コード例 #1
0
    def _clustering(self, n_neighbours):
        """Clusters the subgraph using using a `k` value (number of neighbours).

        Args:
            n_neighbours (int): Number of neighbours to be used. 

        """

        # For every possible node
        for i in range(self.subgraph.n_nodes):
            # For every possible `k` value
            for k in range(n_neighbours):
                # Gathers node `i` adjacent node
                j = int(self.subgraph.nodes[i].adjacency[k])

                # If both nodes' density are equal
                if self.subgraph.nodes[i].density == self.subgraph.nodes[
                        j].density:
                    # Turns on the insertion flag
                    insert = True

                    # For every possible `l` value
                    for l in range(n_neighbours):
                        # Gathers node `j` adjacent node
                        adj = int(self.subgraph.nodes[j].adjacency[l])

                        # If the nodes are the same
                        if i == adj:
                            # Turns off the insertion flag
                            insert = False

                        # If it is supposed to be inserted
                        if insert:
                            # Inserts node `i` in the adjacency list of `j`
                            self.subgraph.nodes[j].adjacency.insert(0, i)

                            # Increments the amount of adjacent nodes
                            self.subgraph.nodes[j].n_plateaus += 1

        # Creating a maximum heap
        h = Heap(size=self.subgraph.n_nodes, policy='max')

        # For every possible node
        for i in range(self.subgraph.n_nodes):
            # Updates the node's cost on the heap
            h.cost[i] = self.subgraph.nodes[i].cost

            # Defines node's `i` predecessor as NIL
            self.subgraph.nodes[i].pred = c.NIL

            # And its root as its same identifier
            self.subgraph.nodes[i].root = i

            # Inserts the node in the heap
            h.insert(i)

        # Defining an `l` counter
        l = 0

        # While the heap is not empty
        while not h.is_empty():
            # Removes a node
            p = h.remove()

            # Appends its index to the ordered list
            self.subgraph.idx_nodes.append(p)

            # If the node's predecessor is NIL
            if self.subgraph.nodes[p].pred == c.NIL:
                # Updates its cost on the heap
                h.cost[p] = self.subgraph.nodes[p].density

                # Defines its cluster label as `l`
                self.subgraph.nodes[p].cluster_label = l

                # Increments the cluster identifier
                l += 1

            # Apply current node's cost as the heap's cost
            self.subgraph.nodes[p].cost = h.cost[p]

            # Calculates the number of its adjacent nodes
            n_adjacents = self.subgraph.nodes[p].n_plateaus + n_neighbours

            # For every possible adjacent node
            for k in range(n_adjacents):
                # Gathers the adjacent identifier
                q = int(self.subgraph.nodes[p].adjacency[k])

                # If its color in the heap is different from `BLACK`
                if h.color[q] != c.BLACK:
                    # Calculates the current cost
                    current_cost = np.minimum(h.cost[p],
                                              self.subgraph.nodes[q].density)

                    # If temporary cost is bigger than heap's cost
                    if current_cost > h.cost[q]:
                        # Apply `q` predecessor as `p`
                        self.subgraph.nodes[q].pred = p

                        # Gathers the same root's identifier
                        self.subgraph.nodes[q].root = self.subgraph.nodes[
                            p].root

                        # And its cluster label
                        self.subgraph.nodes[
                            q].cluster_label = self.subgraph.nodes[
                                p].cluster_label

                        # Updates the heap `q` node and the current cost
                        h.update(q, current_cost)

        # The final number of clusters will be equal to `l`
        self.subgraph.n_clusters = l
コード例 #2
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    def _clustering(self, force_prototype=False):
        """Clusters the subgraph.

        Args:
            force_prototype (bool): Whether clustering should for each class to have at least one prototype.

        """

        for i in range(self.subgraph.n_nodes):
            # For every adjacent node of `i`
            for j in self.subgraph.nodes[i].adjacency:
                # Making sure that variable is an integer
                j = int(j)

                # Checks if node `i` density is equals as node `j` density
                if self.subgraph.nodes[i].density == self.subgraph.nodes[
                        j].density:
                    # Marks the insertion flag as True
                    insert = True

                    # For every adjacent node of `j`
                    for l in self.subgraph.nodes[j].adjacency:
                        # Making sure that variable is an integer
                        l = int(l)

                        # Checks if it is the same node as `i`
                        if i == l:
                            insert = False

                    if insert:
                        self.subgraph.nodes[j].adjacency.insert(0, i)

