pyemma.msm.OOMReweightedMSM¶
-
class
pyemma.msm.
OOMReweightedMSM
(lag=1, reversible=True, count_mode='sliding', sparse=False, connectivity='largest', dt_traj='1 step', nbs=10000, rank_Ct='bootstrap_counts', tol_rank=10.0, score_method='VAMP2', score_k=10, mincount_connectivity='1/n')¶ OOM based estimator for MSMs given discrete trajectory statistics
-
__init__
(lag=1, reversible=True, count_mode='sliding', sparse=False, connectivity='largest', dt_traj='1 step', nbs=10000, rank_Ct='bootstrap_counts', tol_rank=10.0, score_method='VAMP2', score_k=10, mincount_connectivity='1/n')¶ Maximum likelihood estimator for MSMs given discrete trajectory statistics
Parameters: - lag (int) – lag time at which transitions are counted and the transition matrix is estimated.
- reversible (bool, optional, default = True) – If true compute reversible MSM, else non-reversible MSM
- count_mode (str, optional, default='sliding') –
mode to obtain count matrices from discrete trajectories. Should be one of:
- ’sliding’ : A trajectory of length T will have \(T-tau\) counts
at time indexes\[(0 \rightarrow \tau), (1 \rightarrow \tau+1), ..., (T-\tau-1 \rightarrow T-1)\]
- ’sample’ : A trajectory of length T will have \(T/\tau\) counts
at time indexes\[(0 \rightarrow \tau), (\tau \rightarrow 2 \tau), ..., (((T/\tau)-1) \tau \rightarrow T)\]
- ’sliding’ : A trajectory of length T will have \(T-tau\) counts
at time indexes
- sparse (bool, optional, default = False) – If true compute count matrix, transition matrix and all derived quantities using sparse matrix algebra. In this case python sparse matrices will be returned by the corresponding functions instead of numpy arrays. This behavior is suggested for very large numbers of states (e.g. > 4000) because it is likely to be much more efficient.
- connectivity (str, optional, default = 'largest') –
Connectivity mode. Three methods are intended (currently only ‘largest’ is implemented)
- ’largest’ : The active set is the largest reversibly connected set. All estimation will be done on this subset and all quantities (transition matrix, stationary distribution, etc) are only defined on this subset and are correspondingly smaller than the full set of states
- ’all’ : The active set is the full set of states. Estimation will be conducted on each reversibly connected set separately. That means the transition matrix will decompose into disconnected submatrices, the stationary vector is only defined within subsets, etc. Currently not implemented.
- ’none’ : The active set is the full set of states. Estimation will be conducted on the full set of states without ensuring connectivity. This only permits nonreversible estimation. Currently not implemented.
- dt_traj (str, optional, default='1 step') –
Description of the physical time of the input trajectories. May be used by analysis algorithms such as plotting tools to pretty-print the axes. By default ‘1 step’, i.e. there is no physical time unit. Specify by a number, whitespace and unit. Permitted units are (* is an arbitrary string):
’fs’, ‘femtosecond*’’ps’, ‘picosecond*’’ns’, ‘nanosecond*’’us’, ‘microsecond*’’ms’, ‘millisecond*’’s’, ‘second*’ - nbs (int, optional, default=10000) – number of re-samplings for rank decision in OOM estimation.
- rank_Ct (str, optional) –
Re-sampling method for model rank selection. Can be * ‘bootstrap_counts’: Directly re-sample transitions based on effective count matrix.
- ’bootstrap_trajs’: Re-draw complete trajectories with replacement.
- tol_rank (float, optional, default = 10.0) – signal-to-noise threshold for rank decision.
- score_method (str, optional, default='VAMP2') –
Score to be used with score function. Available are:
- score_k (int or None) – The maximum number of eigenvalues or singular values used in the score. If set to None, all available eigenvalues will be used.
- mincount_connectivity (float or '1/n') – minimum number of counts to consider a connection between two states. Counts lower than that will count zero in the connectivity check and may thus separate the resulting transition matrix. The default evaluates to 1/nstates.
