mvpa2.measures.rsa.squareform¶
-
mvpa2.measures.rsa.
squareform
(X, force='no', checks=True)¶ Converts a vector-form distance vector to a square-form distance matrix, and vice-versa.
Parameters: X : ndarray
Either a condensed or redundant distance matrix.
force : str, optional
As with MATLAB(TM), if force is equal to ‘tovector’ or ‘tomatrix’, the input will be treated as a distance matrix or distance vector respectively.
checks : bool, optional
If
checks
is set to False, no checks will be made for matrix symmetry nor zero diagonals. This is useful if it is known thatX - X.T1
is small anddiag(X)
is close to zero. These values are ignored any way so they do not disrupt the squareform transformation.Returns: Y : ndarray
If a condensed distance matrix is passed, a redundant one is returned, or if a redundant one is passed, a condensed distance matrix is returned.
Notes
v = squareform(X)
Given a square d-by-d symmetric distance matrix X,
v=squareform(X)
returns ad * (d-1) / 2
(or${n choose 2}$
) sized vector v.
v[{n choose 2}-{n-i choose 2} + (j-i-1)] is the distance between points i and j. If X is non-square or asymmetric, an error is returned.- X = squareform(v)
Given a d*d(-1)/2 sized v for some integer d>=2 encoding distances as described, X=squareform(v) returns a d by d distance matrix X. The X[i, j] and X[j, i] values are set to v[{n choose 2}-{n-i choose 2} + (j-u-1)] and all diagonal elements are zero.