# How do I estimate a variogram for data on a globe?

I have data with associated longitudes and latitudes. How do I get a variogram for this data based on the great-circle distances between the points?

This simple example has all the data on the equator:

``````require(geoR)

long <- seq(-179, 180)
x <- sin(pi * long / 180) + rnorm(length(long))
V <- variog(data=x, coords=cbind(long, 0))
# variog: computing omnidirectional variogram
plot(V)
``````

The first and last points are actually only 1 degree apart, but my naive attempt results in `variog` thinking they're separated by 359 degrees.

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You should use the Semi-variogram from nmle. It allows you to specify a distance matrix, which you can trivially work out for yourself.

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From a post on R-sig-geo (mailing list dedicated to spatial data in R) I seem to remember that there are no ready-to-go functions in R that support great circle distances:

http://r-sig-geo.2731867.n2.nabble.com/Great-Circle-distances-in-Automap-Gstat-td6863940.html

My suggestion would be to project your data and than perform interpolation on the projected data.

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As far as I know there are no distance-preserving projections. –  pete Nov 8 '11 at 6:32
Your goal is to interpolate a global dataset? Maybe post a question on the R-sig-geo mailing list. –  Paul Hiemstra Nov 8 '11 at 12:28
No, I want to plot a variogram. Nothing to do with interpolation. –  pete Nov 9 '11 at 5:24
And projecting your data is not an option? I would imagine you could get some error during projection, but how much would this influence the general trend in the variogram. –  Paul Hiemstra Nov 9 '11 at 11:02
That's only an option if I can find a suitable projection. –  pete Nov 9 '11 at 19:50