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I have 3 vertices represented as points in a plot connected with three edges. I'd like to bend the the edges towards the center of the triangle (c(.5, .35)). How can I turn graph 1 into graph 2 in ggplot2 (I assume this answer would be generalizable to base as well? There is some desirable jitter in the curved edges though the vertices remain stable. I assume this would mean some sort of linear transformation that has some sort of slightly randomized constant.

Graph 1

enter image description here

Graph 2 (color only used to highlight desired output)

enter image description here

library(ggplot2); library(scales)

## The vertices/points data
  point    x    y
1     A 0.25 0.45
2     B 0.50 0.25
3     C 0.75 0.45

## The edges data
  out.x out.y receiver.x receiver.y
1  0.25  0.45       0.50       0.25
2  0.50  0.25       0.75       0.45
3  0.75  0.45       0.25       0.45
4  0.25  0.45       0.50       0.25
5  0.50  0.25       0.75       0.45
6  0.75  0.45       0.25       0.45

## Edges and vertices/points data in dput form for ease
so <- structure(list(out.x = c(0.25, 0.5, 0.75, 0.25, 0.5, 0.75), out.y = c(0.45, 
    0.25, 0.45, 0.45, 0.25, 0.45), receiver.x = c(0.5, 0.75, 0.25, 
    0.5, 0.75, 0.25), receiver.y = c(0.25, 0.45, 0.45, 0.25, 0.45, 
    0.45)), .Names = c("out.x", "out.y", "receiver.x", "receiver.y"
    ), row.names = c(NA, -6L), class = "data.frame")


the_points <- data.frame(point=factor(LETTERS[1:3]), 
    x = c(.25, .5, .75), 
    y = c(.45, .25, .45)
)

## Plot the base graph minus the edges
root <- ggplot() + 
    geom_point(data=the_points, aes(x=x, y=y), size=12, inherit.aes = FALSE) +
    geom_text(data=the_points, aes(x=x, y=y, label=as.character(point)), 
        inherit.aes = FALSE, color="white") +
    ylim(c(.20, .75)) + xlim(c(.25, .75)) +
    ylab("") + xlab("") 

## Add the edges
root + geom_segment(aes(x= out.x, y= out.y, xend = receiver.x, 
        yend = receiver.y), alpha = .7, size = 3, data = so) 
share|improve this question
    
Does is-r.tumblr.com/post/38459242505/… provide inspiration? –  mnel Sep 12 '13 at 1:28

2 Answers 2

up vote 7 down vote accepted

Here is an approach working on bezier curves from Hmisc (motivated by http://is-r.tumblr.com/post/38459242505/beautiful-network-diagrams-with-ggplot2)

library(Hmisc)
library(plyr)
# a function to sample a point within a triangle
rtriang <- function(A ,B,C){
  r <- runif(2)
  sqr1 <- sqrt(r[1])
  (1- sqr1)*A +  (1-r[2])*sqr1*B + r[2]*sqr1*C

}


# a function to make a curve between two points (as set up in the example)
make.curve <- function(coords,n=101,A ,B ,C){
  rt  <- rtriang(A,B,C)
  xxs <- unlist(coords[,c(1,3)])
  yys <-unlist(coords[,c(2,4)])
  xx <- append(xxs, rt[1],1)
  yy <- append(yys, rt[2] ,1)
  as.data.frame(bezier(xx,yy, evaluation=n))
}

# A triangle 1 /3 rd size with same centre point
mid <- matrix(colMeans(the_points[,2:3]), ncol=2,nrow=3,byrow=TRUE)
tri <- as.matrix(the_points[,2:3])
rownames(tri) <- rownames(mid) <- LETTERS[1:3]
newT <- mid + (tri-mid)/3

# create a new data set with bezier curves with a midpoint
# somewhere within a triangle 1/3 the size of the original 
newd <- adply(so, 1, make.curve, A = newT['A',],B = newT['B',], C = newT['C',])
newd$id <- rep(seq_len(nrow(so)), each = 101)
# and the plot
root + geom_path(data = newd, aes(colour = factor(id), x=x,y=y))

enter image description here

share|improve this answer
    
Maybe not as simple as using igraph, but it is probably closer to what OP wanted. I have no idea how one would combine my answer into the ggplot ecosystem though. –  thelatemail Sep 12 '13 at 2:47
    
This gives me lots of great ideas that I can work with. Thanks for the response. +1 –  Tyler Rinker Sep 12 '13 at 3:20

I think using the igraph library could be really helpful here, e.g:

library(igraph)
# make a data frame for the relationships between
# each of the points, replacing your 'edges' data
pts <- data.frame(a=rep(1:3,2),b=rep(c(2,3,1),2))
# plot using igraph
plot(
  graph.data.frame(pts),
  layout=as.matrix(the_points[c("x","y")]),
  margin=c(-0.3),
  vertex.label=c("A","B","C"),
  vertex.label.color="white",
  vertex.label.family="sans",
  vertex.label.font=2,
  vertex.size=35,
  vertex.color="black",
  edge.arrow.mode="-",
  edge.curved=rep(c(0.5,0.2),3),
  edge.width=5,
  edge.color=1:6
)

Resulting in:

enter image description here

share|improve this answer
    
So much simpler!! –  mnel Sep 12 '13 at 2:39
    
Very nice approach. It think I'll work with mnel's as it's in ggplot2 though. Thank you. +1 –  Tyler Rinker Sep 12 '13 at 3:19

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