References
[1] H. Wu and F. Noe: Variational approach for learning Markov processes from time series data (in preparation)
Methods
__init__
([lag, reversible, count_mode, …])Maximum likelihood estimator for MSMs given discrete trajectory statistics cktest
(nsets[, memberships, mlags, conf, …])Conducts a Chapman-Kolmogorow test. coarse_grain
(ncoarse[, method])Returns a coarse-grained Markov model. committor_backward
(A, B)Backward committor from set A to set B committor_forward
(A, B)Forward committor (also known as p_fold or splitting probability) from set A to set B correlation
(a[, b, maxtime, k, ncv])Time-correlation for equilibrium experiment. eigenvalues
([k])Compute the transition matrix eigenvalues eigenvectors_left
([k])Compute the left transition matrix eigenvectors eigenvectors_right
([k])Compute the right transition matrix eigenvectors estimate
(dtrajs, **kwargs)param dtrajs: discrete trajectories, stored as integer ndarrays (arbitrary size) expectation
(a)Equilibrium expectation value of a given observable. fingerprint_correlation
(a[, b, k, ncv])Dynamical fingerprint for equilibrium time-correlation experiment. fingerprint_relaxation
(p0, a[, k, ncv])Dynamical fingerprint for perturbation/relaxation experiment. fit
(X[, y])Estimates parameters - for compatibility with sklearn. generate_traj
(N[, start, stop, stride])Generates a synthetic discrete trajectory of length N and simulation time stride * lag time * N get_model_params
([deep])Get parameters for this model. get_params
([deep])Get parameters for this estimator. hmm
(nhidden)Estimates a hidden Markov state model as described in [1]_ load
(file_name[, model_name])Loads a previously saved PyEMMA object from disk. mfpt
(A, B)Mean first passage times from set A to set B, in units of the input trajectory time step pcca
(m)Runs PCCA++ [1]_ to compute a metastable decomposition of MSM states propagate
(p0, k)Propagates the initial distribution p0 k times relaxation
(p0, a[, maxtime, k, ncv])Simulates a perturbation-relaxation experiment. sample_by_distributions
(distributions, nsample)Generates samples according to given probability distributions sample_by_state
(nsample[, subset, replace])Generates samples of the connected states. save
(file_name[, model_name, overwrite, …])saves the current state of this object to given file and name. score
(dtrajs[, score_method, score_k])Scores the MSM using the dtrajs using the variational approach for Markov processes [1]_ [2]_ score_cv
(dtrajs[, n, score_method, score_k])Scores the MSM using the variational approach for Markov processes [1]_ [2]_ and crossvalidation [3]_ . set_model_params
(P[, pi, reversible, …])Call to set all basic model parameters. set_params
(**params)Set the parameters of this estimator. simulate
(N[, start, stop, dt])Generates a realization of the Markov Model timescales
([k])The relaxation timescales corresponding to the eigenvalues trajectory_weights
()Uses the MSM to assign a probability weight to each trajectory frame. update_model_params
(**params)Update given model parameter if they are set to specific values Attributes
OOM_components
Return OOM components. OOM_omega
Return OOM initial state vector. OOM_rank
Return OOM model rank. OOM_sigma
Return OOM evaluator vector. P
The transition matrix on the active set. active_count_fraction
The fraction of counts in the largest connected set. active_set
The active set of states on which all computations and estimations will be done active_state_fraction
The fraction of states in the largest connected set. active_state_indexes
Ensures that the connected states are indexed and returns the indices connected_sets
The reversible connected sets of states, sorted by size (descending) connectivity
Returns the connectivity mode of the MSM count_matrix_active
The count matrix on the active set given the connectivity mode used. count_matrix_full
The count matrix on full set of discrete states, irrespective as to whether they are connected or not. discrete_trajectories_active
A list of integer arrays with the discrete trajectories mapped to the connectivity mode used. discrete_trajectories_full
type: A list of integer arrays with the original (unmapped) discrete trajectories dt_model
Description of the physical time corresponding to the lag. dt_traj
dtrajs_active
A list of integer arrays with the discrete trajectories mapped to the connectivity mode used. dtrajs_full
type: A list of integer arrays with the original (unmapped) discrete trajectories eigenvalues_OOM
System eigenvalues estimated by OOM. is_reversible
Returns whether the MSM is reversible is_sparse
Returns whether the MSM is sparse lag
The lag time at which the Markov model was estimated lagtime
The lag time at which the Markov model was estimated largest_connected_set
The largest reversible connected set of states logger
The logger for this class instance metastable_assignments
Assignment of states to metastable sets using PCCA++ metastable_distributions
Probability of metastable states to visit an MSM state by PCCA++ metastable_memberships
Probabilities of MSM states to belong to a metastable state by PCCA++ metastable_sets
Metastable sets using PCCA++ model
The model estimated by this Estimator n_metastable
Number of states chosen for PCCA++ computation. name
The name of this instance neig
number of eigenvalues to compute. nstates
Number of active states on which all computations and estimations are done nstates_full
Number of states in discrete trajectories pi
The stationary distribution on the MSM states reversible
Returns whether the MSM is reversible sparse
Returns whether the MSM is sparse stationary_distribution
The stationary distribution on the MSM states timescales_OOM
System timescales estimated by OOM. timestep_model
Physical time corresponding to one transition matrix step, e.g. transition_matrix
The transition matrix on the active set. -
OOM_components
¶ Return OOM components.
-
OOM_omega
¶ Return OOM initial state vector.
-
OOM_rank
¶ Return OOM model rank.
-
OOM_sigma
¶ Return OOM evaluator vector.
-
P
¶ The transition matrix on the active set.
-
active_count_fraction
¶ The fraction of counts in the largest connected set.
-
active_set
¶ The active set of states on which all computations and estimations will be done
-
active_state_fraction
¶ The fraction of states in the largest connected set.
-
active_state_indexes
¶ Ensures that the connected states are indexed and returns the indices
-
cktest
(nsets, memberships=None, mlags=10, conf=0.95, err_est=False, n_jobs=None, show_progress=True)¶ Conducts a Chapman-Kolmogorow test.
Parameters: - nsets (int) – number of sets to test on
- memberships (ndarray(nstates, nsets), optional) – optional state memberships. By default (None) will conduct a cktest on PCCA (metastable) sets.
- mlags (int or int-array, optional) – multiples of lag times for testing the Model, e.g. range(10). A single int will trigger a range, i.e. mlags=10 maps to mlags=range(10). The setting None will choose mlags automatically according to the longest available trajectory
- conf (float, optional) – confidence interval
- err_est (bool, optional) – compute errors also for all estimations (computationally expensive) If False, only the prediction will get error bars, which is often sufficient to validate a model.
- n_jobs (int, default=None) – how many jobs to use during calculation
- show_progress (bool, optional) – Show progress bars for calculation?
Returns: cktest
Return type: References
This test was suggested in [1]_ and described in detail in [2]_.
[1] F. Noe, Ch. Schuette, E. Vanden-Eijnden, L. Reich and T. Weikl: Constructing the Full Ensemble of Folding Pathways from Short Off-Equilibrium Simulations. Proc. Natl. Acad. Sci. USA, 106, 19011-19016 (2009) [2] Prinz, J H, H Wu, M Sarich, B Keller, M Senne, M Held, J D Chodera, C Schuette and F Noe. 2011. Markov models of molecular kinetics: Generation and validation. J Chem Phys 134: 174105
-
coarse_grain
(ncoarse, method='hmm')¶ Returns a coarse-grained Markov model.
