Condensed distance matrix to full distance matrix
A condensed distance matrix as returned by pdist can be converted to a full distance matrix by using scipy.spatial.distance.squareform
:
>>> import numpy as np
>>> from scipy.spatial.distance import pdist, squareform
>>> points = np.array([[0,1],[1,1],[3,5], [15, 5]])
>>> dist_condensed = pdist(points)
>>> dist_condensed
array([ 1. , 5. , 15.5241747 , 4.47213595,
14.56021978, 12. ])
Use squareform
to convert to full matrix:
>>> dist = squareform(dist_condensed)
array([[ 0. , 1. , 5. , 15.5241747 ],
[ 1. , 0. , 4.47213595, 14.56021978],
[ 5. , 4.47213595, 0. , 12. ],
[ 15.5241747 , 14.56021978, 12. , 0. ]])
Distance between point i,j is stored in dist[i, j]:
>>> dist[2, 0]
5.0
>>> np.linalg.norm(points[2] - points[0])
5.0
Indices to condensed index
One can convert indices used for accessing the elements of the square matrix to the index in the condensed matrix:
def square_to_condensed(i, j, n):
assert i != j, "no diagonal elements in condensed matrix"
if i < j:
i, j = j, i
return n*j - j*(j+1)//2 + i - 1 - j
Example:
>>> square_to_condensed(1, 2, len(points))
3
>>> dist_condensed[3]
4.4721359549995796
>>> dist[1,2]
4.4721359549995796
Condensed index to indices
Also the other direction is possible without sqaureform which is better in terms of runtime and memory consumption:
import math
def calc_row_idx(k, n):
return int(math.ceil((1/2.) * (- (-8*k + 4 *n**2 -4*n - 7)**0.5 + 2*n -1) - 1))
def elem_in_i_rows(i, n):
return i * (n - 1 - i) + (i*(i + 1))//2
def calc_col_idx(k, i, n):
return int(n - elem_in_i_rows(i + 1, n) + k)
def condensed_to_square(k, n):
i = calc_row_idx(k, n)
j = calc_col_idx(k, i, n)
return i, j
Example:
>>> condensed_to_square(3, 4)
(1.0, 2.0)
Runtime comparison with squareform
>>> import numpy as np
>>> from scipy.spatial.distance import pdist, squareform
>>> points = np.random.random((10**4,3))
>>> %timeit dist_condensed = pdist(points)
1 loops, best of 3: 555 ms per loop
Creating the sqaureform turns out to be really slow:
>>> dist_condensed = pdist(points)
>>> %timeit dist = squareform(dist_condensed)
1 loops, best of 3: 2.25 s per loop
If we are searching two points with maximum distance it is not surprising that searching in full matrix is O(n) while in condensed form only O(n/2):
>>> dist = squareform(dist_condensed)
>>> %timeit dist_condensed.argmax()
10 loops, best of 3: 45.2 ms per loop
>>> %timeit dist.argmax()
10 loops, best of 3: 93.3 ms per loop
Getting the inideces for the two points takes almost no time in both cases but of course there is some overhead for calculating the condensed index:
>>> idx_flat = dist.argmax()
>>> idx_condensed = dist.argmax()
>>> %timeit list(np.unravel_index(idx_flat, dist.shape))
100000 loops, best of 3: 2.28 µs per loop
>>> %timeit condensed_to_square(idx_condensed, len(points))
100000 loops, best of 3: 14.7 µs per loop