnt.std.tri(S,Xp[3,],t=1.5,M)
S<-rbind(c(.1,.1),c(.3,.4),c(.5,.3))
IarcCSset2pnt.std.tri(S,Xp[3,],t,M)
## End(Not run)
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