Currently only the HMM method described in [1]_ is available for coarse-graining MSMs.
Parameters: ncoarse (int) – number of coarse states Returns: hmsm Return type: MaximumLikelihoodHMSM
References
[1] F. Noe, H. Wu, J.-H. Prinz and N. Plattner: Projected and hidden Markov models for calculating kinetics and metastable states of complex molecules J. Chem. Phys. 139, 184114 (2013)
-
committor_backward
(A, B)¶ Backward committor from set A to set B
Parameters: - A (int or int array) – set of starting states
- B (int or int array) – set of target states
-
committor_forward
(A, B)¶ Forward committor (also known as p_fold or splitting probability) from set A to set B
Parameters: - A (int or int array) – set of starting states
- B (int or int array) – set of target states
-
connected_sets
¶ The reversible connected sets of states, sorted by size (descending)
-
connectivity
¶ Returns the connectivity mode of the MSM
-
correlation
(a, b=None, maxtime=None, k=None, ncv=None)¶ Time-correlation for equilibrium experiment.
In order to simulate a time-correlation experiment (e.g. fluorescence correlation spectroscopy [NDD11], dynamical neutron scattering [LYP13], …), first compute the mean values of your experimental observable \(a\) by MSM state:
\[a_i = \frac{1}{N_i} \sum_{x_t \in S_i} f(x_t)\]where \(S_i\) is the set of configurations belonging to MSM state \(i\) and \(f()\) is a function that computes the experimental observable of interest for configuration \(x_t\). If a cross-correlation function is wanted, also apply the above computation to a second experimental observable \(b\).
Then the accurate (i.e. without statistical error) autocorrelation function of \(f(x_t)\) given the Markov model is computed by correlation(a), and the accurate cross-correlation function is computed by correlation(a,b). This is done by evaluating the equation
\[\begin{split}acf_a(k\tau) &= \mathbf{a}^\top \mathrm{diag}(\boldsymbol{\pi}) \mathbf{P(\tau)}^k \mathbf{a} \\ ccf_{a,b}(k\tau) &= \mathbf{a}^\top \mathrm{diag}(\boldsymbol{\pi}) \mathbf{P(\tau)}^k \mathbf{b}\end{split}\]where \(acf\) stands for autocorrelation function and \(ccf\) stands for cross-correlation function, \(\mathbf{P(\tau)}\) is the transition matrix at lag time \(\tau\), \(\boldsymbol{\pi}\) is the equilibrium distribution of \(\mathbf{P}\), and \(k\) is the time index.
Note that instead of using this method you could generate a long synthetic trajectory from the MSM and then estimating the time-correlation of your observable(s) directly from this trajectory. However, there is no reason to do this because the present method does that calculation without any sampling, and only in the limit of an infinitely long synthetic trajectory the two results will agree exactly. The correlation function computed by the present method still has statistical uncertainty from the fact that the underlying MSM transition matrix has statistical uncertainty when being estimated from data, but there is no additional (and unnecessary) uncertainty due to synthetic trajectory generation.
Parameters: - a ((n,) ndarray) – Observable, represented as vector on state space
- maxtime (int or float) – Maximum time (in units of the input trajectory time step) until which the correlation function will be evaluated. Internally, the correlation function can only be computed in integer multiples of the Markov model lag time, and therefore the actual last time point will be computed at \(\mathrm{ceil}(\mathrm{maxtime} / \tau)\) By default (None), the maxtime will be set equal to the 5 times the slowest relaxation time of the MSM, because after this time the signal is almost constant.
- b ((n,) ndarray (optional)) – Second observable, for cross-correlations
- k (int (optional)) – Number of eigenvalues and eigenvectors to use for computation. This option is only relevant for sparse matrices and long times for which an eigenvalue decomposition will be done instead of using the matrix power.
- ncv (int (optional)) – Only relevant for sparse matrices and large lag times where the relaxation will be computed using an eigenvalue decomposition. The number of Lanczos vectors generated, ncv must be greater than k; it is recommended that ncv > 2*k.
Returns: - times (ndarray (N)) – Time points (in units of the input trajectory time step) at which the correlation has been computed
- correlations (ndarray (N)) – Correlation values at given times
Examples
This example computes the autocorrelation function of a simple observable on a three-state Markov model and plots the result using matplotlib:
>>> import numpy as np >>> import pyemma.msm as msm >>> >>> P = np.array([[0.99, 0.01, 0], [0.01, 0.9, 0.09], [0, 0.1, 0.9]]) >>> a = np.array([0.0, 0.5, 1.0]) >>> M = msm.markov_model(P) >>> times, acf = M.correlation(a) >>> >>> import matplotlib.pylab as plt >>> plt.plot(times, acf) # doctest: +SKIP
References
[NDD11] Noe, F., S. Doose, I. Daidone, M. Loellmann, J. D. Chodera, M. Sauer and J. C. Smith. 2011 Dynamical fingerprints for probing individual relaxation processes in biomolecular dynamics with simulations and kinetic experiments. Proc. Natl. Acad. Sci. USA 108, 4822-4827. [LYP13] Lindner, B., Z. Yi, J.-H. Prinz, J. C. Smith and F. Noe. 2013. Dynamic Neutron Scattering from Conformational Dynamics I: Theory and Markov models. J. Chem. Phys. 139, 175101.
-
count_matrix_active
¶ The count matrix on the active set given the connectivity mode used.