        # Creating a maximum heap
        h = Heap(size=self.subgraph.n_nodes, policy='max')

        for i in range(self.subgraph.n_nodes):
            # Updates the node's cost on the heap
            h.cost[i] = self.subgraph.nodes[i].cost

            # Defines node's `i` predecessor as NIL
            self.subgraph.nodes[i].pred = c.NIL

            # And its root as its same identifier
            self.subgraph.nodes[i].root = i

            # Inserts the node in the heap
            h.insert(i)

        while not h.is_empty():
            p = h.remove()

            # Appends its index to the ordered list
            self.subgraph.idx_nodes.append(p)

            if self.subgraph.nodes[p].pred == c.NIL:
                # Updates its cost on the heap
                h.cost[p] = self.subgraph.nodes[p].density

                # Defines its predicted label as the node's true label
                self.subgraph.nodes[p].predicted_label = self.subgraph.nodes[
                    p].label

            # Apply current node's cost as the heap's cost
            self.subgraph.nodes[p].cost = h.cost[p]

            # For every possible adjacent node
            for q in self.subgraph.nodes[p].adjacency:
                # Making sure that variable is an integer
                q = int(q)

                if h.color[q] != c.BLACK:
                    current_cost = np.minimum(h.cost[p],
                                              self.subgraph.nodes[q].density)

                    # If prototypes should be forced to belong to a class
                    if force_prototype:
                        if self.subgraph.nodes[p].label != self.subgraph.nodes[
                                q].label:
                            current_cost = -c.FLOAT_MAX

                    # If current cost is bigger than heap's cost
                    if current_cost > h.cost[q]:
                        # Apply `q` predecessor as `p`
                        self.subgraph.nodes[q].pred = p

                        # Gathers the same root's identifier
                        self.subgraph.nodes[q].root = self.subgraph.nodes[
                            p].root

                        # And its cluster label
                        self.subgraph.nodes[
                            q].predicted_label = self.subgraph.nodes[
                                p].predicted_label

                        # Updates node `q` on the heap with the current cost
                        h.update(q, current_cost)
コード例 #3
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ファイル: supervised.py プロジェクト: guibmartins/opfython
    def _find_prototypes(self):
        """Find prototype nodes using the Minimum Spanning Tree (MST) approach.

        """

        logger.debug('Finding prototypes ...')

        # Creating a Heap of size equals to number of nodes
        h = Heap(self.subgraph.n_nodes)

        # Marking first node without any predecessor
        self.subgraph.nodes[0].pred = c.NIL

        # Adding first node to the heap
        h.insert(0)

        # Creating a list of prototype nodes
        prototypes = []

        while not h.is_empty():
            # Remove a node from the heap
            p = h.remove()

            # Gathers its cost from the heap
            self.subgraph.nodes[p].cost = h.cost[p]

            # And also its predecessor
            pred = self.subgraph.nodes[p].pred

            if pred != c.NIL:
                # Checks if the label of current node is the same as its predecessor
                if self.subgraph.nodes[p].label != self.subgraph.nodes[pred].label:
                    # If current node is not a prototype
                    if self.subgraph.nodes[p].status != c.PROTOTYPE:
                        # Marks it as a prototype
                        self.subgraph.nodes[p].status = c.PROTOTYPE

                        # Appends current node identifier to the prototype's list
                        prototypes.append(p)

                    # If predecessor node is not a prototype
                    if self.subgraph.nodes[pred].status != c.PROTOTYPE:
                        # Marks it as a protoype
                        self.subgraph.nodes[pred].status = c.PROTOTYPE

                        # Appends predecessor node identifier to the prototype's list
                        prototypes.append(pred)

            for q in range(self.subgraph.n_nodes):
                if h.color[q] != c.BLACK:
                    if p != q:
                        if self.pre_computed_distance:
                            weight = self.pre_distances[self.subgraph.nodes[p].idx][self.subgraph.nodes[q].idx]

                        else:
                            weight = self.distance_fn(self.subgraph.nodes[p].features, self.subgraph.nodes[q].features)

                        if weight < h.cost[q]:
                            # Marks `q` predecessor node as `p`
                            self.subgraph.nodes[q].pred = p

                            # Updates the arc on the heap
                            h.update(q, weight)

        logger.debug('Prototypes: %s.', prototypes)
コード例 #4
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ファイル: supervised.py プロジェクト: guibmartins/opfython
    def fit(self, X_train, Y_train, I_train=None):
        """Fits data in the classifier.

