This actually seems to be a math question, but you also mentioned Python, so I try to give some code. You would usually use trilinear interpolation.

So we assume your grid has the corners `(0.0, 0.0, 0.0)`

and `(max_x, max_y, max_z)`

and is aligned with the coordinate system. We denote the number of cells along each axis by `(n_x, n_y, n_z)`

respectively and the point you wish to evaluate at by `(x, y, z)`

(all of type `float`

). Then your logic might be something similar to

```
a_x = x * n_x / max_x
a_y = y * n_y / max_y
a_z = z * n_z / max_z
i_x = math.floor(a_x)
i_y = math.floor(a_y)
i_z = math.floor(a_z)
l_x = a_x - i_x
l_y = a_y - i_y
l_z = a_z - i_z
```

The indices of the 8 adjacent grid vertices now are `(i_x, i_y, i_z)`

, `(i_x+1, i_y, i_z)`

, `(i_x, i_y+1, i_z)`

, ..., `(i_x+1, i_y+1, i_z+1)`

. The local coordinates of your point within the grid cell are `(l_x, l_y, l_z)`

. Together with the linked Wikipedia article, this should get you going (note that the notation is different there).