kbarbary/refine_ellipsoids.py

## refine_ellipsoids.py
def ellipsoid_dist_sq(x, ell):
    """Return the square of each point's distance from the ellipsoid center,
    relative to ellipsoid boundary.

    Refered to in Feroz, Hobson & Bridges (2009) as the Mahalanobis distance.

    Parameters
    ----------
    x : `~numpy.ndarray`
        Points, array with shape (npoints, ndim).
    ell : Ellipsoid
        Ellipsoid to compare to.
    """

    delta = x - ell.ctr

    # fast way to compute delta[i] @ A @ delta[i] for all i.
    return np.einsum('...i, ...i', np.tensordot(delta, ell.a, axes=1), delta)


def refine_ellipsoids(x, label, pointvol, xs, ells):
    """Reassign points between two clusters so as to minimize total volume
    of the ellipsoids bounding each cluster.

    This is as described in Feroz, Hobson & Bridges (2009), Algorithm 1.
    There, the distance measure is referred to as the "Mahalanobis distance".

    Parameters
    ----------
    x : `~numpy.ndarray`
        All points in either cluster.
    label : `~numpy.ndarray`
        1-d integer array of 0 or 1 giving cluster membership of each point
        in x.
    pointvol : float
        Expected volume corresponding to each point.
    """

    hs = [None, None]
    ndim = x.shape[1]
    for it in range(10):  # limit to 10 iterations
        for k in (0, 1):
            hs[k] = ellipsoid_dist_sq(x, ells[k])
            hs[k] *= ells[k].vol / (len(xs[k]) * pointvol) # actual/expected vol

        # reassign each point to the cluster that gives it the smallest h.
        #     if hs[1] < hs[0] -> True -> (cast to int) -> 1  (label cluster 1)
        #     if hs[0] < hs[1] -> False -> (cast to int) -> 0 (label cluster 0)
        newlabel = (hs[1] < hs[0]).astype(np.int)

        # If no points were reassigned, exit the loop.
        if np.all(newlabel == label):
            break

        # update labels, calculate new member points
        label = newlabel
        new_xs = [x[label == k, :] for k in (0, 1)]

        # if either cluster doesn't have enough points, return previous
        # clusters
        if new_xs[0].shape[0] <= ndim or new_xs[1].shape[0] <= ndim:
            return xs, ells

        for k in (0, 1):
            xs[k] = new_xs[k]
            ells[k] = bounding_ellipsoid(xs[k], pointvol=pointvol,
                                         minvol=True)
	def ellipsoid_dist_sq(x, ell):
	"""Return the square of each point's distance from the ellipsoid center,
	relative to ellipsoid boundary.

	Refered to in Feroz, Hobson & Bridges (2009) as the Mahalanobis distance.

	Parameters
	----------
	x : `~numpy.ndarray`
	Points, array with shape (npoints, ndim).
	ell : Ellipsoid
	Ellipsoid to compare to.
	"""

	delta = x - ell.ctr

	# fast way to compute delta[i] @ A @ delta[i] for all i.
	return np.einsum('...i, ...i', np.tensordot(delta, ell.a, axes=1), delta)


	def refine_ellipsoids(x, label, pointvol, xs, ells):
	"""Reassign points between two clusters so as to minimize total volume
	of the ellipsoids bounding each cluster.

	This is as described in Feroz, Hobson & Bridges (2009), Algorithm 1.
	There, the distance measure is referred to as the "Mahalanobis distance".

	Parameters
	----------
	x : `~numpy.ndarray`
	All points in either cluster.
	label : `~numpy.ndarray`
	1-d integer array of 0 or 1 giving cluster membership of each point
	in x.
	pointvol : float
	Expected volume corresponding to each point.
	"""

	hs = [None, None]
	ndim = x.shape[1]
	for it in range(10): # limit to 10 iterations
	for k in (0, 1):
	hs[k] = ellipsoid_dist_sq(x, ells[k])
	hs[k] = ells[k].vol / (len(xs[k]) pointvol) # actual/expected vol

	# reassign each point to the cluster that gives it the smallest h.
	# if hs[1] < hs[0] -> True -> (cast to int) -> 1 (label cluster 1)
	# if hs[0] < hs[1] -> False -> (cast to int) -> 0 (label cluster 0)
	newlabel = (hs[1] < hs[0]).astype(np.int)

	# If no points were reassigned, exit the loop.
	if np.all(newlabel == label):
	break

	# update labels, calculate new member points
	label = newlabel
	new_xs = [x[label == k, :] for k in (0, 1)]

	# if either cluster doesn't have enough points, return previous
	# clusters
	if new_xs[0].shape[0] <= ndim or new_xs[1].shape[0] <= ndim:
	return xs, ells

	for k in (0, 1):
	xs[k] = new_xs[k]
	ells[k] = bounding_ellipsoid(xs[k], pointvol=pointvol,
	minvol=True)