github.com/richardmarshall/terraform@v0.9.5-0.20170429023105-15704cc6ee35/dag/dag.go (about) 1 package dag 2 3 import ( 4 "fmt" 5 "sort" 6 "strings" 7 8 "github.com/hashicorp/go-multierror" 9 ) 10 11 // AcyclicGraph is a specialization of Graph that cannot have cycles. With 12 // this property, we get the property of sane graph traversal. 13 type AcyclicGraph struct { 14 Graph 15 } 16 17 // WalkFunc is the callback used for walking the graph. 18 type WalkFunc func(Vertex) error 19 20 // DepthWalkFunc is a walk function that also receives the current depth of the 21 // walk as an argument 22 type DepthWalkFunc func(Vertex, int) error 23 24 func (g *AcyclicGraph) DirectedGraph() Grapher { 25 return g 26 } 27 28 // Returns a Set that includes every Vertex yielded by walking down from the 29 // provided starting Vertex v. 30 func (g *AcyclicGraph) Ancestors(v Vertex) (*Set, error) { 31 s := new(Set) 32 start := AsVertexList(g.DownEdges(v)) 33 memoFunc := func(v Vertex, d int) error { 34 s.Add(v) 35 return nil 36 } 37 38 if err := g.DepthFirstWalk(start, memoFunc); err != nil { 39 return nil, err 40 } 41 42 return s, nil 43 } 44 45 // Returns a Set that includes every Vertex yielded by walking up from the 46 // provided starting Vertex v. 47 func (g *AcyclicGraph) Descendents(v Vertex) (*Set, error) { 48 s := new(Set) 49 start := AsVertexList(g.UpEdges(v)) 50 memoFunc := func(v Vertex, d int) error { 51 s.Add(v) 52 return nil 53 } 54 55 if err := g.ReverseDepthFirstWalk(start, memoFunc); err != nil { 56 return nil, err 57 } 58 59 return s, nil 60 } 61 62 // Root returns the root of the DAG, or an error. 63 // 64 // Complexity: O(V) 65 func (g *AcyclicGraph) Root() (Vertex, error) { 66 roots := make([]Vertex, 0, 1) 67 for _, v := range g.Vertices() { 68 if g.UpEdges(v).Len() == 0 { 69 roots = append(roots, v) 70 } 71 } 72 73 if len(roots) > 1 { 74 // TODO(mitchellh): make this error message a lot better 75 return nil, fmt.Errorf("multiple roots: %#v", roots) 76 } 77 78 if len(roots) == 0 { 79 return nil, fmt.Errorf("no roots found") 80 } 81 82 return roots[0], nil 83 } 84 85 // TransitiveReduction performs the transitive reduction of graph g in place. 86 // The transitive reduction of a graph is a graph with as few edges as 87 // possible with the same reachability as the original graph. This means 88 // that if there are three nodes A => B => C, and A connects to both 89 // B and C, and B connects to C, then the transitive reduction is the 90 // same graph with only a single edge between A and B, and a single edge 91 // between B and C. 92 // 93 // The graph must be valid for this operation to behave properly. If 94 // Validate() returns an error, the behavior is undefined and the results 95 // will likely be unexpected. 96 // 97 // Complexity: O(V(V+E)), or asymptotically O(VE) 98 func (g *AcyclicGraph) TransitiveReduction() { 99 // For each vertex u in graph g, do a DFS starting from each vertex 100 // v such that the edge (u,v) exists (v is a direct descendant of u). 101 // 102 // For each v-prime reachable from v, remove the edge (u, v-prime). 103 defer g.debug.BeginOperation("TransitiveReduction", "").End("") 104 105 for _, u := range g.Vertices() { 106 uTargets := g.DownEdges(u) 107 vs := AsVertexList(g.DownEdges(u)) 108 109 g.DepthFirstWalk(vs, func(v Vertex, d int) error { 110 shared := uTargets.Intersection(g.DownEdges(v)) 111 for _, vPrime := range AsVertexList(shared) { 112 g.RemoveEdge(BasicEdge(u, vPrime)) 113 } 114 115 return nil 116 }) 117 } 118 } 119 120 // Validate validates the DAG. A DAG is valid if it has a single root 121 // with no cycles. 