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# MDAnalysis: A Toolkit for the Analysis of Molecular Dynamics Simulations.
# J. Comput. Chem. 32 (2011), 2319--2327, doi:10.1002/jcc.21787
#
"""
=================================================================================
Ensemble Similarity Calculations --- :mod:`MDAnalysis.analysis.encore.similarity`
=================================================================================
:Author: Matteo Tiberti, Wouter Boomsma, Tone Bengtsen
.. versionadded:: 0.16.0
The module contains implementations of similarity measures between protein
ensembles described in :cite:p:`b-LindorffLarsen2009`. The implementation and
examples are described in :cite:p:`b-Tiberti2015`.
The module includes facilities for handling ensembles and trajectories through
the :class:`Universe` class, performing clustering or dimensionality reduction
of the ensemble space, estimating multivariate probability distributions from
the input data, and more. ENCORE can be used to compare experimental and
simulation-derived ensembles, as well as estimate the convergence of
trajectories from time-dependent simulations.
ENCORE includes three different methods for calculations of similarity measures
between ensembles implemented in individual functions:
+ **Harmonic Ensemble Similarity** : :func:`hes`
+ **Clustering Ensemble Similarity** : :func:`ces`
+ **Dimensional Reduction Ensemble Similarity** : :func:`dres`
as well as two methods to evaluate the convergence of trajectories:
+ **Clustering based convergence evaluation** : :func:`ces_convergence`
+ **Dimensionality-reduction based convergence evaluation** : :func:`dres_convergence`
When using this module in published work please cite :cite:p:`b-Tiberti2015`.
.. rubric:: References
.. bibliography::
:filter: False
:style: MDA
:keyprefix: b-
:labelprefix: ᵇ
Tiberti2015
LindorffLarsen2009
.. _Examples:
Examples
========
The examples show how to use ENCORE to calculate a similarity measurement
of two simple ensembles. The ensembles are obtained from the MDAnalysis
test suite for two different simulations of the protein AdK.
To calculate the Harmonic Ensemble Similarity (:func:`hes`)
two ensemble objects are first created and then used for calculation:
>>> from MDAnalysis import Universe
>>> import MDAnalysis.analysis.encore as encore
>>> from MDAnalysis.tests.datafiles import PSF, DCD, DCD2
>>> ens1 = Universe(PSF, DCD)
>>> ens2 = Universe(PSF, DCD2)
>>> HES, details = encore.hes([ens1, ens2])
>>> print(HES)
[[ 0. 38279540.04524205]
[38279540.04524205 0. ]]
HES can assume any non-negative value, i.e. no upper bound exists and the
measurement can therefore be used as an absolute scale.
The calculation of the Clustering Ensemble Similarity (:func:`ces`)
is computationally more expensive. It is based on clustering algorithms that in
turn require a similarity matrix between the frames the ensembles are made
of. The similarity matrix is derived from a distance matrix (By default a RMSD
matrix; a full RMSD matrix between each pairs of elements needs to be computed).
The RMSD matrix is automatically calculated:
>>> from MDAnalysis import Universe
>>> import MDAnalysis.analysis.encore as encore
>>> from MDAnalysis.tests.datafiles import PSF, DCD, DCD2
>>> ens1 = Universe(PSF, DCD)
>>> ens2 = Universe(PSF, DCD2)
>>> CES, details = encore.ces([ens1, ens2])
>>> print(CES)
[[0. 0.68070702]
[0.68070702 0. ]]
The RMSD matrix can also be separately calculated to reuse it, e.g. for running
CES with different parameters or running the
Dimensional Reduction Ensemble Similarity (:func:`dres`) method.
DRES is based on the estimation of the probability density in
a dimensionally-reduced conformational space of the ensembles, obtained from
the original space using either the Stochastic Proximity Embedding algorithm or
the Principal Component Analysis.
In the following example the dimensions are reduced to 3 using the
RMSD matrix and the default SPE dimensional reduction method:
>>> from MDAnalysis import Universe
>>> import MDAnalysis.analysis.encore as encore
>>> from MDAnalysis.tests.datafiles import PSF, DCD, DCD2
>>> ens1 = Universe(PSF, DCD)
>>> ens2 = Universe(PSF, DCD2)
>>> rmsd_matrix = encore.get_distance_matrix(
... encore.utils.merge_universes([ens1, ens2]))
>>> DRES,details = encore.dres([ens1, ens2],
... distance_matrix = rmsd_matrix)
The RMSD matrix can also be saved on disk with the option ``save_matrix``: ::
rmsd_matrix = encore.get_distance_matrix(
encore.utils.merge_universes([ens1, ens2]),
save_matrix="rmsd.npz")
It can then be loaded and reused at a later time instead of being recalculated: ::
rmsd_matrix = encore.get_distance_matrix(
encore.utils.merge_universes([ens1, ens2]),
load_matrix="rmsd.npz")
In addition to the quantitative similarity estimate, the dimensional reduction
can easily be visualized, see the ``Example`` section in
:mod:`MDAnalysis.analysis.encore.dimensionality_reduction.reduce_dimensionality`.
Due to the stochastic nature of SPE, two identical ensembles will not
necessarily result in an exactly 0 estimate of the similarity, but will be very
close. For the same reason, calculating the similarity with the :func:`dres`
twice will not result in necessarily identical values but rather two very close
values.
It should be noted that both in :func:`ces` and :func:`dres` the similarity is
evaluated using the Jensen-Shannon divergence resulting in an upper bound of
ln(2), which indicates no similarity between the ensembles and a lower bound
of 0.0 signifying two identical ensembles. In contrast, the :func:`hes` function uses
a symmetrized version of the Kullback-Leibler divergence, which is unbounded.
Functions for ensemble comparisons
==================================
.. autofunction:: hes
:noindex:
.. autofunction:: ces
:noindex:
.. autofunction:: dres
:noindex:
Function reference
==================
.. All functions are included via automodule :members:.
"""
import warnings
import logging
import numpy as np
import scipy.stats
import MDAnalysis as mda
from ...coordinates.memory import MemoryReader
from .confdistmatrix import get_distance_matrix
from .bootstrap import (get_distance_matrix_bootstrap_samples,
get_ensemble_bootstrap_samples)
from .clustering.cluster import cluster
from .clustering.ClusteringMethod import AffinityPropagationNative
from .dimensionality_reduction.DimensionalityReductionMethod import (
StochasticProximityEmbeddingNative)
from .dimensionality_reduction.reduce_dimensionality import (
reduce_dimensionality)
from .covariance import (
covariance_matrix, ml_covariance_estimator, shrinkage_covariance_estimator)
from .utils import merge_universes
from .utils import trm_indices_diag, trm_indices_nodiag
# Low boundary value for log() argument - ensure no nans
EPSILON = 1E-15
xlogy = np.vectorize(
lambda x, y: 0.0 if (x <= EPSILON and y <= EPSILON) else x * np.log(y))
[docs]def discrete_kullback_leibler_divergence(pA, pB):
"""Kullback-Leibler divergence between discrete probability distribution.
