Mercurial > repos > shellac > sam_consensus_v3
view env/lib/python3.9/site-packages/networkx/generators/joint_degree_seq.py @ 0:4f3585e2f14b draft default tip
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| author | shellac |
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| date | Mon, 22 Mar 2021 18:12:50 +0000 |
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"""Generate graphs with a given joint degree and directed joint degree""" import networkx as nx from networkx.utils import py_random_state __all__ = [ "is_valid_joint_degree", "is_valid_directed_joint_degree", "joint_degree_graph", "directed_joint_degree_graph", ] def is_valid_joint_degree(joint_degrees): """ Checks whether the given joint degree dictionary is realizable. A *joint degree dictionary* is a dictionary of dictionaries, in which entry ``joint_degrees[k][l]`` is an integer representing the number of edges joining nodes of degree *k* with nodes of degree *l*. Such a dictionary is realizable as a simple graph if and only if the following conditions are satisfied. - each entry must be an integer, - the total number of nodes of degree *k*, computed by ``sum(joint_degrees[k].values()) / k``, must be an integer, - the total number of edges joining nodes of degree *k* with nodes of degree *l* cannot exceed the total number of possible edges, - each diagonal entry ``joint_degrees[k][k]`` must be even (this is a convention assumed by the :func:`joint_degree_graph` function). Parameters ---------- joint_degrees : dictionary of dictionary of integers A joint degree dictionary in which entry ``joint_degrees[k][l]`` is the number of edges joining nodes of degree *k* with nodes of degree *l*. Returns ------- bool Whether the given joint degree dictionary is realizable as a simple graph. References ---------- .. [1] M. Gjoka, M. Kurant, A. Markopoulou, "2.5K Graphs: from Sampling to Generation", IEEE Infocom, 2013. .. [2] I. Stanton, A. Pinar, "Constructing and sampling graphs with a prescribed joint degree distribution", Journal of Experimental Algorithmics, 2012. """ degree_count = {} for k in joint_degrees: if k > 0: k_size = sum(joint_degrees[k].values()) / k if not k_size.is_integer(): return False degree_count[k] = k_size for k in joint_degrees: for l in joint_degrees[k]: if not float(joint_degrees[k][l]).is_integer(): return False if (k != l) and (joint_degrees[k][l] > degree_count[k] * degree_count[l]): return False elif k == l: if joint_degrees[k][k] > degree_count[k] * (degree_count[k] - 1): return False if joint_degrees[k][k] % 2 != 0: return False # if all above conditions have been satisfied then the input # joint degree is realizable as a simple graph. return True def _neighbor_switch(G, w, unsat, h_node_residual, avoid_node_id=None): """ Releases one free stub for ``w``, while preserving joint degree in G. Parameters ---------- G : NetworkX graph Graph in which the neighbor switch will take place. w : integer Node id for which we will execute this neighbor switch. unsat : set of integers Set of unsaturated node ids that have the same degree as w. h_node_residual: dictionary of integers Keeps track of the remaining stubs for a given node. avoid_node_id: integer Node id to avoid when selecting w_prime. Notes ----- First, it selects *w_prime*, an unsaturated node that has the same degree as ``w``. Second, it selects *switch_node*, a neighbor node of ``w`` that is not connected to *w_prime*. Then it executes an edge swap i.e. removes (``w``,*switch_node*) and adds (*w_prime*,*switch_node*). Gjoka et. al. [1] prove that such an edge swap is always possible. References ---------- .. [1] M. Gjoka, B. Tillman, A. Markopoulou, "Construction of Simple Graphs with a Target Joint Degree Matrix and Beyond", IEEE Infocom, '15 """ if (avoid_node_id is None) or (h_node_residual[avoid_node_id] > 1): # select unsatured node w_prime that has the same degree as w w_prime = next(iter(unsat)) else: # assume that the node pair (v,w) has been selected for connection. if # - neighbor_switch is called for node w, # - nodes v and w have the same degree, # - node v=avoid_node_id has only one stub left, # then prevent v=avoid_node_id from being selected as w_prime. iter_var = iter(unsat) while True: w_prime = next(iter_var) if w_prime != avoid_node_id: break # select switch_node, a neighbor of w, that is not connected to w_prime w_prime_neighbs = G[w_prime] # slightly faster declaring this variable for v in G[w]: if (v not in w_prime_neighbs) and (v != w_prime): switch_node = v break # remove edge (w,switch_node), add edge (w_prime,switch_node) and update # data structures G.remove_edge(w, switch_node) G.add_edge(w_prime, switch_node) h_node_residual[w] += 1 h_node_residual[w_prime] -= 1 if h_node_residual[w_prime] == 0: unsat.remove(w_prime) @py_random_state(1) def joint_degree_graph(joint_degrees, seed=None): """ Generates a random simple graph with the given joint degree dictionary. Parameters ---------- joint_degrees : dictionary of dictionary of integers A joint degree dictionary in which entry ``joint_degrees[k][l]`` is the number of edges joining nodes of degree *k* with nodes of degree *l*. seed : integer, random_state, or None (default) Indicator of random number generation state. See :ref:`Randomness<randomness>`. Returns ------- G : Graph A graph with the specified joint degree dictionary. Raises ------ NetworkXError If *joint_degrees* dictionary is not realizable. Notes ----- In each iteration of the "while loop" the algorithm picks two disconnected nodes *v* and *w*, of degree *k* and *l* correspondingly, for which ``joint_degrees[k][l]`` has not reached its target yet. It then adds edge (*v*, *w*) and increases the number of edges in graph G by one. The intelligence of the algorithm lies in the fact that it is always possible to add an edge between such disconnected nodes *v* and *w*, even if one or both nodes do not have free stubs. That is made possible by executing a "neighbor switch", an edge rewiring move that releases a free stub while keeping the joint degree of G the same. The algorithm continues for E (number of edges) iterations of the "while loop", at the which point all entries of the given ``joint_degrees[k][l]`` have reached their target values and the construction is complete. References ---------- .. [1] M. Gjoka, B. Tillman, A. Markopoulou, "Construction of Simple Graphs with a Target Joint Degree Matrix and Beyond", IEEE Infocom, '15 Examples -------- >>> joint_degrees = { ... 1: {4: 1}, ... 2: {2: 2, 3: 2, 4: 2}, ... 3: {2: 2, 4: 1}, ... 4: {1: 1, 2: 2, 3: 1}, ... } >>> G = nx.joint_degree_graph(joint_degrees) >>> """ if not is_valid_joint_degree(joint_degrees): msg = "Input joint degree dict not realizable as a simple graph" raise nx.NetworkXError(msg) # compute degree count from joint_degrees degree_count = {k: sum(l.values()) // k for k, l in joint_degrees.items() if k > 0} # start with empty N-node graph N = sum(degree_count.values()) G = nx.empty_graph(N) # for a given degree group, keep the list of all node ids h_degree_nodelist = {} # for a given node, keep track of the remaining stubs h_node_residual = {} # populate h_degree_nodelist and h_node_residual nodeid = 0 for degree, num_nodes in degree_count.items(): h_degree_nodelist[degree] = range(nodeid, nodeid + num_nodes) for v in h_degree_nodelist[degree]: h_node_residual[v] = degree nodeid += int(num_nodes) # iterate over every degree pair (k,l) and add the number of edges given # for each pair for k in joint_degrees: for l in joint_degrees[k]: # n_edges_add is the number of edges to add for the # degree pair (k,l) n_edges_add = joint_degrees[k][l] if (n_edges_add > 0) and (k >= l): # number of nodes with degree k and l k_size = degree_count[k] l_size = degree_count[l] # k_nodes and l_nodes consist of all nodes of degree k and l k_nodes = h_degree_nodelist[k] l_nodes = h_degree_nodelist[l] # k_unsat and l_unsat consist of nodes of degree k and l that # are unsaturated (nodes that have at least 1 available stub) k_unsat = {v for v in k_nodes if h_node_residual[v] > 0} if k != l: l_unsat = {w for w in l_nodes if h_node_residual[w] > 0} else: l_unsat = k_unsat n_edges_add = joint_degrees[k][l] // 2 while n_edges_add > 0: # randomly pick nodes v and w that have degrees k and l v = k_nodes[seed.randrange(k_size)] w = l_nodes[seed.randrange(l_size)] # if nodes v and w are disconnected then attempt to connect if not G.has_edge(v, w) and (v != w): # if node v has no free stubs then do neighbor switch if h_node_residual[v] == 0: _neighbor_switch(G, v, k_unsat, h_node_residual) # if node w has no free stubs then do neighbor switch if h_node_residual[w] == 0: if k != l: _neighbor_switch(G, w, l_unsat, h_node_residual) else: _neighbor_switch( G, w, l_unsat, h_node_residual, avoid_node_id=v ) # add edge (v, w) and update data structures G.add_edge(v, w) h_node_residual[v] -= 1 h_node_residual[w] -= 1 n_edges_add -= 1 if h_node_residual[v] == 0: k_unsat.discard(v) if h_node_residual[w] == 0: l_unsat.discard(w) return G def is_valid_directed_joint_degree(in_degrees, out_degrees, nkk): """ Checks whether the given directed joint degree input is realizable Parameters ---------- in_degrees : list of integers in degree sequence contains the in degrees of nodes. out_degrees : list of integers out degree sequence contains the out degrees of nodes. nkk : dictionary of dictionary of integers directed joint degree dictionary. for nodes of out degree k (first level of dict) and nodes of in degree l (seconnd level of dict) describes the number of edges. Returns ------- boolean returns true if given input is realizable, else returns false. Notes ----- Here is the list of conditions that the inputs (in/out degree sequences, nkk) need to satisfy for simple directed graph realizability: - Condition 0: in_degrees and out_degrees have the same length - Condition 1: nkk[k][l] is integer for all k,l - Condition 2: sum(nkk[k])/k = number of nodes with partition id k, is an integer and matching degree sequence - Condition 3: number of edges and non-chords between k and l cannot exceed maximum possible number of edges References ---------- [1] B. Tillman, A. Markopoulou, C. T. Butts & M. Gjoka, "Construction of Directed 2K Graphs". In Proc. of KDD 2017. """ V = {} # number of nodes with in/out degree. forbidden = {} if len(in_degrees) != len(out_degrees): return False for idx in range(0, len(in_degrees)): i = in_degrees[idx] o = out_degrees[idx] V[(i, 0)] = V.get((i, 0), 0) + 1 V[(o, 1)] = V.get((o, 1), 0) + 1 forbidden[(o, i)] = forbidden.get((o, i), 0) + 1 S = {} # number of edges going from in/out degree nodes. for k in nkk: for l in nkk[k]: val = nkk[k][l] if not float(val).is_integer(): # condition 1 return False if val > 0: S[(k, 1)] = S.get((k, 1), 0) + val S[(l, 0)] = S.get((l, 0), 0) + val # condition 3 if val + forbidden.get((k, l), 0) > V[(k, 1)] * V[(l, 0)]: return False for s in S: if not float(S[s]) / s[0] == V[s]: # condition 2 return False # if all conditions abive have been satisfied then the input nkk is # realizable as a simple graph. return True def _directed_neighbor_switch( G, w, unsat, h_node_residual_out, chords, h_partition_in, partition ): """ Releases one free stub for node w, while preserving joint degree in G. Parameters ---------- G : networkx directed graph graph within which the edge swap will take place. w : integer node id for which we need to perform a neighbor switch. unsat: set of integers set of node ids that have the same degree as w and are unsaturated. h_node_residual_out: dict of integers for a given node, keeps track of the remaining stubs to be added. chords: set of tuples keeps track of available positions to add edges. h_partition_in: dict of integers for a given node, keeps track of its partition id (in degree). partition: integer partition id to check if chords have to be updated. Notes ----- First, it selects node w_prime that (1) has the same degree as w and (2) is unsaturated. Then, it selects node v, a neighbor of w, that is not