For example, for connectivity=’largest’, the count matrix is given only on the largest reversibly connected set. Attention: This count matrix has been obtained by sliding a window of length tau across the data. It contains a factor of tau more counts than are statistically uncorrelated. It’s fine to use this matrix for maximum likelihood estimated, but it will give far too small errors if you use it for uncertainty calculations. In order to do uncertainty calculations, use the effective count matrix, see:
effective_count_matrix
See also
effective_count_matrix
- For a count matrix with effective (statistically uncorrelated) counts.
-
count_matrix_full
¶ The count matrix on full set of discrete states, irrespective as to whether they are connected or not. Attention: This count matrix has been obtained by sliding a window of length tau across the data. It contains a factor of tau more counts than are statistically uncorrelated. It’s fine to use this matrix for maximum likelihood estimated, but it will give far too small errors if you use it for uncertainty calculations. In order to do uncertainty calculations, use the effective count matrix, see:
effective_count_matrix
(only implemented on the active set), or divide this count matrix by tau.See also
effective_count_matrix
- For a active-set count matrix with effective (statistically uncorrelated) counts.
-
discrete_trajectories_active
¶ A list of integer arrays with the discrete trajectories mapped to the connectivity mode used. For example, for connectivity=’largest’, the indexes will be given within the connected set. Frames that are not in the connected set will be -1.
-
discrete_trajectories_full
¶ type: A list of integer arrays with the original (unmapped) discrete trajectories
-
dt_model
¶ Description of the physical time corresponding to the lag.
-
dtrajs_active
¶ A list of integer arrays with the discrete trajectories mapped to the connectivity mode used. For example, for connectivity=’largest’, the indexes will be given within the connected set. Frames that are not in the connected set will be -1.
-
dtrajs_full
¶ type: A list of integer arrays with the original (unmapped) discrete trajectories
-
eigenvalues
(k=None)¶ Compute the transition matrix eigenvalues
Parameters: k (int) – number of eigenvalues to be returned. By default will return all available eigenvalues Returns: ts – transition matrix eigenvalues \(\lambda_i, i = 1, ..., k\)., sorted by descending norm. Return type: ndarray(k,)
-
eigenvalues_OOM
¶ System eigenvalues estimated by OOM.
-
eigenvectors_left
(k=None)¶ Compute the left transition matrix eigenvectors
Parameters: k (int) – number of eigenvectors to be returned. By default all available eigenvectors. Returns: L – left eigenvectors in a row matrix. l_ij is the j’th component of the i’th left eigenvector Return type: ndarray(k,n)
-
eigenvectors_right
(k=None)¶ Compute the right transition matrix eigenvectors
Parameters: k (int) – number of eigenvectors to be computed. By default all available eigenvectors. Returns: R – right eigenvectors in a column matrix. r_ij is the i’th component of the j’th right eigenvector Return type: ndarray(n,k)
-
estimate
(dtrajs, **kwargs)¶ Parameters: - dtrajs (list containing ndarrays(dtype=int) or ndarray(n, dtype=int) or
DiscreteTrajectoryStats
) – discrete trajectories, stored as integer ndarrays (arbitrary size) or a single ndarray for only one trajectory. - **kwargs – Other keyword parameters if different from the settings when this estimator was constructed
Returns: MSM – Note that this class is specialized by the used estimator, eg. it has more functionality than the plain MSM class.
Return type: - dtrajs (list containing ndarrays(dtype=int) or ndarray(n, dtype=int) or
-
expectation
(a)¶ Equilibrium expectation value of a given observable.
Parameters: a ((n,) ndarray) – Observable vector on the MSM state space Returns: val – Equilibrium expectation value fo the given observable Return type: float Notes
The equilibrium expectation value of an observable \(a\) is defined as follows
\[\mathbb{E}_{\mu}[a] = \sum_i \pi_i a_i\]\(\pi=(\pi_i)\) is the stationary vector of the transition matrix \(P\).
-
fingerprint_correlation
(a, b=None, k=None, ncv=None)¶ Dynamical fingerprint for equilibrium time-correlation experiment.
Parameters: - a ((n,) ndarray) – Observable, represented as vector on MSM state space
- b ((n,) ndarray, optional) – Second observable, for cross-correlations
- k (int, optional) – Number of eigenvalues and eigenvectors to use for computation. This option is only relevant for sparse matrices and long times for which an eigenvalue decomposition will be done instead of using the matrix power
- ncv (int, optional) – Only relevant for sparse matrices and large lag times, where the relaxation will be computed using an eigenvalue decomposition. The number of Lanczos vectors generated, ncv must be greater than k; it is recommended that ncv > 2*k
Returns: - timescales ((k,) ndarray) – Time-scales (in units of the input trajectory time step) of the transition matrix
- amplitudes ((k,) ndarray) – Amplitudes for the correlation experiment
References
Spectral densities are commonly used in spectroscopy. Dynamical fingerprints are a useful representation for computational spectroscopy results and have been introduced in [NDD11].
[NDD11] Noe, F, S Doose, I Daidone, M Loellmann, M Sauer, J D Chodera and J Smith. 2010. Dynamical fingerprints for probing individual relaxation processes in biomolecular dynamics with simulations and kinetic experiments. PNAS 108 (12): 4822-4827.
-
fingerprint_relaxation
(p0, a, k=None, ncv=None)¶ Dynamical fingerprint for perturbation/relaxation experiment.