        Args:
            X_train (np.array): Array of training features.
            Y_train (np.array): Array of training labels.
            I_train (np.array): Array of training indexes.

        """

        logger.info('Fitting classifier ...')

        start = time.time()

        # Creating a subgraph
        self.subgraph = Subgraph(X_train, Y_train, I=I_train)

        # Finding prototypes
        self._find_prototypes()

        # Creating a minimum heap
        h = Heap(size=self.subgraph.n_nodes)

        for i in range(self.subgraph.n_nodes):
            if self.subgraph.nodes[i].status == c.PROTOTYPE:
                # If yes, it does not have predecessor nodes
                self.subgraph.nodes[i].pred = c.NIL

                # Its predicted label is the same as its true label
                self.subgraph.nodes[i].predicted_label = self.subgraph.nodes[i].label

                # Its cost equals to zero
                h.cost[i] = 0

                # Inserts the node into the heap
                h.insert(i)

            else:
                # Its cost equals to maximum possible value
                h.cost[i] = c.FLOAT_MAX

        while not h.is_empty():
            # Removes a node
            p = h.remove()

            # Appends its index to the ordered list
            self.subgraph.idx_nodes.append(p)

            # Gathers its cost
            self.subgraph.nodes[p].cost = h.cost[p]

            for q in range(self.subgraph.n_nodes):
                if p != q:
                    if h.cost[p] < h.cost[q]:
                        if self.pre_computed_distance:
                            weight = self.pre_distances[self.subgraph.nodes[p].idx][self.subgraph.nodes[q].idx]

                        else:
                            weight = self.distance_fn(self.subgraph.nodes[p].features, self.subgraph.nodes[q].features)

                        # The current cost will be the maximum cost between the node's and its weight (arc)
                        current_cost = np.maximum(h.cost[p], weight)

                        if current_cost < h.cost[q]:
                            # `q` node has `p` as its predecessor
                            self.subgraph.nodes[q].pred = p

                            # And its predicted label is the same as `p`
                            self.subgraph.nodes[q].predicted_label = self.subgraph.nodes[p].predicted_label

                            # Updates the heap `q` node and the current cost
                            h.update(q, current_cost)

        # The subgraph has been properly trained
        self.subgraph.trained = True

        end = time.time()

        train_time = end - start

        logger.info('Classifier has been fitted.')
        logger.info('Training time: %s seconds.', train_time)
コード例 #5
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from opfython.core import Heap

# Defining the maximum size of heap
size = 5

# Creating the heap
h = Heap(size=size, policy='min')

# Inserting a new node
h.insert(1)

# Removing the node
n = h.remove()
コード例 #6
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    def fit(self, X_train, Y_train, X_unlabeled, I_train=None):
        """Fits data in the semi-supervised classifier.

        Args:
            X_train (np.array): Array of training features.
            Y_train (np.array): Array of training labels.
            X_unlabeled (np.array): Array of unlabeled features.
            I_train (np.array): Array of training indexes.

        """

        logger.info('Fitting semi-supervised classifier ...')

        # Initializing the timer
        start = time.time()

        # Creating a subgraph
        self.subgraph = Subgraph(X_train, Y_train, I_train)

        # Finding prototypes
        self._find_prototypes()

        # Gather current number of nodes
        current_n_nodes = self.subgraph.n_nodes

        # Iterate over every possible unlabeled sample
        for i, feature in enumerate(X_unlabeled):
            # Creates a Node structure
            node = Node(current_n_nodes + i, 1, feature)

            # Appends the node to the list
            self.subgraph.nodes.append(node)

        # Creating a minimum heap
        h = Heap(size=self.subgraph.n_nodes)

        # For each possible node
        for i in range(self.subgraph.n_nodes):
            # Checks if node is a prototype
            if self.subgraph.nodes[i].status == c.PROTOTYPE:
                # If yes, it does not have predecessor nodes
                self.subgraph.nodes[i].pred = c.NIL

                # Its predicted label is the same as its true label
                self.subgraph.nodes[i].predicted_label = self.subgraph.nodes[
                    i].label

                # Its cost equals to zero
                h.cost[i] = 0

                # Inserts the node into the heap
                h.insert(i)

            # If node is not a prototype
            else:
                # Its cost equals to maximum possible value
                h.cost[i] = c.FLOAT_MAX