122 func (g *AcyclicGraph) Validate() error { 123 if _, err := g.Root(); err != nil { 124 return err 125 } 126 127 // Look for cycles of more than 1 component 128 var err error 129 cycles := g.Cycles() 130 if len(cycles) > 0 { 131 for _, cycle := range cycles { 132 cycleStr := make([]string, len(cycle)) 133 for j, vertex := range cycle { 134 cycleStr[j] = VertexName(vertex) 135 } 136 137 err = multierror.Append(err, fmt.Errorf( 138 "Cycle: %s", strings.Join(cycleStr, ", "))) 139 } 140 } 141 142 // Look for cycles to self 143 for _, e := range g.Edges() { 144 if e.Source() == e.Target() { 145 err = multierror.Append(err, fmt.Errorf( 146 "Self reference: %s", VertexName(e.Source()))) 147 } 148 } 149 150 return err 151 } 152 153 func (g *AcyclicGraph) Cycles() [][]Vertex { 154 var cycles [][]Vertex 155 for _, cycle := range StronglyConnected(&g.Graph) { 156 if len(cycle) > 1 { 157 cycles = append(cycles, cycle) 158 } 159 } 160 return cycles 161 } 162 163 // Walk walks the graph, calling your callback as each node is visited. 164 // This will walk nodes in parallel if it can. Because the walk is done 165 // in parallel, the error returned will be a multierror. 166 func (g *AcyclicGraph) Walk(cb WalkFunc) error { 167 defer g.debug.BeginOperation(typeWalk, "").End("") 168 169 w := &Walker{Callback: cb, Reverse: true} 170 w.Update(g) 171 return w.Wait() 172 } 173 174 // simple convenience helper for converting a dag.Set to a []Vertex 175 func AsVertexList(s *Set) []Vertex { 176 rawList := s.List() 177 vertexList := make([]Vertex, len(rawList)) 178 for i, raw := range rawList { 179 vertexList[i] = raw.(Vertex) 180 } 181 return vertexList 182 } 183 184 type vertexAtDepth struct { 185 Vertex Vertex 186 Depth int 187 } 188 189 // depthFirstWalk does a depth-first walk of the graph starting from 190 // the vertices in start. This is not exported now but it would make sense 191 // to export this publicly at some point. 192 func (g *AcyclicGraph) DepthFirstWalk(start []Vertex, f DepthWalkFunc) error { 193 defer g.debug.BeginOperation(typeDepthFirstWalk, "").End("") 194 195 seen := make(map[Vertex]struct{}) 196 frontier := make([]*vertexAtDepth, len(start)) 197 for i, v := range start { 198 frontier[i] = &vertexAtDepth{ 199 Vertex: v, 200 Depth: 0, 201 } 202 } 203 for len(frontier) > 0 { 204 // Pop the current vertex 205 n := len(frontier) 206 current := frontier[n-1] 207 frontier = frontier[:n-1] 208 209 // Check if we've seen this already and return... 210 if _, ok := seen[current.Vertex]; ok { 211 continue 212 } 213 seen[current.Vertex] = struct{}{} 214 215 // Visit the current node 216 if err := f(current.Vertex, current.Depth); err != nil { 217 return err 218 } 219 220 // Visit targets of this in a consistent order. 221 targets := AsVertexList(g.DownEdges(current.Vertex)) 222 sort.Sort(byVertexName(targets)) 223 for _, t := range targets { 224 frontier = append(frontier, &vertexAtDepth{ 225 Vertex: t, 226 Depth: current.Depth + 1, 227 }) 228 } 229 } 230 231 return nil 232 } 233 234 // reverseDepthFirstWalk does a depth-first walk _up_ the graph starting from 235 // the vertices in start. 236 func (g *AcyclicGraph) ReverseDepthFirstWalk(start []Vertex, f DepthWalkFunc) error { 237 defer g.debug.BeginOperation(typeReverseDepthFirstWalk, "").End("") 238 239 seen := make(map[Vertex]struct{}) 240 frontier := make([]*vertexAtDepth, len(start)) 241 for i, v := range start { 242 frontier[i] = &vertexAtDepth{ 243 Vertex: v, 244 Depth: 0, 245 } 246 } 247 for len(frontier) > 0 { 248 // Pop the current vertex 249 n := len(frontier) 250 current := frontier[n-1] 251 frontier = frontier[:n-1] 252 253 // Check if we've seen this already and return... 254 if _, ok := seen[current.Vertex]; ok { 255 continue 256 } 257 seen[current.Vertex] = struct{}{} 258 259 // Add next set of targets in a consistent order. 260 targets := AsVertexList(g.UpEdges(current.Vertex)) 261 sort.Sort(byVertexName(targets)) 262 for _, t := range targets { 263 frontier = append(frontier, &vertexAtDepth{ 264 Vertex: t, 265 Depth: current.Depth + 1, 266 }) 267 } 268 269 // Visit the current node 270 if err := f(current.Vertex, current.Depth); err != nil { 271 return err 272 } 273 } 274 275 return nil 276 } 277 278 // byVertexName implements sort.Interface so a list of Vertices can be sorted 279 // consistently by their VertexName 280 type byVertexName []Vertex 281 282 func (b byVertexName) Len() int { return len(b) } 283 func (b byVertexName) Swap(i, j int) { b[i], b[j] = b[j], b[i] } 284 func (b byVertexName) Less(i, j int) bool { 285 return VertexName(b[i]) < VertexName(b[j]) 286 }