Notice that since this measure is not symmetric ::
:math:`d_{KL}(p_A,p_B) != d_{KL}(p_B,p_A)`
Parameters
----------
pA : iterable of floats
First discrete probability density function
pB : iterable of floats
Second discrete probability density function
Returns
-------
dkl : float
Discrete Kullback-Liebler divergence
"""
return np.sum(xlogy(pA, pA / pB))
# discrete dJS
[docs]def discrete_jensen_shannon_divergence(pA, pB):
"""Jensen-Shannon divergence between discrete probability distributions.
Parameters
----------
pA : iterable of floats
First discrete probability density function
pB : iterable of floats
Second discrete probability density function
Returns
-------
djs : float
Discrete Jensen-Shannon divergence
"""
return 0.5 * (discrete_kullback_leibler_divergence(pA, (pA + pB) * 0.5) +
discrete_kullback_leibler_divergence(pB, (pA + pB) * 0.5))
# calculate harmonic similarity
[docs]def harmonic_ensemble_similarity(sigma1,
sigma2,
x1,
x2):
"""
Calculate the harmonic ensemble similarity measure
as defined in :cite:p:`b-Tiberti2015`.
Parameters
----------
sigma1 : numpy.array
Covariance matrix for the first ensemble.
sigma2 : numpy.array
Covariance matrix for the second ensemble.
x1: numpy.array
Mean for the estimated normal multivariate distribution of the first
ensemble.
x2: numpy.array
Mean for the estimated normal multivariate distribution of the second
ensemble.
Returns
-------
dhes : float
harmonic similarity measure
"""
# Inverse covariance matrices
sigma1_inv = np.linalg.pinv(sigma1)
sigma2_inv = np.linalg.pinv(sigma2)
# Difference between average vectors
d_avg = x1 - x2
# Distance measure
trace = np.trace(np.dot(sigma1, sigma2_inv) +
np.dot(sigma2, sigma1_inv)
- 2 * np.identity(sigma1.shape[0]))
d_hes = 0.25 * (np.dot(np.transpose(d_avg),
np.dot(sigma1_inv + sigma2_inv,
d_avg)) + trace)
return d_hes
[docs]def clustering_ensemble_similarity(cc, ens1, ens1_id, ens2, ens2_id,
select="name CA"):
"""Clustering ensemble similarity: calculate the probability densities from
the clusters and calculate discrete Jensen-Shannon divergence.
Parameters
----------
cc : encore.clustering.ClustersCollection
Collection from cluster calculated by a clustering algorithm
(e.g. Affinity propagation)
ens1 : :class:`~MDAnalysis.core.universe.Universe`
First ensemble to be used in comparison
ens1_id : int
First ensemble id as detailed in the ClustersCollection metadata
ens2 : :class:`~MDAnalysis.core.universe.Universe`
Second ensemble to be used in comparison
ens2_id : int
Second ensemble id as detailed in the ClustersCollection metadata
select : str
Atom selection string in the MDAnalysis format. Default is "name CA".
Returns
-------
djs : float
Jensen-Shannon divergence between the two ensembles, as calculated by
the clustering ensemble similarity method
"""
ens1_coordinates = ens1.trajectory.timeseries(ens1.select_atoms(select),
order='fac')
ens2_coordinates = ens2.trajectory.timeseries(ens2.select_atoms(select),
order='fac')
tmpA = np.array([np.where(c.metadata['ensemble_membership'] == ens1_id)[
0].shape[0] / float(ens1_coordinates.shape[0]) for
c in cc])
tmpB = np.array([np.where(c.metadata['ensemble_membership'] == ens2_id)[
0].shape[0] / float(ens2_coordinates.shape[0]) for
c in cc])
# Exclude clusters which have 0 elements in both ensembles
pA = tmpA[tmpA + tmpB > EPSILON]
pB = tmpB[tmpA + tmpB > EPSILON]
return discrete_jensen_shannon_divergence(pA, pB)
[docs]def cumulative_clustering_ensemble_similarity(cc, ens1_id, ens2_id,
ens1_id_min=1, ens2_id_min=1):
"""
Calculate clustering ensemble similarity between joined ensembles.
This means that, after clustering has been performed, some ensembles are
merged and the dJS is calculated between the probability distributions of
the two clusters groups. In particular, the two ensemble groups are defined
by their ensembles id: one of the two joined ensembles will comprise all
the ensembles with id [ens1_id_min, ens1_id], and the other ensembles will
comprise all the ensembles with id [ens2_id_min, ens2_id].
Parameters
----------
cc : encore.ClustersCollection
Collection from cluster calculated by a clustering algorithm
(e.g. Affinity propagation)
ens1_id : int
First ensemble id as detailed in the ClustersCollection
metadata
ens2_id : int
Second ensemble id as detailed in the ClustersCollection
metadata
Returns
-------
djs : float
Jensen-Shannon divergence between the two ensembles, as
calculated by the clustering ensemble similarity method
"""
ensA = [np.where(np.logical_and(
c.metadata['ensemble_membership'] <= ens1_id,
c.metadata['ensemble_membership'])
>= ens1_id_min)[0].shape[0] for c in cc]
ensB = [np.where(np.logical_and(
c.metadata['ensemble_membership'] <= ens2_id,
c.metadata['ensemble_membership'])
>= ens2_id_min)[0].shape[0] for c in cc]
sizeA = float(np.sum(ensA))
sizeB = float(np.sum(ensB))
tmpA = np.array(ensA) / sizeA
tmpB = np.array(ensB) / sizeB
# Exclude clusters which have 0 elements in both ensembles
pA = tmpA[tmpA + tmpB > EPSILON]
pB = tmpB[tmpA + tmpB > EPSILON]
return discrete_jensen_shannon_divergence(pA, pB)
[docs]def gen_kde_pdfs(embedded_space, ensemble_assignment, nensembles,
nsamples):
"""
Generate Kernel Density Estimates (KDE) from embedded spaces and
elaborate the coordinates for later use.
Parameters
----------
embedded_space : numpy.array
Array containing the coordinates of the embedded space
ensemble_assignment : numpy.array
Array containing one int per ensemble conformation. These allow to
distinguish, in the complete embedded space, which conformations
belong to each ensemble. For instance if ensemble_assignment
is [1,1,1,1,2,2], it means that the first four conformations belong
to ensemble 1 and the last two to ensemble 2
nensembles : int
Number of ensembles
nsamples : int
samples to be drawn from the ensembles. Will be required in
a later stage in order to calculate dJS.
Returns
-------
kdes : scipy.stats.gaussian_kde
KDEs calculated from ensembles
resamples : list of numpy.array
For each KDE, draw samples according to the probability distribution
of the KDE mixture model
embedded_ensembles : list of numpy.array
List of numpy.array containing, each one, the elements of the
embedded space belonging to a certain ensemble
"""
kdes = []
embedded_ensembles = []
resamples = []
for i in range(1, nensembles + 1):
this_embedded = embedded_space.transpose()[
np.where(np.array(ensemble_assignment) == i)].transpose()
embedded_ensembles.append(this_embedded)
kdes.append(scipy.stats.gaussian_kde(this_embedded))
# # Set number of samples
# if not nsamples:
# nsamples = this_embedded.shape[1] * 10
# Resample according to probability distributions
for this_kde in kdes:
resamples.append(this_kde.resample(nsamples))
return (kdes, resamples, embedded_ensembles)
[docs]def dimred_ensemble_similarity(kde1, resamples1, kde2, resamples2,
ln_P1_exp_P1=None, ln_P2_exp_P2=None,
ln_P1P2_exp_P1=None, ln_P1P2_exp_P2=None):
r"""Calculate the Jensen-Shannon divergence according the Dimensionality
reduction method.
In this case, we have continuous probability densities, this we need to
integrate over the measurable space. The aim is to first calculate the
Kullback-Liebler divergence, which is defined as:
.. math::
D_{KL}(P(x) || Q(x)) =
\int_{-\infty}^{\infty}P(x_i) ln(P(x_i)/Q(x_i)) =
\langle{}ln(P(x))\rangle{}_P - \langle{}ln(Q(x))\rangle{}_P
where the :math:`\langle{}.\rangle{}_P` denotes an expectation calculated
under the distribution P. We can, thus, just estimate the expectation
values of the components to get an estimate of dKL. Since the
Jensen-Shannon distance is actually more complex, we need to estimate four
expectation values:
.. math::
\langle{}log(P(x))\rangle{}_P
\langle{}log(Q(x))\rangle{}_Q
\langle{}log(0.5*(P(x)+Q(x)))\rangle{}_P
\langle{}log(0.5*(P(x)+Q(x)))\rangle{}_Q
Parameters
----------
kde1 : scipy.stats.gaussian_kde
Kernel density estimation for ensemble 1
resamples1 : numpy.array
Samples drawn according do kde1. Will be used as samples to
calculate the expected values according to 'P' as detailed before.
kde2 : scipy.stats.gaussian_kde
Kernel density estimation for ensemble 2
resamples2 : numpy.array
Samples drawn according do kde2. Will be used as sample to
calculate the expected values according to 'Q' as detailed before.
ln_P1_exp_P1 : float or None
Use this value for :math:`\langle{}log(P(x))\rangle{}_P`; if ``None``,
calculate it instead
ln_P2_exp_P2 : float or None
Use this value for :math:`\langle{}log(Q(x))\rangle{}_Q`; if
``None``, calculate it instead
ln_P1P2_exp_P1 : float or None
Use this value for
:math:`\langle{}log(0.5*(P(x)+Q(x)))\rangle{}_P`;
if ``None``, calculate it instead
ln_P1P2_exp_P2 : float or None
Use this value for
:math:`\langle{}log(0.5*(P(x)+Q(x)))\rangle{}_Q`;
if ``None``, calculate it instead
Returns
-------
djs : float
Jensen-Shannon divergence calculated according to the dimensionality
reduction method
"""
if not ln_P1_exp_P1 and not ln_P2_exp_P2 and not ln_P1P2_exp_P1 and not \
ln_P1P2_exp_P2:
ln_P1_exp_P1 = np.average(np.log(kde1.evaluate(resamples1)))
ln_P2_exp_P2 = np.average(np.log(kde2.evaluate(resamples2)))
ln_P1P2_exp_P1 = np.average(np.log(
0.5 * (kde1.evaluate(resamples1) + kde2.evaluate(resamples1))))
ln_P1P2_exp_P2 = np.average(np.log(
0.5 * (kde1.evaluate(resamples2) + kde2.evaluate(resamples2))))
return 0.5 * (
ln_P1_exp_P1 - ln_P1P2_exp_P1 + ln_P2_exp_P2 - ln_P1P2_exp_P2)
[docs]def cumulative_gen_kde_pdfs(embedded_space, ensemble_assignment, nensembles,
nsamples, ens_id_min=1, ens_id_max=None):
"""
Generate Kernel Density Estimates (KDE) from embedded spaces and
elaborate the coordinates for later use. However, consider more than
one ensemble as the space on which the KDE will be generated. In
particular, will use ensembles with ID [ens_id_min, ens_id_max].
Parameters
----------
embedded_space : numpy.array
Array containing the coordinates of the embedded space
ensemble_assignment : numpy.array
array containing one int per ensemble conformation. These allow
to distinguish, in the complete embedded space, which
conformations belong to each ensemble. For instance if
ensemble_assignment is [1,1,1,1,2,2], it means that the first
four conformations belong to ensemble 1 and the last two
to ensemble 2
nensembles : int
Number of ensembles
nsamples : int
Samples to be drawn from the ensembles. Will be required in a later
stage in order to calculate dJS.
ens_id_min : int
Minimum ID of the ensemble to be considered; see description
ens_id_max : int
Maximum ID of the ensemble to be considered; see description. If None,
it will be set to the maximum possible value given the number of
ensembles.
Returns
-------
kdes : scipy.stats.gaussian_kde
KDEs calculated from ensembles
resamples : list of numpy.array
For each KDE, draw samples according to the probability
distribution of the kde mixture model
embedded_ensembles : list of numpy.array
List of numpy.array containing, each one, the elements of the
embedded space belonging to a certain ensemble
"""
kdes = []
embedded_ensembles = []
resamples = []
if not ens_id_max:
ens_id_max = nensembles + 1
for i in range(ens_id_min, ens_id_max):
this_embedded = embedded_space.transpose()[np.where(
np.logical_and(ensemble_assignment >= ens_id_min,
ensemble_assignment <= i))].transpose()
embedded_ensembles.append(this_embedded)
kdes.append(scipy.stats.gaussian_kde(this_embedded))
# Resample according to probability distributions
for this_kde in kdes:
resamples.append(this_kde.resample(nsamples))
return (kdes, resamples, embedded_ensembles)
[docs]def write_output(matrix, base_fname=None, header="", suffix="",
extension="dat"):
"""
Write output matrix with a nice format, to stdout and optionally a file.
Parameters
----------
matrix : encore.utils.TriangularMatrix
Matrix containing the values to be printed
base_fname : str
Basic filename for output. If None, no files will be written, and
the matrix will be just printed on standard output
header : str
Text to be written just before the matrix
suffix : str
String to be concatenated to basename, in order to get the final
file name
extension : str
Extension for the output file
"""
if base_fname is not None:
fname = base_fname + "-" + suffix + "." + extension
else:
fname = None
matrix.square_print(header=header, fname=fname)
[docs]def prepare_ensembles_for_convergence_increasing_window(ensemble,
window_size,
select="name CA"):
"""
Generate ensembles to be fed to ces_convergence or dres_convergence
from a single ensemble. Basically, the different slices the algorithm
needs are generated here.
Parameters
----------
ensemble : :class:`~MDAnalysis.core.universe.Universe` object
Input ensemble
window_size : int
size of the window (in number of frames) to be used
select : str
Atom selection string in the MDAnalysis format. Default is "name CA"
Returns
-------
tmp_ensembles :
The original ensemble is divided into different ensembles, each being
a window_size-long slice of the original ensemble. The last
ensemble will be bigger if the length of the input ensemble
is not exactly divisible by window_size.
"""
ens_size = ensemble.trajectory.timeseries(ensemble.select_atoms(select),
order='fac').shape[0]
rest_slices = ens_size // window_size
residuals = ens_size % window_size
slices_n = [0]
tmp_ensembles = []
for rs in range(rest_slices - 1):
slices_n.append(slices_n[-1] + window_size)
slices_n.append(slices_n[-1] + residuals + window_size)
for s,sl in enumerate(slices_n[:-1]):
tmp_ensembles.append(mda.Universe(
ensemble.filename,
ensemble.trajectory.timeseries(order='fac')
[slices_n[s]:slices_n[s + 1], :, :],
format=MemoryReader))
return tmp_ensembles
[docs]def hes(ensembles,
select="name CA",
cov_estimator="shrinkage",
weights='mass',
align=False,
estimate_error=False,
bootstrapping_samples=100,
calc_diagonal=False):
r"""Calculates the Harmonic Ensemble Similarity (HES) between ensembles.
The HES is calculated with the symmetrized version of Kullback-Leibler
divergence as described in :cite:p:`b-Tiberti2015`.
Parameters
----------
ensembles : list
List of Universe objects for similarity measurements.
select : str, optional
Atom selection string in the MDAnalysis format. Default is "name CA"
cov_estimator : str, optional
Covariance matrix estimator method, either shrinkage, `shrinkage`,
or Maximum Likelyhood, `ml`. Default is shrinkage.
weights : str/array_like, optional
specify optional weights. If ``mass`` then chose masses of ensemble atoms
align : bool, optional
Whether to align the ensembles before calculating their similarity.
Note: this changes the ensembles in-place, and will thus leave your
ensembles in an altered state.
(default is False)
estimate_error : bool, optional
Whether to perform error estimation (default is False).
bootstrapping_samples : int, optional
Number of times the similarity matrix will be bootstrapped (default
is 100), only if estimate_error is True.
calc_diagonal : bool, optional
Whether to calculate the diagonal of the similarity scores
(i.e. the similarities of every ensemble against itself).
If this is False (default), 0.0 will be used instead.
Returns
-------
hes, details : numpy.array, dictionary
Harmonic similarity measurements between each pair of ensembles,
and dict containing mean and covariance matrix for each ensemble
Notes
-----
The method assumes that each ensemble is derived from a multivariate normal
distribution. The mean and covariance matrix are, thus, estimatated from
the distribution of each ensemble and used for comparision by the
symmetrized version of Kullback-Leibler divergence defined as:
.. math::
D_{KL}(P(x) || Q(x)) =
\int_{-\infty}^{\infty}P(x_i) ln(P(x_i)/Q(x_i)) =
\langle{}ln(P(x))\rangle{}_P - \langle{}ln(Q(x))\rangle{}_P
where the :math:`\langle{}.\rangle{}_P` denotes an expectation
calculated under the distribution :math:`P`.
For each ensemble, the mean conformation is estimated as the average over
the ensemble, and the covariance matrix is calculated by default using a
shrinkage estimation method (or by a maximum-likelihood method,
optionally).
Note that the symmetrized version of the Kullback-Leibler divergence has no
upper bound (unlike the Jensen-Shannon divergence used by for instance CES and DRES).
When using this similarity measure, consider whether you want to align
the ensembles first (see example below).
Example
-------
To calculate the Harmonic Ensemble similarity, two ensembles are created
as Universe objects from a topology file and two trajectories. The
topology- and trajectory files used are obtained from the MDAnalysis
test suite for two different simulations of the protein AdK.
You can use the ``align=True`` option to align the ensembles first. This will
align everything to the current timestep in the first ensemble. Note that
this changes the ``ens1`` and ``ens2`` objects:
>>> from MDAnalysis import Universe
>>> import MDAnalysis.analysis.encore as encore
>>> from MDAnalysis.tests.datafiles import PSF, DCD, DCD2
>>> ens1 = Universe(PSF, DCD)
>>> ens2 = Universe(PSF, DCD2)
>>> HES, details = encore.hes([ens1, ens2])
>>> print(HES)
[[ 0. 38279540.04524205]
[38279540.04524205 0. ]]
>>> print(encore.hes([ens1, ens2], align=True)[0])
[[ 0. 6889.89729056]
[6889.89729056 0. ]]
Alternatively, for greater flexibility in how the alignment should be done
you can call use an :class:`~MDAnalysis.analysis.align.AlignTraj` object
manually:
>>> from MDAnalysis import Universe
>>> import MDAnalysis.analysis.encore as encore
>>> from MDAnalysis.tests.datafiles import PSF, DCD, DCD2
>>> from MDAnalysis.analysis import align
>>> ens1 = Universe(PSF, DCD)
>>> ens2 = Universe(PSF, DCD2)
>>> _ = align.AlignTraj(ens1, ens1, select="name CA", in_memory=True).run()
>>> _ = align.AlignTraj(ens2, ens1, select="name CA", in_memory=True).run()
>>> print(encore.hes([ens1, ens2])[0])
[[ 0. 6889.89729056]
[6889.89729056 0. ]]
.. versionchanged:: 1.0.0
``hes`` doesn't accept the `details` argument anymore, it always returns
the details of the calculation instead, in the form of a dictionary
"""
if not isinstance(weights, (list, tuple, np.ndarray)) and weights == 'mass':
weights = ['mass' for _ in range(len(ensembles))]
elif weights is not None:
if len(weights) != len(ensembles):
raise ValueError("need weights for every ensemble")
else:
weights = [None for _ in range(len(ensembles))]
