As an illustration of the `uniformly`

package, we will
show how to uniformly sample some points in a convex hull.

We give an illustration in dimension 3 (in dimension 2, use the
function `runif_in_polygon`

).

Let’s store the vertices of an icosahedron in a matrix
`vs`

:

```
vs <- t(rgl::icosahedron3d()$vb[1:3,])
head(vs)
#> [,1] [,2] [,3]
#> [1,] 0.000000 0.618034 1
#> [2,] 0.000000 0.618034 -1
#> [3,] 0.000000 -0.618034 1
#> [4,] 0.000000 -0.618034 -1
#> [5,] 0.618034 1.000000 0
#> [6,] 0.618034 -1.000000 0
```

The icosahedron is convex, therefore its convex hull is itself.

The `delaunayn`

function of the `geometry`

package calculates a “triangulation” (*tetrahedralization* in
dimension 3) of the convex hull of a set of points. We use it to get a
tetrahedralization of our icoshaedron:

```
library(geometry)
tetrahedra <- delaunayn(vs, options="Qz")
head(tetrahedra)
#> [,1] [,2] [,3] [,4]
#> [1,] 6 1 5 9
#> [2,] 6 3 1 9
#> [3,] 6 3 1 10
#> [4,] 6 12 4 2
#> [5,] 6 11 4 2
#> [6,] 6 11 5 9
```

Each row of the `tetrahedra`

matrix is a vector of four
identifiers of the vertices defining a tetrahedron.

Now, we calculate the volumes of each of these tetrahedra with the
`volume_tetrahedron`

function:

```
library(uniformly)
volumes <-
apply(tetrahedra, 1,
function(t){
volume_tetrahedron(vs[t[1],], vs[t[2],], vs[t[3],], vs[t[4],])
})
```

We normalize the volumes:

Now, here is the algorithm to uniformly sample a point in the icosahedron:

select a tetrahedron at random, with probability given by the normalized volumes;

uniformly sample a point in the picked tetrahedron.

That is:

```
i <- sample.int(nrow(tetrahedra), 1, prob=probs)
th <- tetrahedra[i,]
runif_in_tetrahedron(1, vs[th[1],], vs[th[2],], vs[th[3],], vs[th[4],])
#> [,1] [,2] [,3]
#> [1,] 0.5873218 0.7819155 -0.1332604
```

Let’s use the algorithm to sample 100 random points:

```
nsims <- 100
sims <- matrix(NA_real_, nrow=nsims, ncol=3)
for(k in 1:nsims){
th <- tetrahedra[sample.int(nrow(tetrahedra), 1, prob=probs),]
sims[k,] <- runif_in_tetrahedron(1, vs[th[1],], vs[th[2],], vs[th[3],], vs[th[4],])
}
```

```
library(rgl)
open3d(windowRect=c(100,100,600,600))
#> wgl
#> 1
shade3d(icosahedron3d(), color="red", alpha=0.3)
points3d(sims)
rglwidget()
```

We can proceed in the same way in higher dimension, using the
functions `volume_simplex`

and `runif_in_simplex`

instead of the functions `volume_tetrahedron`

and
`runif_in_tetrahedron`

.

Note that the convexity is not the *sine qua non* condition to
apply the above procedure: the ingredient we need is the “triangulation”
of the object. We took a convex shape because `delaunayn`

provides the triangulation of a convex shape.

Let’s give an example for a 3D star. Here is the star:

```
vs <- rbind(
c(7.889562, 1.150329, -2.173651),
c(2.212808, 1.150329, -2.230414),
c(0.068023, 1.150328, -7.923502),
c(-2.151306, 1.150329, -2.254857),
c(-7.817406, 1.150328, -2.261558),
c(-3.523133, 1.150328, 1.888122),
c(-4.869315, 1.150328, 6.987552),
c(-0.006854, 1.150329, 4.473047),
c(4.838127, 1.150328, 7.041885),
c(3.538153, 1.150329, 1.927652),
c(0.033757, 0.000000, -0.314657),
c(0.035668, 2.269531, -0.312831)
)
faces <- rbind(
c(1, 11, 2),
c(2, 11, 3),
c(3, 11, 4),
c(4, 11, 5),
c(5, 11, 6),
c(6, 11, 7),
c(7, 11, 8),
c(8, 11, 9),
c(9, 11, 10),
c(10, 11, 1),
c(1, 12, 10),
c(10, 12, 9),
c(9, 12, 8),
c(8, 12, 7),
c(7, 12, 6),
c(6, 12, 5),
c(5, 12, 4),
c(4, 12, 3),
c(3, 12, 2),
c(2, 12, 1)
)
open3d(windowRect=c(100,100,600,600))
#> wgl
#> 2
for(i in 1:nrow(faces)){
triangles3d(rbind(
vs[faces[i,1],],
vs[faces[i,2],],
vs[faces[i,3],]),
color="red", alpha=0.4)
}
rglwidget()
```

This star is not convex but it is star-shaped with respect to its centroid, and its faces are triangular. Therefore we get a tetrahedralization by joining the centroid to each of the triangular faces.

Let’s calculate the volumes of these tetrahedra:

```
centroid <- colMeans(vs)
volumes <- apply(faces, 1,function(f){
volume_tetrahedron(vs[f[1],], vs[f[2],], vs[f[3],], centroid)
})
probs <- volumes/sum(volumes)
```

Now we pick a face at random, with probability given by the normalized volumes, and we sample in the corresponding tetrahedron:

```
nsims <- 500
sims <- matrix(NA_real_, nrow=nsims, ncol=3)
for(k in 1:nsims){
f <- faces[sample.int(nrow(faces), 1, prob=probs),]
sims[k,] <- runif_in_tetrahedron(1, vs[f[1],], vs[f[2],], vs[f[3],], centroid)
}
```

And now, let’s add the sampled points: