forked from moreo/QuaPy
Merge pull request #13 from pglez82/dys_implementation
Dys implementation
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543003f914
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@ -78,6 +78,12 @@ def HellingerDistance(P, Q):
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"""
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return np.sqrt(np.sum((np.sqrt(P) - np.sqrt(Q))**2))
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def TopsoeDistance(P, Q, epsilon=1e-20):
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""" Topsoe
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"""
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return np.sum(P*np.log((2*P+epsilon)/(P+Q+epsilon)) +
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Q*np.log((2*Q+epsilon)/(P+Q+epsilon)))
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def uniform_prevalence_sampling(n_classes, size=1):
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"""
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@ -19,6 +19,8 @@ AGGREGATIVE_METHODS = {
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aggregative.PACC,
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aggregative.EMQ,
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aggregative.HDy,
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aggregative.DyS,
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aggregative.SMM,
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aggregative.X,
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aggregative.T50,
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aggregative.MAX,
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@ -1,6 +1,6 @@
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from abc import abstractmethod
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from copy import deepcopy
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from typing import Union
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from typing import Callable, Union
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import numpy as np
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from joblib import Parallel, delayed
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from sklearn.base import BaseEstimator
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@ -638,6 +638,119 @@ class HDy(AggregativeProbabilisticQuantifier, BinaryQuantifier):
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return np.asarray([1 - class1_prev, class1_prev])
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class DyS(AggregativeProbabilisticQuantifier, BinaryQuantifier):
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"""
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`DyS framework <https://ojs.aaai.org/index.php/AAAI/article/view/4376>`_ (DyS).
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DyS is a generalization of HDy method, using a Ternary Search in order to find the prevalence that
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minimizes the distance between distributions.
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Details for the ternary search have been got from <https://dl.acm.org/doi/pdf/10.1145/3219819.3220059>
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:param learner: a sklearn's Estimator that generates a binary classifier
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:param val_split: a float in range (0,1) indicating the proportion of data to be used as a stratified held-out
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validation distribution, or a :class:`quapy.data.base.LabelledCollection` (the split itself).
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:param n_bins: an int with the number of bins to use to compute the histograms.
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:param distance: an str with a distance already included in the librar (HD or topsoe), of a function
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that computes the distance between two distributions.
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:param tol: a float with the tolerance for the ternary search algorithm.
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"""
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def __init__(self, learner: BaseEstimator, val_split=0.4, n_bins=8, distance: Union[str, Callable]='HD', tol=1e-05):
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self.learner = learner
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self.val_split = val_split
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self.tol = tol
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self.distance = distance
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self.n_bins = n_bins
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def _ternary_search(self, f, left, right, tol):
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"""
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Find maximum of unimodal function f() within [left, right]
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"""
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while abs(right - left) >= tol:
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left_third = left + (right - left) / 3
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right_third = right - (right - left) / 3
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if f(left_third) > f(right_third):
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left = left_third
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else:
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right = right_third
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# Left and right are the current bounds; the maximum is between them
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return (left + right) / 2
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def _compute_distance(self, Px_train, Px_test, distance: Union[str, Callable]='HD'):
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if distance=='HD':
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return F.HellingerDistance(Px_train, Px_test)
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elif distance=='topsoe':
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return F.TopsoeDistance(Px_train, Px_test)
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else:
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return distance(Px_train, Px_test)
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def fit(self, data: LabelledCollection, fit_learner=True, val_split: Union[float, LabelledCollection] = None):
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if val_split is None:
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val_split = self.val_split
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self._check_binary(data, self.__class__.__name__)
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self.learner, validation = _training_helper(
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self.learner, data, fit_learner, ensure_probabilistic=True, val_split=val_split)
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Px = self.classify(validation.instances)[:, 1] # takes only the P(y=+1|x)
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self.Pxy1 = Px[validation.labels == self.learner.classes_[1]]
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self.Pxy0 = Px[validation.labels == self.learner.classes_[0]]
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self.Pxy1_density = np.histogram(self.Pxy1, bins=self.n_bins, range=(0, 1), density=True)[0]
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self.Pxy0_density = np.histogram(self.Pxy0, bins=self.n_bins, range=(0, 1), density=True)[0]
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return self
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def aggregate(self, classif_posteriors):
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Px = classif_posteriors[:, 1] # takes only the P(y=+1|x)
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Px_test = np.histogram(Px, bins=self.n_bins, range=(0, 1), density=True)[0]
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def distribution_distance(prev):
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Px_train = prev * self.Pxy1_density + (1 - prev) * self.Pxy0_density
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return self._compute_distance(Px_train,Px_test,self.distance)
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class1_prev = self._ternary_search(f=distribution_distance, left=0, right=1, tol=self.tol)
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return np.asarray([1 - class1_prev, class1_prev])
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class SMM(AggregativeProbabilisticQuantifier, BinaryQuantifier):
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"""
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`SMM method <https://ieeexplore.ieee.org/document/9260028>`_ (SMM).