Parameters: - p0 ((n,) ndarray) – Initial distribution for a relaxation experiment
- a ((n,) ndarray) – Observable, represented as vector on state space
- k (int, optional) – Number of eigenvalues and eigenvectors to use for computation
- ncv (int, optional) – Only relevant for sparse matrices and large lag times, where the relaxation will be computes using an eigenvalue decomposition. The number of Lanczos vectors generated, ncv must be greater than k; it is recommended that ncv > 2*k
Returns: - timescales ((k,) ndarray) – Time-scales (in units of the input trajectory time step) of the transition matrix
- amplitudes ((k,) ndarray) – Amplitudes for the relaxation experiment
References
Spectral densities are commonly used in spectroscopy. Dynamical fingerprints are a useful representation for computational spectroscopy results and have been introduced in [NDD11].
[NDD11] Noe, F, S Doose, I Daidone, M Loellmann, M Sauer, J D Chodera and J Smith. 2010. Dynamical fingerprints for probing individual relaxation processes in biomolecular dynamics with simulations and kinetic experiments. PNAS 108 (12): 4822-4827.
-
fit
(X, y=None)¶ Estimates parameters - for compatibility with sklearn.
Parameters: X (object) – A reference to the data from which the model will be estimated Returns: estimator – The estimator (self) with estimated model. Return type: object
-
generate_traj
(N, start=None, stop=None, stride=1)¶ Generates a synthetic discrete trajectory of length N and simulation time stride * lag time * N
This information can be used in order to generate a synthetic molecular dynamics trajectory - see
pyemma.coordinates.save_traj()
Note that the time different between two samples is the Markov model lag time tau. When comparing quantities computing from this synthetic trajectory and from the input trajectories, the time points of this trajectory must be scaled by the lag time in order to have them on the same time scale.
Parameters: - N (int) – Number of time steps in the output trajectory. The total simulation time is stride * lag time * N
- start (int, optional, default = None) – starting state. If not given, will sample from the stationary distribution of P
- stop (int or int-array-like, optional, default = None) – stopping set. If given, the trajectory will be stopped before N steps once a state of the stop set is reached
- stride (int, optional, default = 1) – Multiple of lag time used as a time step. By default, the time step is equal to the lag time
Returns: indexes – trajectory and time indexes of the simulated trajectory. Each row consist of a tuple (i, t), where i is the index of the trajectory and t is the time index within the trajectory. Note that the time different between two samples is the Markov model lag time tau
Return type: ndarray( (N, 2) )
See also
pyemma.coordinates.save_traj()
- in order to save this synthetic trajectory as a trajectory file with molecular structures
-
get_model_params
(deep=True)¶ Get parameters for this model.
Parameters: deep (boolean, optional) – If True, will return the parameters for this estimator and contained subobjects that are estimators. Returns: params – Parameter names mapped to their values. Return type: mapping of string to any
-
get_params
(deep=True)¶ Get parameters for this estimator.
Parameters: deep (boolean, optional) – If True, will return the parameters for this estimator and contained subobjects that are estimators. Returns: params – Parameter names mapped to their values. Return type: mapping of string to any
-
hmm
(nhidden)¶ Estimates a hidden Markov state model as described in [1]_
Parameters: nhidden (int) – number of hidden (metastable) states Returns: hmsm Return type: MaximumLikelihoodHMSM
References
[1] F. Noe, H. Wu, J.-H. Prinz and N. Plattner: Projected and hidden Markov models for calculating kinetics and metastable states of complex molecules J. Chem. Phys. 139, 184114 (2013)
-
is_reversible
¶ Returns whether the MSM is reversible
-
is_sparse
¶ Returns whether the MSM is sparse
-
lag
¶ The lag time at which the Markov model was estimated
-
lagtime
¶ The lag time at which the Markov model was estimated
-
largest_connected_set
¶ The largest reversible connected set of states
-
classmethod
load
(file_name, model_name='default')¶ Loads a previously saved PyEMMA object from disk.
Parameters: - file_name (str or file like object (has to provide read method)) – The file like object tried to be read for a serialized object.
- model_name (str, default='default') – if multiple models are contained in the file, these can be accessed by
their name. Use
pyemma.list_models()
to get a representation of all stored models.
Returns: obj
Return type: the de-serialized object
-
logger
¶ The logger for this class instance
-
metastable_assignments
¶ Assignment of states to metastable sets using PCCA++
Computes the assignment to metastable sets for active set states using the PCCA++ method [1]_.
pcca()
needs to be called first to make this attribute available.This is only recommended for visualization purposes. You cannot compute any actual quantity of the coarse-grained kinetics without employing the fuzzy memberships!
Returns: assignments – For each MSM state, the metastable state it is located in. Return type: ndarray (n,) See also
pcca
- to compute the metastable decomposition
References
[1] Roeblitz, S and M Weber. 2013. Fuzzy spectral clustering by PCCA+: application to Markov state models and data classification. Advances in Data Analysis and Classification 7 (2): 147-179
-
metastable_distributions
¶ Probability of metastable states to visit an MSM state by PCCA++
Computes the probability distributions of active set states within each metastable set by combining the the PCCA++ method [1]_ with Bayesian inversion as described in [2]_.
pcca()
needs to be called first to make this attribute available.Returns: p_out – A matrix containing the probability distribution of each active set state, given that we are in one of the m metastable sets, i.e. p(state | metastable). The row sums of p_out are 1. Return type: ndarray (m,n) See also
pcca
- to compute the metastable decomposition
References
[1] Roeblitz, S and M Weber. 2013. Fuzzy spectral clustering by PCCA+: application to Markov state models and data classification. Advances in Data Analysis and Classification 7, 147-179. [2] F. Noe, H. Wu, J.-H. Prinz and N. Plattner. 2013. Projected and hidden Markov models for calculating kinetics and metastable states of complex molecules J. Chem. Phys. 139, 184114.
