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How can I fill three way color gradient (heatmap) to a triplot (triangle plot), like this.


enter image description here

Color should run in parallel to triplot.

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up vote 20 down vote accepted

Here is one way to do it - it's a bit of a hack, using points to plot the gradient piece by piece:

# sm - how smooth the plot is. Higher values will plot very slowly
sm <- 500
for (y in 1:(sm*sqrt(3)/2)/sm){
    for (x in (y*sm/sqrt(3)):(sm-y*sm/sqrt(3))/sm){
        ## distance from base line: = y
        ## distance from line y = sqrt(3) * x: = abs(sqrt(3) * x - y) / sqrt(3 + 1)
        ## distance from line y = - sqrt(3) * x + sqrt(3): = abs(- sqrt(3) * x - y + sqrt(3)) / sqrt(3 + 1)
        points(x, y, col=rgb(,1 -,1 -, pch=19)

And the output:

enter image description here

Did you want to use these gradients to represent data? If so, it may be possible to alter,, and to do it - I haven't tested anything like that yet though. I hope this is somewhat helpful, but a proper solution using colorRamp, for example, will probably be better.

EDIT: As per baptiste's suggestion, this is how you would store the information in vectors and plot it all at once. It is considerably faster (especially with sm set to 500, for example):

sm <- 500
x <-, sapply(1:(sm*sqrt(3)/2)/sm, 
                       function(i) (i*sm/sqrt(3)):(sm-i*sm/sqrt(3))/sm))
y <-, sapply(1:(sm*sqrt(3)/2)/sm, 
                       function(i) rep(i, length((i*sm/sqrt(3)):(sm-i*sm/sqrt(3)))))) = y = abs(sqrt(3) * x - y) / sqrt(3 + 1) = abs(- sqrt(3) * x - y + sqrt(3)) / sqrt(3 + 1)
points(x, y, col=rgb(,1 -,1 -, pch=19)
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thanks for the great there way to start at more darker color (red, green and blue) so that gradient look more sharp – jon Aug 4 '12 at 21:44
I've tried a couple of different things to make the gradient sharper, but I couldn't find a way that doesn't make areas of the graph very dark and dull. Are you all right with red, green and blue starting in the corners? If you are, try replacing the last line of code with points(x, y, col=rgb(,,, pch=19) - the gradients for those three colors seem sharper since they aren't mixing so much with the other colors at their origins. – Edward Aug 4 '12 at 22:56
why do you plot each point individually? You could store a vector of colours and plot all the points at once. – baptiste Aug 4 '12 at 23:12
@baptiste - Thanks for pointing it out. I included a version that uses vectors and it runs much faster. Thanks! – Edward Aug 5 '12 at 21:33

Here's a solution with a rasterized background image. The sharpness parameter of the tricol function controls how fast the colors fade to black. Setting it to 1 gives you Edward's colors and setting it to 2 gives you the colors below.

# Coordinates of the triangle
tri <- rbind(sin(0:2*2/3*pi), cos(0:2*2/3*pi))

# Function for calculating the color of a set of points `pt`
# in relation to the triangle
tricol <- function(pt, sharpness=2){
    RGB <- sapply(1:3, function(i){
        a <- sweep(pt, 2, tri[,i])
        b <- apply(tri[,-i], 1, mean) - tri[,i]
        sharpness*((a %*% b) / sum(b^2))-sharpness+1
    RGB[-inpip(pt,t(tri)),] <- 1    # Color points outside the triangle white, unname(, 0), 1))))

# Plot
res <- 1000                         # Resolution
xi <- seq(-1, 1, length=res)        # Axis points
yi <- seq(-.8, 1.2, length=res)
x <- xi[1] + cumsum(diff(xi))       # Midpoints between axis points
y <- yi[1] + cumsum(diff(yi))
xy <- matrix(1:(length(x)*length(y)), length(x))
image(xi, yi, xy, col=tricol(as.matrix(expand.grid(x,y))), useRaster=TRUE)
lines(tri[1,c(1:3,1)], tri[2,c(1:3,1)], type="l")

What tricol() does is represent each corner i with a color (red, green, blue). It defines a matrix a of vectors from the corner to the points in pt and a vector b from the corner to the center of the opposite edge. It then projects a onto b and scales to get the relative distances = color intensity (and applies a small hack with sharpness to adjust the colors a bit). When it comes to problems like this simple algebra can work magic.

You get a litte noise around the edges due to aliasing, but you could probably tweak that away, or draw slightly wider lines in the triangle. Gradient triangle

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I was contemplating a similar idea, but with three discs (R,G,B) of radius the side of the triangle, and an alpha channel fading to 0. I believe R would then do the colour mixing automaically. – baptiste Aug 6 '12 at 19:28
Sort of. It would show though which circle was drawn on top of which other. Let's say red is on top, then green, then blue. In the middle you'd have 50% red, but only 25% green (50% of the remaing 50%) and 12.5% blue. Pretty much every Venn-diagram I've seen suffers from this, and once I saw it I can't stop noticing it. Take these for instance. – Backlin Aug 6 '12 at 19:34

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