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SMM is a simplification of matching distribution methods where the representation of the examples
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is created using the mean instead of a histogram.
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:param learner: a sklearn's Estimator that generates a binary classifier.
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:param val_split: a float in range (0,1) indicating the proportion of data to be used as a stratified held-out
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validation distribution, or a :class:`quapy.data.base.LabelledCollection` (the split itself).
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"""
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def __init__(self, learner: BaseEstimator, val_split=0.4):
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self.learner = learner
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self.val_split = val_split
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def fit(self, data: LabelledCollection, fit_learner=True, val_split: Union[float, LabelledCollection] = None):
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if val_split is None:
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val_split = self.val_split
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self._check_binary(data, self.__class__.__name__)
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self.learner, validation = _training_helper(
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self.learner, data, fit_learner, ensure_probabilistic=True, val_split=val_split)
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Px = self.classify(validation.instances)[:, 1] # takes only the P(y=+1|x)
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self.Pxy1 = Px[validation.labels == self.learner.classes_[1]]
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self.Pxy0 = Px[validation.labels == self.learner.classes_[0]]
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self.Pxy1_mean = np.mean(self.Pxy1)
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self.Pxy0_mean = np.mean(self.Pxy0)
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return self
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def aggregate(self, classif_posteriors):
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Px = classif_posteriors[:, 1] # takes only the P(y=+1|x)
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Px_mean = np.mean(Px)
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class1_prev = (Px_mean - self.Pxy0_mean)/(self.Pxy1_mean - self.Pxy0_mean)
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class1_prev = np.clip(class1_prev, 0, 1)
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return np.asarray([1 - class1_prev, class1_prev])
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class ELM(AggregativeQuantifier, BinaryQuantifier):
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"""
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Class of Explicit Loss Minimization (ELM) quantifiers.
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@ -83,7 +83,8 @@ class GridSearchQ(BaseQuantifier):
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tinit = time()
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hyper = [dict({k: values[i] for i, k in enumerate(params_keys)}) for values in itertools.product(*params_values)]
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scores = qp.util.parallel(self._delayed_eval, ((params, training) for params in hyper), n_jobs=self.n_jobs)
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#pass a seed to parallel so it is set in clild processes
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scores = qp.util.parallel(self._delayed_eval, ((params, training) for params in hyper), seed=qp.environ.get('_R_SEED', None), n_jobs=self.n_jobs)
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for params, score, model in scores:
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if score is not None:
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@ -5,6 +5,7 @@ import os
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import pickle
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import urllib
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from pathlib import Path
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from contextlib import ExitStack
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import quapy as qp
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import numpy as np
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@ -36,7 +37,7 @@ def map_parallel(func, args, n_jobs):
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return list(itertools.chain.from_iterable(results))
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def parallel(func, args, n_jobs):
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def parallel(func, args, n_jobs, seed = None):
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"""
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A wrapper of multiprocessing:
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@ -44,14 +45,20 @@ def parallel(func, args, n_jobs):
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>>> delayed(func)(args_i) for args_i in args
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>>> )
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that takes the `quapy.environ` variable as input silently
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that takes the `quapy.environ` variable as input silently.
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Seeds the child processes to ensure reproducibility when n_jobs>1
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"""
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def func_dec(environ, *args):
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def func_dec(environ, seed, *args):
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qp.environ = environ.copy()
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qp.environ['N_JOBS'] = 1
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return func(*args)
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#set a context with a temporal seed to ensure results are reproducibles in parallel
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with ExitStack() as stack:
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if seed is not None:
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stack.enter_context(qp.util.temp_seed(seed))
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return func(*args)
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return Parallel(n_jobs=n_jobs)(
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delayed(func_dec)(qp.environ, args_i) for args_i in args
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delayed(func_dec)(qp.environ, None if seed is None else seed+i, args_i) for i, args_i in enumerate(args)
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)
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@ -66,6 +73,8 @@ def temp_seed(random_state):
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:param random_state: the seed to set within the "with" context
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"""
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state = np.random.get_state()
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#save the seed just in case is needed (for instance for setting the seed to child processes)
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qp.environ['_R_SEED'] = random_state
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np.random.seed(random_state)
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try:
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yield
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