persp
Perspective Plots
Description
This function draws perspective plots of a surface over the x–y plane. persp
is a generic function.
Usage
persp(x, ...) ## Default S3 method: persp(x = seq(0, 1, length.out = nrow(z)), y = seq(0, 1, length.out = ncol(z)), z, xlim = range(x), ylim = range(y), zlim = range(z, na.rm = TRUE), xlab = NULL, ylab = NULL, zlab = NULL, main = NULL, sub = NULL, theta = 0, phi = 15, r = sqrt(3), d = 1, scale = TRUE, expand = 1, col = "white", border = NULL, ltheta = -135, lphi = 0, shade = NA, box = TRUE, axes = TRUE, nticks = 5, ticktype = "simple", ...)
Arguments
x, y | locations of grid lines at which the values in |
z | a matrix containing the values to be plotted ( |
xlim, ylim, zlim | x-, y- and z-limits. These should be chosen to cover the range of values of the surface: see ‘Details’. |
xlab, ylab, zlab | titles for the axes. N.B. These must be character strings; expressions are not accepted. Numbers will be coerced to character strings. |
main, sub | main and sub title, as for |
theta, phi | angles defining the viewing direction. |
r | the distance of the eyepoint from the centre of the plotting box. |
d | a value which can be used to vary the strength of the perspective transformation. Values of |
scale | before viewing the x, y and z coordinates of the points defining the surface are transformed to the interval [0,1]. If |
expand | a expansion factor applied to the |
col | the color(s) of the surface facets. Transparent colours are ignored. This is recycled to the (nx-1)(ny-1) facets. |
border | the color of the line drawn around the surface facets. The default, |
ltheta, lphi | if finite values are specified for |
shade | the shade at a surface facet is computed as |
box | should the bounding box for the surface be displayed. The default is |
axes | should ticks and labels be added to the box. The default is |
ticktype | character: |
nticks | the (approximate) number of tick marks to draw on the axes. Has no effect if |
... | additional graphical parameters (see |
Details
The plots are produced by first transforming the (x,y,z) coordinates to the interval [0,1] using the limits supplied or computed from the range of the data. The surface is then viewed by looking at the origin from a direction defined by theta
and phi
. If theta
and phi
are both zero the viewing direction is directly down the negative y axis. Changing theta
will vary the azimuth and changing phi
the colatitude.
There is a hook called "persp"
(see setHook
) called after the plot is completed, which is used in the testing code to annotate the plot page. The hook function(s) are called with no argument.
Notice that persp
interprets the z
matrix as a table of f(x[i], y[j])
values, so that the x axis corresponds to row number and the y axis to column number, with column 1 at the bottom, so that with the standard rotation angles, the top left corner of the matrix is displayed at the left hand side, closest to the user.
The sizes and fonts of the axis labels and the annotations for ticktype = "detailed"
are controlled by graphics parameters "cex.lab"
/"font.lab"
and "cex.axis"
/"font.axis"
respectively.
The bounding box is drawn with edges of faces facing away from the viewer (and hence at the back of the box) with solid lines and other edges dashed and on top of the surface. This (and the plotting of the axes) assumes that the axis limits are chosen so that the surface is within the box, and the function will warn if this is not the case.
Value
persp()
returns the viewing transformation matrix, say VT
, a 4 x 4 matrix suitable for projecting 3D coordinates (x,y,z) into the 2D plane using homogeneous 4D coordinates (x,y,z,t). It can be used to superimpose additional graphical elements on the 3D plot, by lines()
or points()
, using the function trans3d()
.
References
Becker, R. A., Chambers, J. M. and Wilks, A. R. (1988) The New S Language. Wadsworth & Brooks/Cole.
See Also
Rotatable 3D plots can be produced by package rgl: other ways to produce static perspective plots are available in packages lattice and scatterplot3d.
Examples
require(grDevices) # for trans3d ## More examples in demo(persp) !! ## ----------- # (1) The Obligatory Mathematical surface. # Rotated sinc function. x <- seq(-10, 10, length.out = 30) y <- x f <- function(x, y) { r <- sqrt(x^2+y^2); 10 * sin(r)/r } z <- outer(x, y, f) z[is.na(z)] <- 1 op <- par(bg = "white") persp(x, y, z, theta = 30, phi = 30, expand = 0.5, col = "lightblue") persp(x, y, z, theta = 30, phi = 30, expand = 0.5, col = "lightblue", ltheta = 120, shade = 0.75, ticktype = "detailed", xlab = "X", ylab = "Y", zlab = "Sinc( r )" ) -> res round(res, 3) # (2) Add to existing persp plot - using trans3d() : xE <- c(-10,10); xy <- expand.grid(xE, xE) points(trans3d(xy[,1], xy[,2], 6, pmat = res), col = 2, pch = 16) lines (trans3d(x, y = 10, z = 6 + sin(x), pmat = res), col = 3) phi <- seq(0, 2*pi, length.out = 201) r1 <- 7.725 # radius of 2nd maximum xr <- r1 * cos(phi) yr <- r1 * sin(phi) lines(trans3d(xr,yr, f(xr,yr), res), col = "pink", lwd = 2) ## (no hidden lines) # (3) Visualizing a simple DEM model z <- 2 * volcano # Exaggerate the relief x <- 10 * (1:nrow(z)) # 10 meter spacing (S to N) y <- 10 * (1:ncol(z)) # 10 meter spacing (E to W) ## Don't draw the grid lines : border = NA par(bg = "slategray") persp(x, y, z, theta = 135, phi = 30, col = "green3", scale = FALSE, ltheta = -120, shade = 0.75, border = NA, box = FALSE) # (4) Surface colours corresponding to z-values par(bg = "white") x <- seq(-1.95, 1.95, length.out = 30) y <- seq(-1.95, 1.95, length.out = 35) z <- outer(x, y, function(a, b) a*b^2) nrz <- nrow(z) ncz <- ncol(z) # Create a function interpolating colors in the range of specified colors jet.colors <- colorRampPalette( c("blue", "green") ) # Generate the desired number of colors from this palette nbcol <- 100 color <- jet.colors(nbcol) # Compute the z-value at the facet centres zfacet <- z[-1, -1] + z[-1, -ncz] + z[-nrz, -1] + z[-nrz, -ncz] # Recode facet z-values into color indices facetcol <- cut(zfacet, nbcol) persp(x, y, z, col = color[facetcol], phi = 30, theta = -30) par(op)
Copyright (©) 1999–2012 R Foundation for Statistical Computing.
Licensed under the GNU General Public License.