connected to w_prime and does an edge swap i.e. removes (w,v) and adds (w_prime,v). If neighbor switch is not possible for w using w_prime and v, then return w_prime; in [1] it's proven that such unsaturated nodes can be used. References ---------- [1] B. Tillman, A. Markopoulou, C. T. Butts & M. Gjoka, "Construction of Directed 2K Graphs". In Proc. of KDD 2017. """ w_prime = unsat.pop() unsat.add(w_prime) # select node t, a neighbor of w, that is not connected to w_prime w_neighbs = list(G.successors(w)) # slightly faster declaring this variable w_prime_neighbs = list(G.successors(w_prime)) for v in w_neighbs: if (v not in w_prime_neighbs) and w_prime != v: # removes (w,v), add (w_prime,v) and update data structures G.remove_edge(w, v) G.add_edge(w_prime, v) if h_partition_in[v] == partition: chords.add((w, v)) chords.discard((w_prime, v)) h_node_residual_out[w] += 1 h_node_residual_out[w_prime] -= 1 if h_node_residual_out[w_prime] == 0: unsat.remove(w_prime) return None # If neighbor switch didn't work, use unsaturated node return w_prime def _directed_neighbor_switch_rev( G, w, unsat, h_node_residual_in, chords, h_partition_out, partition ): """ The reverse of directed_neighbor_switch. Parameters ---------- G : networkx directed graph graph within which the edge swap will take place. w : integer node id for which we need to perform a neighbor switch. unsat: set of integers set of node ids that have the same degree as w and are unsaturated. h_node_residual_in: dict of integers for a given node, keeps track of the remaining stubs to be added. chords: set of tuples keeps track of available positions to add edges. h_partition_out: dict of integers for a given node, keeps track of its partition id (out degree). partition: integer partition id to check if chords have to be updated. Notes ----- Same operation as directed_neighbor_switch except it handles this operation for incoming edges instead of outgoing. """ w_prime = unsat.pop() unsat.add(w_prime) # slightly faster declaring these as variables. w_neighbs = list(G.predecessors(w)) w_prime_neighbs = list(G.predecessors(w_prime)) # select node v, a neighbor of w, that is not connected to w_prime. for v in w_neighbs: if (v not in w_prime_neighbs) and w_prime != v: # removes (v,w), add (v,w_prime) and update data structures. G.remove_edge(v, w) G.add_edge(v, w_prime) if h_partition_out[v] == partition: chords.add((v, w)) chords.discard((v, w_prime)) h_node_residual_in[w] += 1 h_node_residual_in[w_prime] -= 1 if h_node_residual_in[w_prime] == 0: unsat.remove(w_prime) return None # If neighbor switch didn't work, use the unsaturated node. return w_prime @py_random_state(3) def directed_joint_degree_graph(in_degrees, out_degrees, nkk, seed=None): """ Generates a random simple directed graph with the joint degree. Parameters ---------- degree_seq : list of tuples (of size 3) degree sequence contains tuples of nodes with node id, in degree and out degree. nkk : dictionary of dictionary of integers directed joint degree dictionary, for nodes of out degree k (first level of dict) and nodes of in degree l (second level of dict) describes the number of edges. seed : hashable object, optional Seed for random number generator. Returns ------- G : Graph A directed graph with the specified inputs. Raises ------ NetworkXError If degree_seq and nkk are not realizable as a simple directed graph. Notes ----- Similarly to the undirected version: In each iteration of the "while loop" the algorithm picks two disconnected nodes v and w, of degree k and l correspondingly, for which nkk[k][l] has not reached its target yet i.e. (for given k,l): n_edges_add < nkk[k][l]. It then adds edge (v,w) and always increases the number of edges in graph G by one. The intelligence of the algorithm lies in the fact that it is always possible to add an edge between disconnected nodes v and w, for which nkk[degree(v)][degree(w)] has not reached its target, even if one or both nodes do not have free stubs. If either node v or w