-
metastable_memberships
¶ Probabilities of MSM states to belong to a metastable state by PCCA++
Computes the memberships of active set states to metastable sets with the PCCA++ method [1]_.
pcca()
needs to be called first to make this attribute available.Returns: M – A matrix containing the probability or membership of each state to be assigned to each metastable set, i.e. p(metastable | state). The row sums of M are 1. Return type: ndarray((n,m)) See also
pcca
- to compute the metastable decomposition
References
[1] Roeblitz, S and M Weber. 2013. Fuzzy spectral clustering by PCCA+: application to Markov state models and data classification. Advances in Data Analysis and Classification 7 (2): 147-179
-
metastable_sets
¶ Metastable sets using PCCA++
Computes the metastable sets of active set states within each metastable set using the PCCA++ method [1]_.
pcca()
needs to be called first to make this attribute available.This is only recommended for visualization purposes. You cannot compute any actual quantity of the coarse-grained kinetics without employing the fuzzy memberships!
Returns: sets – A list of length equal to metastable states. Each element is an array with microstate indexes contained in it Return type: list of ndarray See also
pcca
- to compute the metastable decomposition
References
[1] Roeblitz, S and M Weber. 2013. Fuzzy spectral clustering by PCCA+: application to Markov state models and data classification. Advances in Data Analysis and Classification 7 (2): 147-179
-
mfpt
(A, B)¶ Mean first passage times from set A to set B, in units of the input trajectory time step
Parameters: - A (int or int array) – set of starting states
- B (int or int array) – set of target states
-
model
¶ The model estimated by this Estimator
-
n_metastable
¶ Number of states chosen for PCCA++ computation.
-
name
¶ The name of this instance
-
neig
¶ number of eigenvalues to compute.
-
nstates
¶ Number of active states on which all computations and estimations are done
-
nstates_full
¶ Number of states in discrete trajectories
-
pcca
(m)¶ Runs PCCA++ [1]_ to compute a metastable decomposition of MSM states
After calling this method you can access
metastable_memberships()
,metastable_distributions()
,metastable_sets()
andmetastable_assignments()
.Parameters: m (int) – Number of metastable sets Returns: pcca_obj – An object containing all PCCA quantities. However, you can also ignore this return value and instead retrieve the quantities of your interest with the following MSM functions: metastable_memberships()
,metastable_distributions()
,metastable_sets()
andmetastable_assignments()
.Return type: PCCA
Notes
If you coarse grain with PCCA++, the order of the obtained memberships might not be preserved. This also applies for
metastable_memberships()
,metastable_distributions()
,metastable_sets()
,metastable_assignments()
References
[1] Roeblitz, S and M Weber. 2013. Fuzzy spectral clustering by PCCA+: application to Markov state models and data classification. Advances in Data Analysis and Classification 7 (2): 147-179
-
pi
¶ The stationary distribution on the MSM states
-
propagate
(p0, k)¶ Propagates the initial distribution p0 k times
Computes the product
\[p_k = p_0^T P^k\]If the lag time of transition matrix \(P\) is \(\tau\), this will provide the probability distribution at time \(k \tau\).
Parameters: - p0 (ndarray(n,)) – Initial distribution. Vector of size of the active set.
- k (int) – Number of time steps
Returns: pk – Distribution after k steps. Vector of size of the active set.
Return type: ndarray(n,)
-
relaxation
(p0, a, maxtime=None, k=None, ncv=None)¶ Simulates a perturbation-relaxation experiment.
In perturbation-relaxation experiments such as temperature-jump, pH-jump, pressure jump or rapid mixing experiments, an ensemble of molecules is initially prepared in an off-equilibrium distribution and the expectation value of some experimental observable is then followed over time as the ensemble relaxes towards equilibrium.
In order to simulate such an experiment, first determine the distribution of states at which the experiment is started, \(p_0\) and compute the mean values of your experimental observable \(a\) by MSM state:
\[a_i = \frac{1}{N_i} \sum_{x_t \in S_i} f(x_t)\]where \(S_i\) is the set of configurations belonging to MSM state \(i\) and \(f()\) is a function that computes the experimental observable of interest for configuration \(x_t\).
Then the accurate (i.e. without statistical error) time-dependent expectation value of \(f(x_t)\) given the Markov model is computed by relaxation(p0, a). This is done by evaluating the equation
\[E_a(k\tau) = \mathbf{p_0}^{\top} \mathbf{P(\tau)}^k \mathbf{a}\]where \(E\) stands for the expectation value that relaxes to its equilibrium value that is identical to expectation(a), \(\mathbf{P(\tau)}\) is the transition matrix at lag time \(\tau\), \(\boldsymbol{\pi}\) is the equilibrium distribution of \(\mathbf{P}\), and \(k\) is the time index.
Note that instead of using this method you could generate many synthetic trajectory from the MSM with starting points drawn from the initial distribution and then estimating the time-dependent expectation value by an ensemble average. However, there is no reason to do this because the present method does that calculation without any sampling, and only in the limit of an infinitely many trajectories the two results will agree exactly. The relaxation function computed by the present method still has statistical uncertainty from the fact that the underlying MSM transition matrix has statistical uncertainty when being estimated from data, but there is no additional (and unnecessary) uncertainty due to synthetic trajectory generation.
Parameters: - p0 ((n,) ndarray) – Initial distribution for a relaxation experiment
- a ((n,) ndarray) – Observable, represented as vector on state space
- maxtime (int or float, optional) – Maximum time (in units of the input trajectory time step) until which the correlation function will be evaluated. Internally, the correlation function can only be computed in integer multiples of the Markov model lag time, and therefore the actual last time point will be computed at \(\mathrm{ceil}(\mathrm{maxtime} / \tau)\). By default (None), the maxtime will be set equal to the 5 times the slowest relaxation time of the MSM, because after this time the signal is constant.
