# interpolate irregular x,y data points into regular grid for contour mapping

I am a Geologist needing to create few hundred consistent contour maps in a project with varying x y z data sets.

Contouring irregular x y z data points involves creation of a 'grid' of interpolated (extrapolated) z values at a uniform x-y mesh. Outside R - this step is called 'gridding'. I am relatively new to R and trying to set a strong workflow to grid a large number of irregular data points. I am struggling!

On classic contour mapping software and workflow the steps are:

1. Read x y z data
2. Determine Area of Interest (AOI) for the final map. XMIN, XMAX, YMIN, YMAX
3. Determine Grid intervals (XINT, YINT) - sets the No of Rows and No of Columns to the 'grid' (NROW, NCOL)
4. Apply one of the needed interpolators - that create 'z' at the regular mesh/ grid (Common interpolators are: inverse distance, inverse square distance, weighted average, polynomial, kriging, spline, etc.)
5. Contour the resulting 'grid'

I am trying to script R to exactly follow the above sequence of steps for flexibility and control throughout the analysis.

df is the data frame consisting of an example data set.

``````     wellid property           z        x       y
060010        1 0.008849558 756994.5 2637732
009410        1 0.260162602 760190.9 2622262
009910        1 0.115044248 760898.7 2637466
051110        1 0.109243697 761690.2 2630985
065610        1 0.066666667 763064.1 2620929
011010        1 0.000000000 763089.3 2630888
035210        1 0.022556391 765942.4 2625944
052510        1 0.157894737 767058.1 2650034
006610        1 0.045045045 768265.0 2645318
009010        1 0.378151261 768471.8 2636731
011210        1 0.028776978 771393.8 2629001
064810        1 0.428571429 771394.1 2650776
009110        1 0.064220183 775332.6 2648531
011410        1 0.148760331 778324.8 2633905
065010        1 0.514851485 780480.9 2654874
052410        1 0.173913043 780961.0 2637571
064110        1 0.019417476 781001.5 2650994
009310        1 0.037383178 783904.7 2641130
010810        1 0.041237113 786200.6 2652417
052610        1 0.150537634 788007.5 2654005
``````

The Area of Interest is determined from study area as below:

``````    xmin <- signif(min(wellcoords\$x),4) - 1000
xmax <- signif(max(wellcoords\$x),4) +1000
ymin <- signif(min(wellcoords\$y),5) - 1000
ymax <- signif(max(wellcoords\$y),5) +1000
xrange <- xmax-xmin
yrange <- ymax-ymin
gridint <- 500     # grid interval is set same for xint and yint
``````

The values are: 754700, 791500,26196000,2658600, 36800, 39000, 500 respectively.

After a lot of failed trials - got the interp() function from package - akima to do the needed interpolation. Thanks to answer under "Plotting contours on an irregular grid"

``````    fld<- with(df, interp(x=df\$x, y=df\$y, z=df\$z, xo=xcoord, yo=ycoord, linear = FALSE, extrap = TRUE))
``````

This did not allow me to specify the AOI controls as desired. I tried using package MBA and yet working on creating the xy.est parameter (Grid mesh) as required input.

If proper 'grid' is generated, ggplot2 and other display functions are powerful and sufficient.

Are there proper 'Gridding' packages or 'Steps'. Thanks in advance.

I don't think you need to use other package than `akima` (and a graphic package like `ggplot2`). You can give AOI and number of 'grid' as interp's arguments `xo` and `yo`. And you can get xy.est parameter by `interp2xyz(interp.obj)`.

``````df <- "your example data set"
# I didn't know What wellcoords were, so I treated df as wellcoords. These values are different from what you said.
xmin <- signif(min(df\$x),4) - 1000  # 756000
xmax <- signif(max(df\$x),4) + 1000  # 789000
ymin <- signif(min(df\$y),5) - 1000  # 2619900
ymax <- signif(max(df\$y),5) + 1000  # 2655900
gridint <- 500

library(akima)
fld<- with(df, interp(x = x, y = y, z = z, linear = FALSE, extrap = TRUE,
xo=seq(xmin, xmax, length=gridint),
yo=seq(ymin, ymax, length=gridint)))  # give AOI and number of 'grid'
# check whether the conditions are met.
length(fld\$x); length(fld\$y); length(fld\$z); range(fld\$x); range(fld\$y)
# 500, 500, 250000 (=500^2), 756000 789000, 2619900 2655900,   # all OK

contour(fld)   # Left graph (most basic graphic output)

fld2 <- as.data.frame(interp2xyz(fld))  # the xy.est parameter (data.frame)
library(ggplot2)
ggplot(fld2, aes(x=x, y=y, z=z)) + geom_contour()  # Right graph (simple example)
`````` 