# vector field visualisation R

I have a big text file with a lot of rows. Every row corresponds to one vector. This is the example of each row:

``````        x           y               dx              dy
99.421875   52.078125   0.653356799108  0.782479314511
``````

First two columns are coordinates of the beggining of the vector. And two second columnes are coordinate increments (the end minus the start). I need to make the picture of this vector field (all the vectors on one picture). How could I do this? Thank you

-
add something like `arrows(DF[,1], DF[,2], DF[,1] + DF[,3], DF[,2] + DF[,4])`. See `?arrows` for better control. Assuming someone will give a better answer, though –  tim riffe Feb 18 '13 at 12:44
@timriffe you should add it as an answer as the OP might appreciate a `base` solution, as an alternative to the `ggplot2` solution. –  plannapus Feb 18 '13 at 12:57

With `ggplot2`, you can do something like this :

``````library(grid)
df <- data.frame(x=runif(10),y=runif(10),dx=rnorm(10),dy=rnorm(10))
ggplot(data=df, aes(x=x, y=y)) + geom_segment(aes(xend=x+dx, yend=y+dy), arrow = arrow(length = unit(0.3,"cm")))
``````

This is taken almost directly from the `geom_segment` help page.

-
Thank you very much! –  user2080209 Feb 18 '13 at 13:09
Do you know if there is a similar way of creating a 3d vector field with R ? –  gsimard Apr 11 '13 at 3:27

If there is a lot of data (the question says "big file"), plotting the individual vectors may not give a very readable plot. Here is another approach: the vector field describes a way of deforming something drawn on the plane; apply it to a white noise image.

``````vector_field <- function(
f,  # Function describing the vector field
xmin=0, xmax=1, ymin=0, ymax=1,
width=600, height=600,
iterations=50,
epsilon=.01,
trace=TRUE
) {
z <- matrix(runif(width*height),nr=height)
i_to_x <- function(i) xmin + i / width  * (xmax - xmin)
j_to_y <- function(j) ymin + j / height * (ymax - ymin)
x_to_i <- function(x) pmin( width,  pmax( 1, floor( (x-xmin)/(xmax-xmin) * width  ) ) )
y_to_j <- function(y) pmin( height, pmax( 1, floor( (y-ymin)/(ymax-ymin) * height ) ) )
i <- col(z)
j <- row(z)
x <- i_to_x(i)
y <- j_to_y(j)
res <- z
for(k in 1:iterations) {
v <- matrix( f(x, y), nc=2 )
x <- x+.01*v[,1]
y <- y+.01*v[,2]
i <- x_to_i(x)
j <- y_to_j(y)
res <- res + z[cbind(i,j)]
if(trace) {
cat(k, "/", iterations, "\n", sep="")
dev.hold()
image(res)
dev.flush()
}
}
if(trace) {
dev.hold()
image(res>quantile(res,.6), col=0:1)
dev.flush()
}
res
}

# Sample data
van_der_Pol <- function(x,y, mu=1) c(y, mu * ( 1 - x^2 ) * y - x )
res <- vector_field(
van_der_Pol,
xmin=-3, xmax=3, ymin=-3, ymax=3,
width=800, height=800,
iterations=50,
epsilon=.01
)
image(-res)
``````

You may want to apply some image processing to the result to make it more readable.

``````image(res > quantile(res,.6), col=0:1)
``````

In your case, the vector field is not described by a function: you can use the value of the nearest neighbour or some 2-dimensional interpolation (e.g., from the `akima` package).

-

OK, here's a base solution:

``````DF <- data.frame(x=rnorm(10),y=rnorm(10),dx=runif(10),dy=runif(10))
plot(NULL, type = "n", xlim=c(-3,3),ylim=c(-3,3))
arrows(DF[,1], DF[,2], DF[,1] + DF[,3], DF[,2] + DF[,4])
``````
-

Here is a example from the R-Help of pracma-package.

``````library(pracma)
f <- function(x, y) x^2 - y^2
xx <- c(-1, 1); yy <- c(-1, 1)
vectorfield(f, xx, yy, scale = 0.1)
for (xs in seq(-1, 1, by = 0.25)) {
sol <- rk4(f, -1, 1, xs, 100)
lines(sol\$x, sol\$y, col="darkgreen")
}
``````

You can use quiver also.

``````library(pracma)
xyRange <- seq(-1*pi,1*pi,0.2)
temp <- meshgrid(xyRange,xyRange)
u <- sin(temp\$Y)
v <- cos(temp\$X)
plot(range(xyRange),range(xyRange),type="n",xlab=expression(frac(d*Phi,dx)),ylab=expression(d*Phi/dy))
quiver(temp\$X,temp\$Y,u,v,scale=0.5,length=0.05,angle=1)
``````
-