- k (int (optional)) – Number of eigenvalues and eigenvectors to use for computation
- ncv (int (optional)) – Only relevant for sparse matrices and large lag times, where the relaxation will be computes using an eigenvalue decomposition. The number of Lanczos vectors generated, ncv must be greater than k; it is recommended that ncv > 2*k
Returns: - times (ndarray (N)) – Time points (in units of the input trajectory time step) at which the relaxation has been computed
- res (ndarray) – Array of expectation value at given times
-
reversible
¶ Returns whether the MSM is reversible
-
sample_by_distributions
(distributions, nsample)¶ Generates samples according to given probability distributions
Parameters: - distributions (list or array of ndarray ( (n) )) – m distributions over states. Each distribution must be of length n and must sum up to 1.0
- nsample (int) – Number of samples per distribution. If replace = False, the number of returned samples per state could be smaller if less than nsample indexes are available for a state.
Returns: indexes – List of the sampled indices by distribution. Each element is an index array with a number of rows equal to nsample, with rows consisting of a tuple (i, t), where i is the index of the trajectory and t is the time index within the trajectory.
Return type: length m list of ndarray( (nsample, 2) )
-
sample_by_state
(nsample, subset=None, replace=True)¶ Generates samples of the connected states.
For each state in the active set of states, generates nsample samples with trajectory/time indexes. This information can be used in order to generate a trajectory of length nsample * nconnected using
pyemma.coordinates.save_traj()
or nconnected trajectories of length nsample each usingpyemma.coordinates.save_traj()
Parameters: - nsample (int) – Number of samples per state. If replace = False, the number of returned samples per state could be smaller if less than nsample indexes are available for a state.
- subset (ndarray((n)), optional, default = None) – array of states to be indexed. By default all states in the connected set will be used
- replace (boolean, optional) – Whether the sample is with or without replacement
Returns: indexes – list of trajectory/time index arrays with an array for each state. Within each index array, each row consist of a tuple (i, t), where i is the index of the trajectory and t is the time index within the trajectory.
Return type: list of ndarray( (N, 2) )
See also
pyemma.coordinates.save_traj()
- in order to save the sampled frames sequentially in a trajectory file with molecular structures
pyemma.coordinates.save_trajs()
- in order to save the sampled frames in nconnected trajectory files with molecular structures
-
save
(file_name, model_name='default', overwrite=False, save_streaming_chain=False)¶ saves the current state of this object to given file and name.
Parameters: - file_name (str) – path to desired output file
- model_name (str, default='default') – creates a group named ‘model_name’ in the given file, which will contain all of the data. If the name already exists, and overwrite is False (default) will raise a RuntimeError.
- overwrite (bool, default=False) – Should overwrite existing model names?
- save_streaming_chain (boolean, default=False) – if True, the data_producer(s) of this object will also be saved in the given file.
Examples
>>> import pyemma, numpy as np >>> from pyemma.util.contexts import named_temporary_file >>> m = pyemma.msm.MSM(P=np.array([[0.1, 0.9], [0.9, 0.1]]))
>>> with named_temporary_file() as file: # doctest: +SKIP ... m.save(file, 'simple') # doctest: +SKIP ... inst_restored = pyemma.load(file, 'simple') # doctest: +SKIP >>> np.testing.assert_equal(m.P, inst_restored.P) # doctest: +SKIP
-
score
(dtrajs, score_method=None, score_k=None)¶ Scores the MSM using the dtrajs using the variational approach for Markov processes [1]_ [2]_
Currently only implemented using dense matrices - will be slow for large state spaces.
Parameters: - dtrajs (list of arrays) – test data (discrete trajectories).
- score_method (str, optional, default='VAMP2') – Overwrite scoring method if desired. If None, the estimators scoring method will be used. See __init__ for documentation.
- score_k (int or None) – Overwrite scoring rank if desired. If None, the estimators scoring rank will be used. See __init__ for documentation.
- score_method –
Overwrite scoring method to be used if desired. If None, the estimators scoring method will be used. Available scores are based on the variational approach for Markov processes [1]_ [2]_ :
- score_k – The maximum number of eigenvalues or singular values used in the score. If set to None, all available eigenvalues will be used.
References
[1] Noe, F. and F. Nueske: A variational approach to modeling slow processes in stochastic dynamical systems. SIAM Multiscale Model. Simul. 11, 635-655 (2013). [2] Wu, H and F. Noe: Variational approach for learning Markov processes from time series data (in preparation) [3] McGibbon, R and V. S. Pande: Variational cross-validation of slow dynamical modes in molecular kinetics, J. Chem. Phys. 142, 124105 (2015) [4] Noe, F. and C. Clementi: Kinetic distance and kinetic maps from molecular dynamics simulation. J. Chem. Theory Comput. 11, 5002-5011 (2015)
-
score_cv
(dtrajs, n=10, score_method=None, score_k=None)¶ Scores the MSM using the variational approach for Markov processes [1]_ [2]_ and crossvalidation [3]_ .
Divides the data into training and test data, fits a MSM using the training data using the parameters of this estimator, and scores is using the test data. Currently only one way of splitting is implemented, where for each n, the data is randomly divided into two approximately equally large sets of discrete trajectory fragments with lengths of at least the lagtime.
Currently only implemented using dense matrices - will be slow for large state spaces.
Parameters: - dtrajs (list of arrays) – Test data (discrete trajectories).
- n (number of samples) – Number of repetitions of the cross-validation. Use large n to get solid means of the score.