# Ensure in-memory trajectories either by calling align
# with in_memory=True or by directly calling transfer_to_memory
# on the universe.
if align:
for e, w in zip(ensembles, weights):
mda.analysis.align.AlignTraj(e, ensembles[0],
select=select,
weights=w,
in_memory=True).run()
else:
for ensemble in ensembles:
ensemble.transfer_to_memory()
if calc_diagonal:
pairs_indices = list(trm_indices_diag(len(ensembles)))
else:
pairs_indices = list(trm_indices_nodiag(len(ensembles)))
logging.info("Chosen metric: Harmonic similarity")
if cov_estimator == "shrinkage":
covariance_estimator = shrinkage_covariance_estimator
logging.info(" Covariance matrix estimator: Shrinkage")
elif cov_estimator == "ml":
covariance_estimator = ml_covariance_estimator
logging.info(" Covariance matrix estimator: Maximum Likelihood")
else:
logging.error(
"Covariance estimator {0} is not supported. "
"Choose between 'shrinkage' and 'ml'.".format(cov_estimator))
return None
out_matrix_eln = len(ensembles)
xs = []
sigmas = []
if estimate_error:
data = []
ensembles_list = []
for i, ensemble in enumerate(ensembles):
ensembles_list.append(
get_ensemble_bootstrap_samples(
ensemble,
samples=bootstrapping_samples))
for t in range(bootstrapping_samples):
logging.info("The coordinates will be bootstrapped.")
xs = []
sigmas = []
values = np.zeros((out_matrix_eln, out_matrix_eln))
for i, e_orig in enumerate(ensembles):
xs.append(np.average(
ensembles_list[i][t].trajectory.timeseries(
e_orig.select_atoms(select),
order=('fac')),
axis=0).flatten())
sigmas.append(covariance_matrix(ensembles_list[i][t],
weights=weights[i],
estimator=covariance_estimator,
select=select))
for pair in pairs_indices:
value = harmonic_ensemble_similarity(x1=xs[pair[0]],
x2=xs[pair[1]],
sigma1=sigmas[pair[0]],
sigma2=sigmas[pair[1]])
values[pair[0], pair[1]] = value
values[pair[1], pair[0]] = value
data.append(values)
avgs = np.average(data, axis=0)
stds = np.std(data, axis=0)
return (avgs, stds)
# Calculate the parameters for the multivariate normal distribution
# of each ensemble
values = np.zeros((out_matrix_eln, out_matrix_eln))
for e, w in zip(ensembles, weights):
# Extract coordinates from each ensemble
coordinates_system = e.trajectory.timeseries(e.select_atoms(select),
order='fac')
# Average coordinates in each system
xs.append(np.average(coordinates_system, axis=0).flatten())
# Covariance matrices in each system
sigmas.append(covariance_matrix(e,
weights=w,
estimator=covariance_estimator,
select=select))
for i, j in pairs_indices:
value = harmonic_ensemble_similarity(x1=xs[i],
x2=xs[j],
sigma1=sigmas[i],
sigma2=sigmas[j])
values[i, j] = value
values[j, i] = value
# Save details as required
details = {}
for i in range(out_matrix_eln):
details['ensemble{0:d}_mean'.format(i + 1)] = xs[i]
details['ensemble{0:d}_covariance_matrix'.format(i + 1)] = sigmas[i]
return values, details
[docs]def ces(ensembles,
select="name CA",
clustering_method=AffinityPropagationNative(
preference=-1.0,
max_iter=500,
convergence_iter=50,
damping=0.9,
add_noise=True),
distance_matrix=None,
estimate_error=False,
bootstrapping_samples=10,
ncores=1,
calc_diagonal=False,
allow_collapsed_result=True):
"""
Calculates the Clustering Ensemble Similarity (CES) between ensembles
using the Jensen-Shannon divergence as described in
:cite:p:`b-Tiberti2015`.
Parameters
----------
ensembles : list
List of ensemble objects for similarity measurements
select : str, optional
Atom selection string in the MDAnalysis format. Default is "name CA"
clustering_method :
A single or a list of instances of the
:class:`MDAnalysis.analysis.encore.clustering.ClusteringMethod` classes
from the clustering module. Different parameters for the same clustering
method can be explored by adding different instances of the same
clustering class. Clustering methods options are the
Affinity Propagation (default), the DBSCAN and the KMeans. The latter
two methods need the sklearn python module installed.
distance_matrix : encore.utils.TriangularMatrix
Distance matrix clustering methods. If this parameter
is not supplied the matrix will be calculated on the fly.
estimate_error : bool, optional
Whether to perform error estimation (default is False).
Only bootstrapping mode is supported.
bootstrapping_samples : int, optional
number of samples to be used for estimating error.
ncores : int, optional
Maximum number of cores to be used (default is 1).
calc_diagonal : bool, optional
Whether to calculate the diagonal of the similarity scores
(i.e. the similarities of every ensemble against itself).
If this is False (default), 0.0 will be used instead.
allow_collapsed_result: bool, optional
Whether a return value of a list of one value should be collapsed
into just the value.
Returns
-------
ces, details : numpy.array, numpy.array
ces contains the similarity values, arranged in a numpy.array.
If only one clustering_method is provided the output will be a
2-dimensional square symmetrical numpy.array. The order of the matrix
elements depends on the order of the input ensembles: for instance, if
ensemble = [ens1, ens2, ens3]
the matrix elements [0,2] and [2,0] will both contain the similarity
value between ensembles ens1 and ens3.
Elaborating on the previous example, if *n* ensembles are given and *m*
clustering_methods are provided the output will be a list of *m* arrays
ordered by the input sequence of methods, each with a *n*x*n*
symmetrical similarity matrix.
details contains information on the clustering: the individual size of
each cluster, the centroids and the frames associated with each cluster.
Notes
-----
In the Jensen-Shannon divergence the upper bound of ln(2) signifies
no similarity between the two ensembles, the lower bound, 0.0,
signifies identical ensembles.