does not have a free stub, we perform a "neighbor switch", an edge rewiring move that releases a free stub while keeping nkk the same. The difference for the directed version lies in the fact that neighbor switches might not be able to rewire, but in these cases unsaturated nodes can be reassigned to use instead, see [1] for detailed description and proofs. The algorithm continues for E (number of edges in the graph) iterations of the "while loop", at which point all entries of the given nkk[k][l] have reached their target values and the construction is complete. References ---------- [1] B. Tillman, A. Markopoulou, C. T. Butts & M. Gjoka, "Construction of Directed 2K Graphs". In Proc. of KDD 2017. Examples -------- >>> in_degrees = [0, 1, 1, 2] >>> out_degrees = [1, 1, 1, 1] >>> nkk = {1: {1: 2, 2: 2}} >>> G = nx.directed_joint_degree_graph(in_degrees, out_degrees, nkk) >>> """ if not is_valid_directed_joint_degree(in_degrees, out_degrees, nkk): msg = "Input is not realizable as a simple graph" raise nx.NetworkXError(msg) # start with an empty directed graph. G = nx.DiGraph() # for a given group, keep the list of all node ids. h_degree_nodelist_in = {} h_degree_nodelist_out = {} # for a given group, keep the list of all unsaturated node ids. h_degree_nodelist_in_unsat = {} h_degree_nodelist_out_unsat = {} # for a given node, keep track of the remaining stubs to be added. h_node_residual_out = {} h_node_residual_in = {} # for a given node, keep track of the partition id. h_partition_out = {} h_partition_in = {} # keep track of non-chords between pairs of partition ids. non_chords = {} # populate data structures for idx, i in enumerate(in_degrees): idx = int(idx) if i > 0: h_degree_nodelist_in.setdefault(i, []) h_degree_nodelist_in_unsat.setdefault(i, set()) h_degree_nodelist_in[i].append(idx) h_degree_nodelist_in_unsat[i].add(idx) h_node_residual_in[idx] = i h_partition_in[idx] = i for idx, o in enumerate(out_degrees): o = out_degrees[idx] non_chords[(o, in_degrees[idx])] = non_chords.get((o, in_degrees[idx]), 0) + 1 idx = int(idx) if o > 0: h_degree_nodelist_out.setdefault(o, []) h_degree_nodelist_out_unsat.setdefault(o, set()) h_degree_nodelist_out[o].append(idx) h_degree_nodelist_out_unsat[o].add(idx) h_node_residual_out[idx] = o h_partition_out[idx] = o G.add_node(idx) nk_in = {} nk_out = {} for p in h_degree_nodelist_in: nk_in[p] = len(h_degree_nodelist_in[p]) for p in h_degree_nodelist_out: nk_out[p] = len(h_degree_nodelist_out[p]) # iterate over every degree pair (k,l) and add the number of edges given # for each pair. for k in nkk: for l in nkk[k]: n_edges_add = nkk[k][l] if n_edges_add > 0: # chords contains a random set of potential edges. chords = set() k_len = nk_out[k] l_len = nk_in[l] chords_sample = seed.sample( range(k_len * l_len), n_edges_add + non_chords.get((k, l), 0) ) num = 0 while len(chords) < n_edges_add: i = h_degree_nodelist_out[k][chords_sample[num] % k_len] j = h_degree_nodelist_in[l][chords_sample[num] // k_len] num += 1 if i != j: chords.add((i, j)) # k_unsat and l_unsat consist of nodes of in/out degree k and l # that are unsaturated i.e. those nodes that have at least one # available stub k_unsat = h_degree_nodelist_out_unsat[k] l_unsat = h_degree_nodelist_in_unsat[l] while n_edges_add > 0: v, w = chords.pop() chords.add((v, w)) # if node v has no free stubs then do neighbor switch. if h_node_residual_out[v] == 0: _v = _directed_neighbor_switch( G, v, k_unsat, h_node_residual_out, chords, h_partition_in, l, ) if _v is not None: v = _v # if node w has no free stubs then do neighbor switch. if h_node_residual_in[w] == 0: _w = _directed_neighbor_switch_rev( G, w, l_unsat, h_node_residual_in, chords, h_partition_out, k, ) if _w is not None: w = _w # add edge (v,w) and update data structures. G.add_edge(v, w) h_node_residual_out[v] -= 1 h_node_residual_in[w] -= 1 n_edges_add -= 1 chords.discard((v, w)) if h_node_residual_out[v] == 0: k_unsat.discard(v) if h_node_residual_in[w] == 0: l_unsat.discard(w) return G