- score_method (str, optional, default='VAMP2') –
Overwrite scoring method to be used if desired. If None, the estimators scoring method will be used. Available scores are based on the variational approach for Markov processes [1]_ [2]_ :
- score_k (int or None) – The maximum number of eigenvalues or singular values used in the score. If set to None, all available eigenvalues will be used.
References
[1] Noe, F. and F. Nueske: A variational approach to modeling slow processes in stochastic dynamical systems. SIAM Multiscale Model. Simul. 11, 635-655 (2013). [2] Wu, H and F. Noe: Variational approach for learning Markov processes from time series data (in preparation). [3] McGibbon, R and V. S. Pande: Variational cross-validation of slow dynamical modes in molecular kinetics, J. Chem. Phys. 142, 124105 (2015). [4] Noe, F. and C. Clementi: Kinetic distance and kinetic maps from molecular dynamics simulation. J. Chem. Theory Comput. 11, 5002-5011 (2015).
-
set_model_params
(P, pi=None, reversible=None, dt_model='1 step', neig=None)¶ Call to set all basic model parameters.
Sets or updates given model parameters. This argument list of this method must contain the full list of essential, or independent model parameters. It can additionally contain derived parameters, e.g. in order to save computational costs of re-computing them.
Parameters: - P (ndarray(n,n)) – transition matrix
- pi (ndarray(n), optional, default=None) – stationary distribution. Can be optionally given in case if it was already computed, e.g. by the estimator.
- reversible (bool, optional, default=None) – whether P is reversible with respect to its stationary distribution. If None (default), will be determined from P
- dt_model (str, optional, default='1 step') –
Description of the physical time corresponding to the model time step. May be used by analysis algorithms such as plotting tools to pretty-print the axes. By default ‘1 step’, i.e. there is no physical time unit. Specify by a number, whitespace and unit. Permitted units are (* is an arbitrary string):
- ’fs’, ‘femtosecond*’
- ’ps’, ‘picosecond*’
- ’ns’, ‘nanosecond*’
- ’us’, ‘microsecond*’
- ’ms’, ‘millisecond*’
- ’s’, ‘second*’
- neig (int or None) – The number of eigenvalues / eigenvectors to be kept. If set to None, defaults will be used. For a dense MSM the default is all eigenvalues. For a sparse MSM the default is 10.
Notes
Explicitly define all independent model parameters in the argument list of this function (by mandatory or keyword arguments)
-
set_params
(**params)¶ Set the parameters of this estimator. The method works on simple estimators as well as on nested objects (such as pipelines). The former have parameters of the form
<component>__<parameter>
so that it’s possible to update each component of a nested object. :returns: :rtype: self
-
simulate
(N, start=None, stop=None, dt=1)¶ Generates a realization of the Markov Model
Parameters: - N (int) – trajectory length in steps of the lag time
- start (int, optional, default = None) – starting hidden state. If not given, will sample from the stationary distribution of the hidden transition matrix.
- stop (int or int-array-like, optional, default = None) – stopping hidden set. If given, the trajectory will be stopped before N steps once a hidden state of the stop set is reached
- dt (int) – trajectory will be saved every dt time steps. Internally, the dt’th power of P is taken to ensure a more efficient simulation.
Returns: htraj – The state trajectory with length N/dt
Return type: (N/dt, ) ndarray
-
sparse
¶ Returns whether the MSM is sparse
-
stationary_distribution
¶ The stationary distribution on the MSM states
-
timescales
(k=None)¶ The relaxation timescales corresponding to the eigenvalues
Parameters: k (int) – number of timescales to be returned. By default all available eigenvalues, minus 1. Returns: ts – relaxation timescales in units of the input trajectory time step, defined by \(-\tau / ln | \lambda_i |, i = 2,...,k+1\). Return type: ndarray(m)
-
timescales_OOM
¶ System timescales estimated by OOM.
-
timestep_model
¶ Physical time corresponding to one transition matrix step, e.g. ‘10 ps’
-
trajectory_weights
()¶ Uses the MSM to assign a probability weight to each trajectory frame.
This is a powerful function for the calculation of arbitrary observables in the trajectories one has started the analysis with. The stationary probability of the MSM will be used to reweigh all states. Returns a list of weight arrays, one for each trajectory, and with a number of elements equal to trajectory frames. Given \(N\) trajectories of lengths \(T_1\) to \(T_N\), this function returns corresponding weights:
\[(w_{1,1}, ..., w_{1,T_1}), (w_{N,1}, ..., w_{N,T_N})\]that are normalized to one:
\[\sum_{i=1}^N \sum_{t=1}^{T_i} w_{i,t} = 1\]Suppose you are interested in computing the expectation value of a function \(a(x)\), where \(x\) are your input configurations. Use this function to compute the weights of all input configurations and obtain the estimated expectation by:
\[\langle a \rangle = \sum_{i=1}^N \sum_{t=1}^{T_i} w_{i,t} a(x_{i,t})\]Or if you are interested in computing the time-lagged correlation between functions \(a(x)\) and \(b(x)\) you could do:
\[\langle a(t) b(t+\tau) \rangle_t = \sum_{i=1}^N \sum_{t=1}^{T_i} w_{i,t} a(x_{i,t}) a(x_{i,t+\tau})\]Returns: weights – The normalized trajectory weights. Given \(N\) trajectories of lengths \(T_1\) to \(T_N\), returns the corresponding weights: \[(w_{1,1}, ..., w_{1,T_1}), (w_{N,1}, ..., w_{N,T_N})\]Return type: list of ndarray
-
transition_matrix
¶ The transition matrix on the active set.
-
update_model_params
(**params)¶ Update given model parameter if they are set to specific values
-