To calculate the CES, the affinity propagation method (or others, if
specified) is used to partition the whole space of conformations. The
population of each ensemble in each cluster is then taken as a probability
density function. Different probability density functions from each
ensemble are finally compared using the Jensen-Shannon divergence measure.
Examples
--------
To calculate the Clustering Ensemble similarity, two ensembles are
created as Universe object using a topology file and two trajectories. The
topology- and trajectory files used are obtained from the MDAnalysis
test suite for two different simulations of the protein AdK.
To use a different clustering method, set the parameter clustering_method
(Note that the sklearn module must be installed). Likewise, different parameters
for the same clustering method can be explored by adding different
instances of the same clustering class.
Here the simplest case of just two instances of :class:`Universe` is illustrated:
>>> from MDAnalysis import Universe
>>> import MDAnalysis.analysis.encore as encore
>>> from MDAnalysis.tests.datafiles import PSF, DCD, DCD2
>>> ens1 = Universe(PSF, DCD)
>>> ens2 = Universe(PSF, DCD2)
>>> CES, details = encore.ces([ens1,ens2])
>>> print(CES)
[[0. 0.68070702]
[0.68070702 0. ]]
>>> CES, details = encore.ces([ens1,ens2],
... clustering_method = [encore.DBSCAN(eps=0.45),
... encore.DBSCAN(eps=0.50)])
>>> print("eps=0.45: ", CES[0])
eps=0.45: [[0. 0.20447236]
[0.20447236 0. ]]
>>> print("eps=0.5: ", CES[1])
eps=0.5: [[0. 0.25331629]
[0.25331629 0. ]]
"""
for ensemble in ensembles:
ensemble.transfer_to_memory()
if calc_diagonal:
pairs_indices = list(trm_indices_diag(len(ensembles)))
else:
pairs_indices = list(trm_indices_nodiag(len(ensembles)))
clustering_methods = clustering_method
if not hasattr(clustering_method, '__iter__'):
clustering_methods = [clustering_method]
any_method_accept_distance_matrix = \
np.any([method.accepts_distance_matrix for method in clustering_methods])
all_methods_accept_distance_matrix = \
np.all([method.accepts_distance_matrix for method in clustering_methods])
# Register which ensembles the samples belong to
ensemble_assignment = []
for i, ensemble in enumerate(ensembles):
ensemble_assignment += [i+1]*len(ensemble.trajectory)
# Calculate distance matrix if not provided
if any_method_accept_distance_matrix and not distance_matrix:
distance_matrix = get_distance_matrix(merge_universes(ensembles),
select=select,
ncores=ncores)
if estimate_error:
if any_method_accept_distance_matrix:
distance_matrix = \
get_distance_matrix_bootstrap_samples(
distance_matrix,
ensemble_assignment,
samples=bootstrapping_samples,
ncores=ncores)
if not all_methods_accept_distance_matrix:
ensembles_list = []
for i, ensemble in enumerate(ensembles):
ensembles_list.append(
get_ensemble_bootstrap_samples(
ensemble,
samples=bootstrapping_samples))
ensembles = []
for j in range(bootstrapping_samples):
ensembles.append([])
for i, e in enumerate(ensembles_list):
ensembles[-1].append(e[j])
else:
# if all methods accept distances matrices, duplicate
# ensemble so that it matches size of distance matrices
# (no need to resample them since they will not be used)
ensembles = [ensembles]*bootstrapping_samples
# Call clustering procedure
ccs = cluster(ensembles,
method= clustering_methods,
select=select,
distance_matrix = distance_matrix,
ncores = ncores,
allow_collapsed_result=False)
# Do error analysis
if estimate_error:
k = 0
values = {}
avgs = []
stds = []
for i, p in enumerate(clustering_methods):
failed_runs = 0
values[i] = []
for j in range(bootstrapping_samples):
if ccs[k].clusters is None:
failed_runs += 1
k += 1
continue
values[i].append(np.zeros((len(ensembles[j]),
len(ensembles[j]))))
for pair in pairs_indices:
# Calculate dJS
this_djs = \
clustering_ensemble_similarity(ccs[k],
ensembles[j][
pair[0]],
pair[0] + 1,
ensembles[j][
pair[1]],
pair[1] + 1,
select=select)
values[i][-1][pair[0], pair[1]] = this_djs
values[i][-1][pair[1], pair[0]] = this_djs
k += 1
outs = np.array(values[i])
avgs.append(np.average(outs, axis=0))
stds.append(np.std(outs, axis=0))
if hasattr(clustering_method, '__iter__'):
pass
else:
avgs = avgs[0]
stds = stds[0]
return avgs, stds
values = []
details = {}
for i, p in enumerate(clustering_methods):
if ccs[i].clusters is None:
continue
else:
values.append(np.zeros((len(ensembles), len(ensembles))))
for pair in pairs_indices:
# Calculate dJS
this_val = \
clustering_ensemble_similarity(ccs[i],
ensembles[pair[0]],
pair[0] + 1,
ensembles[pair[1]],
pair[1] + 1,
select=select)
values[-1][pair[0], pair[1]] = this_val
values[-1][pair[1], pair[0]] = this_val
details['clustering'] = ccs
if allow_collapsed_result and not hasattr(clustering_method, '__iter__'):
values = values[0]
return values, details
[docs]def dres(ensembles,
select="name CA",
dimensionality_reduction_method = StochasticProximityEmbeddingNative(
dimension=3,
distance_cutoff = 1.5,
min_lam=0.1,
max_lam=2.0,
ncycle=100,
nstep=10000),
distance_matrix=None,
nsamples=1000,
estimate_error=False,
bootstrapping_samples=100,
ncores=1,
calc_diagonal=False,
allow_collapsed_result=True):
"""
Calculates the Dimensional Reduction Ensemble Similarity (DRES) between
ensembles using the Jensen-Shannon divergence as described in
:cite:p:`b-Tiberti2015`.
Parameters
----------
ensembles : list
List of ensemble objects for similarity measurements
select : str, optional
Atom selection string in the MDAnalysis format. Default is "name CA"
dimensionality_reduction_method :
A single or a list of instances of the DimensionalityReductionMethod
classes from the dimensionality_reduction module. Different parameters
for the same method can be explored by adding different instances of
the same dimensionality reduction class. Provided methods are the
Stochastic Proximity Embedding (default) and the Principal Component
Analysis.
distance_matrix : encore.utils.TriangularMatrix
conformational distance matrix, It will be calculated on the fly
from the ensemble data if it is not provided.
nsamples : int, optional
Number of samples to be drawn from the ensembles (default is 1000).
