If you want a linear interpolation so that the surface cross all points, you will not be able to interpolate with a function z = f(x,y)
, except if the dataset has been simulated through this kind of function.
If you are looking for a function z=f(x,y)
that matches your point set, you will have to build a model with GLM or GAM for instance. However, this induces that the surface will not cross all points data and there will be some residuals.
As I use to work with spatial datasets, which means x and y coordinates with a z observation, I will give you some clues in this way.
First, I prepare a dataset for interpolation:
library(rgl)
library(akima)
library(dplyr)
library(tidyr)
data(akima)
data.akima <- as.data.frame(akima)
# data visualisation
rgl.spheres(akima$x, akima$z , akima$y,0.5,color="red")
rgl.bbox()
# Dataset for interpolation
seq_x <- seq(min(akima$x) - 1, max(akima$x) + 1, length.out = 20)
seq_y <- seq(min(akima$y) - 1, max(akima$y) + 1, length.out = 20)
data.pred <- dplyr::full_join(data.frame(x = seq_x, by = 1),
data.frame(y = seq_y, by = 1)) %>%
dplyr::select(-by)
Then, I use your akima interpolation function:
# bivariate linear interpolation
# interp:
akima.li <- interp(akima$x, akima$y, akima$z,
xo=seq_x,
yo=seq_y)
# interp surface:
rgl.surface(akima.li$x,akima.li$y,akima.li$z,color="green",alpha=c(0.5))
rgl.spheres(akima$x, akima$z , akima$y,0.5,color="red")
rgl.bbox()
Using rasters
From now, if you want to get interpolated information on some specific points, you can re-use interp
function or decide to work with a rasterized image. Using rasters, you are then able to increase resolution, and get any spatial position information data.
# Using rasters
library(raster)
r.pred <- raster(akima.li$z, xmn = min(seq_x), xmx = max(seq_x),
ymn = min(seq_y), ymx = max(seq_y))
plot(r.pred)
## Further bilinear interpolations
## Double raster resolution
r.pred.2 <- disaggregate(r.pred, fact = 2, method = "bilinear")
plot(r.pred.2)
Spatial interpolation (inverse distance interpolation or kriging)
When thinking in spatial for interpolation, I first think about kriging. This will smooth your surface, thus it will not cross every data points.
# Spatial inverse distance interpolation
library(sp)
library(gstat)
# Transform data as spatial objects
data.akima.sp <- data.akima
coordinates(data.akima.sp) <- ~x+y
data.pred.sp <- data.pred
coordinates(data.pred.sp) <- ~x+y
# Inverse distance interpolation
# idp is set to 2 as weight for interpolation is :
# w = 1/dist^idp
# nmax is set to 3, so that only the 3 closest points are used for interpolation
pred.idw <- idw(
formula = as.formula("z~1"),
locations = data.akima.sp,
newdata = data.pred.sp,
idp = 2,
nmax = 3)
data.spread.idw <- data.pred %>%
select(-pred) %>%
mutate(idw = pred.idw$var1.pred) %>%
tidyr::spread(key = y, value = idw) %>%
dplyr::select(-x)
surface3d(seq_x, seq_y, as.matrix(data.spread.idw), col = "green")
rgl.spheres(akima$x, akima$y , akima$z, 0.5, color = "red")
rgl.bbox()
Interpolate using gam or glm
However, if you want to find a formula like z = f(x,y)
, you should use GLM or GAM with high degrees of freedom depending on the smooth you hope to see. Another advantage is that you can add other covariates, not only x and y. The model needs to be fitted with a x/y interaction.
Here an example with a simple GAM smooth:
# Approximation with a gam model
library(mgcv)
gam1 <- gam(z ~ te(x, y), data = data.akima)
summary(gam1)
plot(gam1)
data.pred$pred <- predict(gam1, data.pred)
data.spread <- tidyr::spread(data.pred, key = y, value = pred) %>%
dplyr::select(-x)
surface3d(seq_x, seq_y, as.matrix(data.spread), col = "blue")
rgl.spheres(akima$x, akima$y , akima$z, 0.5, color = "red")
rgl.bbox()
Does this answer goes in the right direction for you ?