Translated cliques_to_jtree()

R/cliques_to_jtree.R

@@ -1,58 +1,49 @@
 cliques_to_jtree <- function(cliques, ns) {
-  stop("needs translation")
-  #   function [jtree, root, B, w] = cliques_to_jtree(cliques, ns)
-  # % MK_JTREE Make an optimal junction tree.
-  # % [jtree, root, B, w] = mk_jtree(cliques, ns)
-  # %
-  # % A junction tree is a tree that satisfies the jtree property, which says:
-  # % for each pair of cliques U,V with intersection S, all cliques on the path between U and V
-  # % contain S. (This ensures that local propagation leads to global consistency.)
-  # %
-  # % We can create a junction tree by computing the maximal spanning tree of the junction graph.
-  # % (The junction graph connects all cliques, and the weight of an edge (i,j) is
-  # % |C(i) intersect C(j)|, where C(i) is the i'th clique.)
-  # %
-  # % The best jtree is the maximal spanning tree which minimizes the sum of the costs on each edge,
-  # % where cost(i,j) = w(C(i)) + w(C(j)), and w(C) is the weight of clique C,
-  # % which is the total number of values C can take on.
-  # %
-  # % For details, see
-  # %  - Jensen and Jensen, "Optimal Junction Trees", UAI 94.
-  # %
-  # % Input:
-  # %  cliques{i} = nodes in clique i
-  # %  ns(i) = number of values node i can take on
-  # % Output:
-  # %  jtree(i,j) = 1 iff cliques i and j aer connected
-  # %  root = the clique that should be used as root
-  # %  B(i,j) = 1 iff node j occurs in clique i
-  # %  w(i) = weight of clique i
+  #  MK_JTREE Make an optimal junction tree.
+  #  [jtree, root, B, w] = mk_jtree(cliques, ns)
+  #  A junction tree is a tree that satisfies the jtree property, which says:
+  #  for each pair of cliques U, V with intersection S, all cliques on the path between U and V
+  #  contain S. (This ensures that local propagation leads to # global consistency.)
+  #  We can create a junction tree by computing the maximal spanning tree of the junction graph.
+  #  (The junction graph connects all cliques, and the weight of an edge (i, j) is
+  #  |C(i) intersect C(j)|, where C(i) is the i'th clique.)
+  #  The best jtree is the maximal spanning tree which minimizes the sum of the costs on each edge,
+  #  where cost[i, j] <- w(C(i)) + w(C(j)), and w(C) is the weight of clique C,
+  #  which is the total number of values C can take on.
+  #  For details, see
+  #   - Jensen and Jensen, "Optimal Junction Trees", UAI 94.
+  #  Input:
+  #   cliques{i} = nodes in clique i
+  #   ns[i] <- number of values node i can take on
+  #  Output:
+  #   jtree[i, j] <- 1 iff cliques i and j aer connected
+  #   root <- the clique that should be used as root
+  #   B[i, j] <- 1 iff node j occurs in clique i
+  #   w[i] <- weight of clique i
 
+  num_cliques <- length(cliques)
+  w <- zeros(num_cliques, 1)
+  B <- zeros(num_cliques, 1)
+  for (i in 1:num_cliques) {
+    B[i, cliques[[i]]] <- 1
+    w[i] <- prod(ns(cliques[[i]]))
+  }
 
+  #  C1[i, j] <- length(intersect(cliques{i}, cliques{j}))
+  #  The length of the intersection of two sets is the dot product of their bit vector representation.
+  C1 <- B %*% t(B)
+  C1 <- setdiag(C1, 0)
 
-  # num_cliques = length(cliques);
-  # w = zeros(num_cliques, 1);
-  # B = sparse(num_cliques, 1);
-  # for i=1:num_cliques
-  #   B(i, cliques{i}) = 1;
-  #   w(i) = prod(ns(cliques{i}));
-  # end
+  #  C2[i, j] <- w(i) + w(j)
+  num_cliques <- length(w)
+  W <- repmat(w, c(1, num_cliques))
+  C2 <- W + t(W)
+  C2 <- setdiag(C2, 0)
 
+  jtree <- zeros(minimum_spanning_tree(-C1, C2))# Using - C1 gives * maximum * spanning tree
 
-  # % C1(i,j) = length(intersect(cliques{i}, cliques{j}));
-  # % The length of the intersection of two sets is the dot product of their bit vector representation.
-  # C1 = B*B';
-  # C1 = setdiag(C1, 0);
-
-  # % C2(i,j) = w(i) + w(j)
-  # num_cliques = length(w);
-  # W = repmat(w, 1, num_cliques);
-  # C2 = W + W';
-  # C2 = setdiag(C2, 0);
-
-  # jtree = sparse(minimum_spanning_tree(-C1, C2)); % Using -C1 gives *maximum* spanning tree
-
-  # % The root is arbitrary, but since the first pass is towards the root,
-  # % we would like this to correspond to going forward in time in a DBN.
-  # root = num_cliques;
+  #  The root is arbitrary, but since the first pass is towards the root,
+  #  we would like this to correspond to going forward in time in a DBN.
+  root <- num_cliques
+  return(list("jtree" = jtree, "root" = root, "B" = B, "w" = w))
 }