This is used to resample the density estimates and calculate the
Jensen-Shannon divergence between ensembles.
estimate_error : bool, optional
Whether to perform error estimation (default is False)
bootstrapping_samples : int, optional
number of samples to be used for estimating error.
ncores : int, optional
Maximum number of cores to be used (default is 1).
calc_diagonal : bool, optional
Whether to calculate the diagonal of the similarity scores
(i.e. the simlarities of every ensemble against itself).
If this is False (default), 0.0 will be used instead.
allow_collapsed_result: bool, optional
Whether a return value of a list of one value should be collapsed
into just the value.
Returns
-------
dres, details : numpy.array, numpy.array
dres contains the similarity values, arranged in numpy.array.
If one number of dimensions is provided as an integer,
the output will be a 2-dimensional square symmetrical numpy.array.
The order of the matrix elements depends on the order of the
input ensemble: for instance, if
ensemble = [ens1, ens2, ens3]
then the matrix elements [0,2] and [2,0] will both contain the
similarity value between ensembles ens1 and ens3.
Elaborating on the previous example, if *n* ensembles are given and *m*
methods are provided the output will be a list of *m* arrays
ordered by the input sequence of methods, each with a *n*x*n*
symmetrical similarity matrix.
details provide an array of the reduced_coordinates.
Notes
-----
To calculate the similarity, the method first projects the ensembles into
lower dimensions by using the Stochastic Proximity Embedding (or others)
algorithm. A gaussian kernel-based density estimation method is then used
to estimate the probability density for each ensemble which is then used
to compute the Jensen-Shannon divergence between each pair of ensembles.
In the Jensen-Shannon divergence the upper bound of ln(2) signifies
no similarity between the two ensembles, the lower bound, 0.0,
signifies identical ensembles. However, due to the stochastic nature of
the dimensional reduction in :func:`dres`, two identical ensembles will
not necessarily result in an exact 0.0 estimate of the similarity but
will be very close. For the same reason, calculating the similarity with
the :func:`dres` twice will not result in two identical numbers; small
differences have to be expected.
Examples
--------
To calculate the Dimensional Reduction Ensemble similarity, two ensembles
are created as Universe objects from a topology file and two trajectories.
The topology- and trajectory files used are obtained from the MDAnalysis
test suite for two different simulations of the protein AdK.
To use a different dimensional reduction methods, simply set the
parameter dimensionality_reduction_method. Likewise, different parameters
for the same clustering method can be explored by adding different
instances of the same method class.
Here the simplest case of comparing just two instances of :class:`Universe` is
illustrated:
>>> from MDAnalysis import Universe
>>> import MDAnalysis.analysis.encore as encore
>>> from MDAnalysis.tests.datafiles import PSF, DCD, DCD2
>>> ens1 = Universe(PSF,DCD)
>>> ens2 = Universe(PSF,DCD2)
>>> DRES, details = encore.dres([ens1,ens2])
>>> PCA_method = encore.PrincipalComponentAnalysis(dimension=2)
>>> DRES, details = encore.dres([ens1,ens2],
... dimensionality_reduction_method=PCA_method)
In addition to the quantitative similarity estimate, the dimensional
reduction can easily be visualized, see the ``Example`` section in
:mod:`MDAnalysis.analysis.encore.dimensionality_reduction.reduce_dimensionality``
"""
for ensemble in ensembles:
ensemble.transfer_to_memory()
if calc_diagonal:
pairs_indices = list(trm_indices_diag(len(ensembles)))
else:
pairs_indices = list(trm_indices_nodiag(len(ensembles)))
dimensionality_reduction_methods = dimensionality_reduction_method
if not hasattr(dimensionality_reduction_method, '__iter__'):
dimensionality_reduction_methods = [dimensionality_reduction_method]
any_method_accept_distance_matrix = \
np.any([method.accepts_distance_matrix for method in dimensionality_reduction_methods])
all_methods_accept_distance_matrix = \
np.all([method.accepts_distance_matrix for method in dimensionality_reduction_methods])
# Register which ensembles the samples belong to
ensemble_assignment = []
for i, ensemble in enumerate(ensembles):
ensemble_assignment += [i+1]*len(ensemble.trajectory)
# Calculate distance matrix if not provided
if any_method_accept_distance_matrix and not distance_matrix:
distance_matrix = get_distance_matrix(merge_universes(ensembles),
select=select,
ncores=ncores)
if estimate_error:
if any_method_accept_distance_matrix:
distance_matrix = \
get_distance_matrix_bootstrap_samples(
distance_matrix,
ensemble_assignment,
samples=bootstrapping_samples,
ncores=ncores)
if not all_methods_accept_distance_matrix:
ensembles_list = []
for i, ensemble in enumerate(ensembles):
ensembles_list.append(
get_ensemble_bootstrap_samples(
ensemble,
samples=bootstrapping_samples))
ensembles = []
for j in range(bootstrapping_samples):
ensembles.append(ensembles_list[i, j] for i
in range(ensembles_list.shape[0]))
else:
# if all methods accept distances matrices, duplicate
# ensemble so that it matches size of distance matrices
# (no need to resample them since they will not be used)
ensembles = [ensembles] * bootstrapping_samples
# Call dimensionality reduction procedure
coordinates, dim_red_details = reduce_dimensionality(
ensembles,
method=dimensionality_reduction_methods,
select=select,
distance_matrix = distance_matrix,
ncores = ncores,
allow_collapsed_result = False)
details = {}
details["reduced_coordinates"] = coordinates
details["dimensionality_reduction_details"] = dim_red_details
if estimate_error:
k = 0
values = {}
avgs = []
stds = []
for i,method in enumerate(dimensionality_reduction_methods):
values[i] = []
for j in range(bootstrapping_samples):
values[i].append(np.zeros((len(ensembles[j]),
len(ensembles[j]))))
kdes, resamples, embedded_ensembles = gen_kde_pdfs(
coordinates[k],
ensemble_assignment,
len(ensembles[j]),
nsamples=nsamples)
for pair in pairs_indices:
this_value = dimred_ensemble_similarity(kdes[pair[0]],
resamples[pair[0]],
kdes[pair[1]],
resamples[pair[1]])
values[i][-1][pair[0], pair[1]] = this_value
values[i][-1][pair[1], pair[0]] = this_value
k += 1
outs = np.array(values[i])
avgs.append(np.average(outs, axis=0))
stds.append(np.std(outs, axis=0))
if hasattr(dimensionality_reduction_method, '__iter__'):
pass
else:
avgs = avgs[0]
stds = stds[0]
return avgs, stds
values = []
for i,method in enumerate(dimensionality_reduction_methods):
values.append(np.zeros((len(ensembles), len(ensembles))))
kdes, resamples, embedded_ensembles = gen_kde_pdfs(coordinates[i],
ensemble_assignment,
len(ensembles),
nsamples=nsamples)
for pair in pairs_indices:
this_value = dimred_ensemble_similarity(kdes[pair[0]],
resamples[pair[0]],
kdes[pair[1]],
resamples[pair[1]])
values[-1][pair[0], pair[1]] = this_value
values[-1][pair[1], pair[0]] = this_value
if allow_collapsed_result and not hasattr(dimensionality_reduction_method,
'__iter__'):
values = values[0]
return values, details
[docs]def ces_convergence(original_ensemble,
window_size,
select="name CA",
clustering_method=AffinityPropagationNative(
preference=-1.0,
max_iter=500,
convergence_iter=50,
damping=0.9,
add_noise=True),
ncores=1):
"""
Use the CES to evaluate the convergence of the ensemble/trajectory.
