import itertools import json import typing import networkx as nx import numpy as np from networkx.readwrite import json_graph from scipy.stats import chi2 as chi2_dist from scipy.stats import f as f_dist import cache as ch import conditional_intensity_matrix as condim import network_graph as ng import parameters_estimator as pe import sample_path as sp import structure as st class StructureEstimator: """ Has the task of estimating the network structure given the trajectories in samplepath. :sample_path: the sample_path object containing the trajectories and the real structure :exp_test_sign: the significance level for the exponential Hp test :chi_test_alfa: the significance level for the chi Hp test :nodes: the nodes labels :nodes_vals: the nodes cardinalities :nodes_indxs: the nodes indexes :complete_graph: the complete directed graph built using the nodes labels in nodes :cache: the cache object """ def __init__(self, sample_path: sp.SamplePath, exp_test_alfa: float, chi_test_alfa: float): self.sample_path = sample_path self.nodes = np.array(self.sample_path.structure.nodes_labels) self.nodes_vals = self.sample_path.structure.nodes_values self.nodes_indxs = self.sample_path.structure.nodes_indexes self.complete_graph = self.build_complete_graph(self.sample_path.structure.nodes_labels) self.exp_test_sign = exp_test_alfa self.chi_test_alfa = chi_test_alfa self.cache = ch.Cache() def build_complete_graph(self, node_ids: typing.List): """ Builds a complete directed graph (no self loops) given the nodes labels in the list node_ids: Parameters: node_ids: the list of nodes labels Returns: a complete Digraph Object """ complete_graph = nx.DiGraph() complete_graph.add_nodes_from(node_ids) complete_graph.add_edges_from(itertools.permutations(node_ids, 2)) return complete_graph def complete_test(self, test_parent: str, test_child: str, parent_set: typing.List, child_states_numb: int, tot_vars_count: int): """ Permorms a complete independence test on the directed graphs G1 = test_child U parent_set G2 = G1 U test_parent (added as an additional parent of the test_child). Generates all the necessary structures and datas to perform the tests. Parameters: test_parent: the node label of the test parent test_child: the node label of the child parent_set: the common parent set child_states_numb: the cardinality of the test_child tot_vars_count_ the total number of variables in the net Returns: True iff test_child and test_parent are independent given the sep_set parent_set False otherwise """ #print("Test Parent:", test_parent) #print("Sep Set", parent_set) p_set = parent_set[:] complete_info = parent_set[:] complete_info.append(test_child) parents = np.array(parent_set) parents = np.append(parents, test_parent) #print("PARENTS", parents) #parents.sort() sorted_parents = self.nodes[np.isin(self.nodes, parents)] #print("SORTED PARENTS", sorted_parents) cims_filter = sorted_parents != test_parent #print("PARENTS NO FROM MASK", cims_filter) #if not p_set: #print("EMPTY PSET TRYING TO FIND", test_child) #sofc1 = self.cache.find(test_child) #else: sofc1 = self.cache.find(set(p_set)) if not sofc1: #print("CACHE MISSS SOFC1") bool_mask1 = np.isin(self.nodes,complete_info) #print("Bool mask 1", bool_mask1) l1 = list(self.nodes[bool_mask1]) #print("L1", l1) indxs1 = self.nodes_indxs[bool_mask1] #print("INDXS 1", indxs1) vals1 = self.nodes_vals[bool_mask1] eds1 = list(itertools.product(parent_set,test_child)) s1 = st.Structure(l1, indxs1, vals1, eds1, tot_vars_count) g1 = ng.NetworkGraph(s1) g1.fast_init(test_child) p1 = pe.ParametersEstimator(self.sample_path, g1) p1.fast_init(test_child) sofc1 = p1.compute_parameters_for_node(test_child) #if not p_set: #self.cache.put(test_child, sofc1) #else: self.cache.put(set(p_set), sofc1) sofc2 = None #p_set.append(test_parent) p_set.insert(0, test_parent) if p_set: #print("FULL PSET TRYING TO FIND", p_set) #p_set.append(test_parent) #print("PSET ", p_set) #set_p_set = set(p_set) sofc2 = self.cache.find(set(p_set)) #if sofc2: #print("Sofc2 in CACHE ", sofc2.actual_cims) #print(self.cache.list_of_sets_of_indxs) if not sofc2: #print("Cache MISSS SOFC2") complete_info.append(test_parent) bool_mask2 = np.isin(self.nodes, complete_info) #print("BOOL MASK 2",bool_mask2) l2 = list(self.nodes[bool_mask2]) #print("L2", l2) indxs2 = self.nodes_indxs[bool_mask2] #print("INDXS 2", indxs2) vals2 = self.nodes_vals[bool_mask2] eds2 = list(itertools.product(p_set, test_child)) s2 = st.Structure(l2, indxs2, vals2, eds2, tot_vars_count) g2 = ng.NetworkGraph(s2) g2.fast_init(test_child) p2 = pe.ParametersEstimator(self.sample_path, g2) p2.fast_init(test_child) sofc2 = p2.compute_parameters_for_node(test_child) self.cache.put(set(p_set), sofc2) for cim1, p_comb in zip(sofc1.actual_cims, sofc1.p_combs): #print("GETTING THIS P COMB", p_comb) #if len(parent_set) > 1: cond_cims = sofc2.filter_cims_with_mask(cims_filter, p_comb) #else: #cond_cims = sofc2.actual_cims #print("COnd Cims", cond_cims) for cim2 in cond_cims: #cim2 = sofc2.actual_cims[j] #print(indx) #print("Run Test", i, j) if not self.independence_test(child_states_numb, cim1, cim2): return False return True def independence_test(self, child_states_numb: int, cim1: condim.ConditionalIntensityMatrix, cim2: condim.ConditionalIntensityMatrix): """ Compute the actual independence test using two cims. It is performed first the exponential test and if the null hypothesis is not rejected, it is permormed also the chi_test. Parameters: child_states_numb: the cardinality of the test child cim1: a cim belonging to the graph without test parent cim2: a cim belonging to the graph with test parent Returns: True iff both tests do NOT reject the null hypothesis of indipendence False otherwise """ M1 = cim1.state_transition_matrix M2 = cim2.state_transition_matrix r1s = M1.diagonal() r2s = M2.diagonal() C1 = cim1.cim C2 = cim2.cim F_stats = C2.diagonal() / C1.diagonal() exp_alfa = self.exp_test_sign for val in range(0, child_states_numb): if F_stats[val] < f_dist.ppf(exp_alfa / 2, r1s[val], r2s[val]) or \ F_stats[val] > f_dist.ppf(1 - exp_alfa / 2, r1s[val], r2s[val]): #print("CONDITIONALLY DEPENDENT EXP") return False #M1_no_diag = self.remove_diagonal_elements(cim1.state_transition_matrix) #M2_no_diag = self.remove_diagonal_elements(cim2.state_transition_matrix) M1_no_diag = M1[~np.eye(M1.shape[0], dtype=bool)].reshape(M1.shape[0], -1) M2_no_diag = M2[~np.eye(M2.shape[0], dtype=bool)].reshape( M2.shape[0], -1) chi_2_quantile = chi2_dist.ppf(1 - self.chi_test_alfa, child_states_numb - 1) """ Ks = np.sqrt(cim1.state_transition_matrix.diagonal() / cim2.state_transition_matrix.diagonal()) Ls = np.reciprocal(Ks) chi_stats = np.sum((np.power((M2_no_diag.T * Ks).T - (M1_no_diag.T * Ls).T, 2) \ / (M1_no_diag + M2_no_diag)), axis=1)""" Ks = np.sqrt(r1s / r2s) Ls = np.sqrt(r2s / r1s) for val in range(0, child_states_numb): #K = math.sqrt(cim1.state_transition_matrix[val][val] / cim2.state_transition_matrix[val][val]) #L = 1 / K Chi = np.sum(np.power(Ks[val] * M2_no_diag[val] - Ls[val] *M1_no_diag[val], 2) / (M1_no_diag[val] + M2_no_diag[val])) #print("Chi Stats", Chi) #print("Chi Quantile", chi_2_quantile) if Chi > chi_2_quantile: #if np.any(chi_stats > chi_2_quantile): #print("CONDITIONALLY DEPENDENT CHI") return False #print("Chi test", Chi) return True def one_iteration_of_CTPC_algorithm(self, var_id: str, tot_vars_count: int): """ Performs an iteration of the CTPC algorithm using the node var_id as test_child. Parameters: var_id: the node label of the test child tot_vars_count: the number of nodes in the net Returns: void """ print("##################TESTING VAR################", var_id) u = list(self.complete_graph.predecessors(var_id)) #tests_parents_numb = len(u) #complete_frame = self.complete_graph_frame #test_frame = complete_frame.loc[complete_frame['To'].isin([var_id])] child_states_numb = self.sample_path.structure.get_states_number(var_id) b = 0 while b < len(u): #for parent_id in u: parent_indx = 0 while parent_indx < len(u): removed = False #if not list(self.generate_possible_sub_sets_of_size(u, b, u[parent_indx])): #break S = self.generate_possible_sub_sets_of_size(u, b, u[parent_indx]) #print("U Set", u) #print("S", S) test_parent = u[parent_indx] #print("Test Parent", test_parent) for parents_set in S: #print("Parent Set", parents_set) #print("Test Parent", test_parent) if self.complete_test(test_parent, var_id, parents_set, child_states_numb, tot_vars_count): #print("Removing EDGE:", test_parent, var_id) self.complete_graph.remove_edge(test_parent, var_id) u.remove(test_parent) removed = True break #else: #parent_indx += 1 if not removed: parent_indx += 1 b += 1 self.cache.clear() def generate_possible_sub_sets_of_size(self, u: typing.List, size: int, parent_label: str): """ Creates a list containing all possible subsets of the list u of size size, that do not contains a the node identified by parent_label. Parameters: u: the list of nodes size: the size of the subsets parent_label: the nodes to exclude in the subsets generation Returns: a Map Object containing a list of lists """ list_without_test_parent = u[:] list_without_test_parent.remove(parent_label) return map(list, itertools.combinations(list_without_test_parent, size)) def ctpc_algorithm(self): """ Compute the CTPC algorithm. Parameters: void Returns: void """ ctpc_algo = self.one_iteration_of_CTPC_algorithm total_vars_numb = self.sample_path.total_variables_count [ctpc_algo(n, total_vars_numb) for n in self.nodes] def save_results(self): """ Save the estimated Structure to a .json file Parameters: void Returns: void """ res = json_graph.node_link_data(self.complete_graph) name = self.sample_path.importer.file_path.rsplit('/',1)[-1] #print(name) name = 'results_' + name with open(name, 'w') as f: json.dump(res, f) def remove_diagonal_elements(self, matrix): m = matrix.shape[0] strided = np.lib.stride_tricks.as_strided s0, s1 = matrix.strides return strided(matrix.ravel()[1:], shape=(m - 1, m), strides=(s0 + s1, s1)).reshape(m, -1)