        # While the heap is not empty
        while not h.is_empty():
            # Removes a node
            p = h.remove()

            # Appends its index to the ordered list
            self.subgraph.idx_nodes.append(p)

            # Gathers its cost
            self.subgraph.nodes[p].cost = h.cost[p]

            # For every possible node
            for q in range(self.subgraph.n_nodes):
                # If we are dealing with different nodes
                if p != q:
                    # If `p` node cost is smaller than `q` node cost
                    if h.cost[p] < h.cost[q]:
                        # Checks if we are using a pre-computed distance
                        if self.pre_computed_distance:
                            # Gathers the distance from the distance's matrix
                            weight = self.pre_distances[self.subgraph.nodes[
                                p].idx][self.subgraph.nodes[q].idx]

                        # If the distance is supposed to be calculated
                        else:
                            # Calls the corresponding distance function
                            weight = self.distance_fn(
                                self.subgraph.nodes[p].features,
                                self.subgraph.nodes[q].features)

                        # The current cost will be the maximum cost between the node's and its weight (arc)
                        current_cost = np.maximum(h.cost[p], weight)

                        # If current cost is smaller than `q` node's cost
                        if current_cost < h.cost[q]:
                            # `q` node has `p` as its predecessor
                            self.subgraph.nodes[q].pred = p

                            # And its predicted label is the same as `p`
                            self.subgraph.nodes[
                                q].predicted_label = self.subgraph.nodes[
                                    p].predicted_label

                            # As we may have unlabeled nodes, make sure that `q` label equals to `q` predicted label
                            self.subgraph.nodes[q].label = self.subgraph.nodes[
                                q].predicted_label

                            # Updates the heap `q` node and the current cost
                            h.update(q, current_cost)

        # The subgraph has been properly trained
        self.subgraph.trained = True

        # Ending timer
        end = time.time()

        # Calculating training task time
        train_time = end - start

        logger.info('Semi-supervised classifier has been fitted.')
        logger.info('Training time: %s seconds.', train_time)
コード例 #7
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    def _find_prototypes(self):
        """Find prototype nodes using the Minimum Spanning Tree (MST) approach.

        """

        logger.debug('Finding prototypes ...')

        # Creating a Heap of size equals to number of nodes
        h = Heap(self.subgraph.n_nodes)

        # Marking first node without any predecessor
        self.subgraph.nodes[0].pred = c.NIL

        # Adding first node to the heap
        h.insert(0)

        # Creating a list of prototype nodes
        prototypes = []

        # While the heap is not empty
        while not h.is_empty():
            # Remove a node from the heap
            p = h.remove()

            # Gathers its cost from the heap
            self.subgraph.nodes[p].cost = h.cost[p]

            # And also its predecessor
            pred = self.subgraph.nodes[p].pred

            # If the predecessor is not NIL
            if pred != c.NIL:
                # Checks if the label of current node is the same as its predecessor
                if self.subgraph.nodes[p].label != self.subgraph.nodes[
                        pred].label:
                    # If current node is not a prototype
                    if self.subgraph.nodes[p].status != c.PROTOTYPE:
                        # Marks it as a prototype
                        self.subgraph.nodes[p].status = c.PROTOTYPE

                        # Appends current node identifier to the prototype's list
                        prototypes.append(p)

                    # If predecessor node is not a prototype
                    if self.subgraph.nodes[pred].status != c.PROTOTYPE:
                        # Marks it as a protoype
                        self.subgraph.nodes[pred].status = c.PROTOTYPE

                        # Appends predecessor node identifier to the prototype's list
                        prototypes.append(pred)

            # For every possible node
            for q in range(self.subgraph.n_nodes):
                # Checks if the color of current node in the heap is not black
                if h.color[q] != c.BLACK:
                    # If `p` and `q` identifiers are different
                    if p != q:
                        # If it is supposed to use pre-computed distances
                        if self.pre_computed_distance:
                            # Gathers the arc from the distances' matrix
                            weight = self.pre_distances[self.subgraph.nodes[
                                p].idx][self.subgraph.nodes[q].idx]

                        # If distance is supposed to be calculated
                        else:
                            # Calculates the distance
                            weight = self.distance_fn(
                                self.subgraph.nodes[p].features,
                                self.subgraph.nodes[q].features)

                        # If current arc's cost is smaller than the path's cost
                        if weight < h.cost[q]:
                            # Marks `q` predecessor node as `p`
                            self.subgraph.nodes[q].pred = p

                            # Updates the arc on the heap
                            h.update(q, weight)

        logger.debug('Prototypes: %s.', prototypes)