CES will be calculated between the whole trajectory contained in an
ensemble and windows of such trajectory of increasing sizes, so that
the similarity values should gradually drop to zero. The rate at which
the value reach zero will be indicative of how much the trajectory
keeps on resampling the same regions of the conformational space, and
therefore of convergence.
Parameters
----------
original_ensemble : :class:`~MDAnalysis.core.universe.Universe` object
ensemble containing the trajectory whose convergence has to estimated
window_size : int
Size of window to be used, in number of frames
select : str, optional
Atom selection string in the MDAnalysis format. Default is "name CA"
clustering_method : MDAnalysis.analysis.encore.clustering.ClusteringMethod
A single or a list of instances of the ClusteringMethod classes from
the clustering module. Different parameters for the same clustering
method can be explored by adding different instances of the same
clustering class.
ncores : int, optional
Maximum number of cores to be used (default is 1).
Returns
-------
out : np.array
array of shape (number_of_frames / window_size, preference_values).
Example
--------
To calculate the convergence of a trajectory using the clustering ensemble
similarity method a Universe object is created from a topology file and the
trajectory. The topology- and trajectory files used are obtained from the
MDAnalysis test suite for two different simulations of the protein AdK.
Here the simplest case of evaluating the convergence is illustrated by
splitting the trajectory into a window_size of 10 frames:
>>> from MDAnalysis import Universe
>>> import MDAnalysis.analysis.encore as encore
>>> from MDAnalysis.tests.datafiles import PSF, DCD, DCD2
>>> ens1 = Universe(PSF,DCD)
>>> ces_conv = encore.ces_convergence(ens1, 10)
>>> print(ces_conv)
[[0.48194205]
[0.40284672]
[0.31699026]
[0.25220447]
[0.19829817]
[0.14642725]
[0.09911411]
[0.05667391]
[0. ]]
"""
ensembles = prepare_ensembles_for_convergence_increasing_window(
original_ensemble, window_size, select=select)
ccs = cluster(ensembles,
select=select,
method=clustering_method,
allow_collapsed_result=False,
ncores=ncores)
out = []
for cc in ccs:
if cc.clusters is None:
continue
out.append(np.zeros(len(ensembles)))
for j, ensemble in enumerate(ensembles):
out[-1][j] = cumulative_clustering_ensemble_similarity(
cc,
len(ensembles),
j + 1)
out = np.array(out).T
return out
[docs]def dres_convergence(original_ensemble,
window_size,
select="name CA",
dimensionality_reduction_method = \
StochasticProximityEmbeddingNative(
dimension=3,
distance_cutoff=1.5,
min_lam=0.1,
max_lam=2.0,
ncycle=100,
nstep=10000
),
nsamples=1000,
ncores=1):
"""
Use the DRES to evaluate the convergence of the ensemble/trajectory.
DRES will be calculated between the whole trajectory contained in an
ensemble and windows of such trajectory of increasing sizes, so that
the similarity values should gradually drop to zero. The rate at which
the value reach zero will be indicative of how much the trajectory
keeps on resampling the same ares of the conformational space, and
therefore of convergence.
Parameters
----------
original_ensemble : :class:`~MDAnalysis.core.universe.Universe` object
ensemble containing the trajectory whose convergence has to estimated
window_size : int
Size of window to be used, in number of frames
select : str, optional
Atom selection string in the MDAnalysis format. Default is "name CA"
dimensionality_reduction_method :
A single or a list of instances of the DimensionalityReductionMethod
classes from the dimensionality_reduction module. Different parameters
for the same method can be explored by adding different instances of
the same dimensionality reduction class.
nsamples : int, optional
Number of samples to be drawn from the ensembles (default is 1000).
This is akin to the nsamples parameter of dres().
ncores : int, optional
Maximum number of cores to be used (default is 1).
Returns
-------
out : np.array
array of shape (number_of_frames / window_size, preference_values).
Example
--------
To calculate the convergence of a trajectory using the DRES
method, a Universe object is created from a topology file and the
trajectory. The topology- and trajectory files used are obtained from the
MDAnalysis test suite for two different simulations of the protein AdK.
Here the simplest case of evaluating the convergence is illustrated by
splitting the trajectory into a window_size of 10 frames:
>>> from MDAnalysis import Universe
>>> import MDAnalysis.analysis.encore as encore
>>> from MDAnalysis.tests.datafiles import PSF, DCD, DCD2
>>> ens1 = Universe(PSF,DCD)
>>> dres_conv = encore.dres_convergence(ens1, 10)
Here, the rate at which the values reach zero will be indicative of how
much the trajectory keeps on resampling the same ares of the conformational
space, and therefore of convergence.
"""
ensembles = prepare_ensembles_for_convergence_increasing_window(
original_ensemble, window_size, select=select)
coordinates, dimred_details = \
reduce_dimensionality(
ensembles,
select=select,
method=dimensionality_reduction_method,
allow_collapsed_result=False,
ncores=ncores)
ensemble_assignment = []
for i, ensemble in enumerate(ensembles):
ensemble_assignment += [i+1]*len(ensemble.trajectory)
ensemble_assignment = np.array(ensemble_assignment)
out = []
for i, _ in enumerate(coordinates):
out.append(np.zeros(len(ensembles)))
kdes, resamples, embedded_ensembles = \
cumulative_gen_kde_pdfs(
coordinates[i],
ensemble_assignment=ensemble_assignment,
nensembles=len(ensembles),
nsamples=nsamples)
for j, ensemble in enumerate(ensembles):
out[-1][j] = dimred_ensemble_similarity(kdes[-1],
resamples[-1],
kdes[j],
resamples[j])
out = np.array(out).T
return out