Dijkstrův algoritmus nám umožňuje najít nejkratší cestu mezi dvěma vrcholy grafu.
Liší se od minimálního kostry, protože nejkratší vzdálenost mezi dvěma vrcholy nemusí zahrnovat všechny vrcholy grafu.
Jak funguje Dijkstrův algoritmus
Dijkstrův algoritmus funguje na základě toho, že jakákoli podcesta B -> Dnejkratší cesty A -> Dmezi vrcholy A a D je také nejkratší cestou mezi vrcholy B a D.
Každá dílčí cesta je nejkratší cestou
Djikstra použil tuto vlastnost v opačném směru, tj. Přeceňujeme vzdálenost každého vrcholu od počátečního vrcholu. Poté navštívíme každý uzel a jeho sousedy, abychom našli nejkratší podcestu k těmto sousedům.
Algoritmus používá chamtivý přístup v tom smyslu, že najdeme další nejlepší řešení v naději, že konečný výsledek bude nejlepším řešením pro celý problém.
Příklad Dijkstrova algoritmu
Je snazší začít příkladem a poté přemýšlet o algoritmu.
Začněte s váženým grafem 
Vyberte počáteční vrchol a přiřaďte hodnoty cesty nekonečna všem ostatním zařízením 
Přejít na každý vrchol a aktualizovat jeho délku cesty 
Pokud je délka cesty sousedního vrcholu menší než délka nové cesty, neaktualizujte ji 
Vyhněte se aktualizaci cesty délky již navštívených vrcholů 
Po každé iteraci vybereme nenavštívený vrchol s nejmenší délkou cesty. Vybereme tedy 5 před 7 
Všimněte si, jak má vrchol 
úplně napravo dvakrát aktualizovanou délku cesty Opakujte, dokud nebudou navštíveny všechny vrcholy
Djikstrův algoritmus pseudokód
Musíme udržovat dráhovou vzdálenost každého vrcholu. Můžeme to uložit do pole o velikosti v, kde v je počet vrcholů.
Chceme také mít možnost získat nejkratší cestu, nejen znát délku nejkratší cesty. Za tímto účelem mapujeme každý vrchol na vrchol, který naposledy aktualizoval jeho délku cesty.
Jakmile je algoritmus u konce, můžeme ustoupit od cílového vrcholu ke zdrojovému vrcholu a najít cestu.
Frontu s minimální prioritou lze použít k efektivnímu přijetí vrcholu s nejmenší vzdáleností cesty.
function dijkstra(G, S) for each vertex V in G distance(V) <- infinite previous(V) <- NULL If V != S, add V to Priority Queue Q distance(S) <- 0 while Q IS NOT EMPTY U <- Extract MIN from Q for each unvisited neighbour V of U tempDistance <- distance(U) + edge_weight(U, V) if tempDistance < distance(V) distance(V) <- tempDistance previous(V) <- U return distance(), previous()
Kód pro Dijkstrův algoritmus
Níže je uvedena implementace Dijkstra's Algorithm v C ++. Složitost kódu lze zlepšit, ale abstrakce jsou vhodné k propojení kódu s algoritmem.
Python Java C C ++ # Dijkstra's Algorithm in Python import sys # Providing the graph vertices = ((0, 0, 1, 1, 0, 0, 0), (0, 0, 1, 0, 0, 1, 0), (1, 1, 0, 1, 1, 0, 0), (1, 0, 1, 0, 0, 0, 1), (0, 0, 1, 0, 0, 1, 0), (0, 1, 0, 0, 1, 0, 1), (0, 0, 0, 1, 0, 1, 0)) edges = ((0, 0, 1, 2, 0, 0, 0), (0, 0, 2, 0, 0, 3, 0), (1, 2, 0, 1, 3, 0, 0), (2, 0, 1, 0, 0, 0, 1), (0, 0, 3, 0, 0, 2, 0), (0, 3, 0, 0, 2, 0, 1), (0, 0, 0, 1, 0, 1, 0)) # Find which vertex is to be visited next def to_be_visited(): global visited_and_distance v = -10 for index in range(num_of_vertices): if visited_and_distance(index)(0) == 0 and (v < 0 or visited_and_distance(index)(1) <= visited_and_distance(v)(1)): v = index return v num_of_vertices = len(vertices(0)) visited_and_distance = ((0, 0)) for i in range(num_of_vertices-1): visited_and_distance.append((0, sys.maxsize)) for vertex in range(num_of_vertices): # Find next vertex to be visited to_visit = to_be_visited() for neighbor_index in range(num_of_vertices): # Updating new distances if vertices(to_visit)(neighbor_index) == 1 and visited_and_distance(neighbor_index)(0) == 0: new_distance = visited_and_distance(to_visit)(1) + edges(to_visit)(neighbor_index) if visited_and_distance(neighbor_index)(1)> new_distance: visited_and_distance(neighbor_index)(1) = new_distance visited_and_distance(to_visit)(0) = 1 i = 0 # Printing the distance for distance in visited_and_distance: print("Distance of ", chr(ord('a') + i), " from source vertex: ", distance(1)) i = i + 1
// Dijkstra's Algorithm in Java public class Dijkstra ( public static void dijkstra(int()() graph, int source) ( int count = graph.length; boolean() visitedVertex = new boolean(count); int() distance = new int(count); for (int i = 0; i < count; i++) ( visitedVertex(i) = false; distance(i) = Integer.MAX_VALUE; ) // Distance of self loop is zero distance(source) = 0; for (int i = 0; i < count; i++) ( // Update the distance between neighbouring vertex and source vertex int u = findMinDistance(distance, visitedVertex); visitedVertex(u) = true; // Update all the neighbouring vertex distances for (int v = 0; v < count; v++) ( if (!visitedVertex(v) && graph(u)(v) != 0 && (distance(u) + graph(u)(v) < distance(v))) ( distance(v) = distance(u) + graph(u)(v); ) ) ) for (int i = 0; i < distance.length; i++) ( System.out.println(String.format("Distance from %s to %s is %s", source, i, distance(i))); ) ) // Finding the minimum distance private static int findMinDistance(int() distance, boolean() visitedVertex) ( int minDistance = Integer.MAX_VALUE; int minDistanceVertex = -1; for (int i = 0; i < distance.length; i++) ( if (!visitedVertex(i) && distance(i) < minDistance) ( minDistance = distance(i); minDistanceVertex = i; ) ) return minDistanceVertex; ) public static void main(String() args) ( int graph()() = new int()() ( ( 0, 0, 1, 2, 0, 0, 0 ), ( 0, 0, 2, 0, 0, 3, 0 ), ( 1, 2, 0, 1, 3, 0, 0 ), ( 2, 0, 1, 0, 0, 0, 1 ), ( 0, 0, 3, 0, 0, 2, 0 ), ( 0, 3, 0, 0, 2, 0, 1 ), ( 0, 0, 0, 1, 0, 1, 0 ) ); Dijkstra T = new Dijkstra(); T.dijkstra(graph, 0); ) )
// Dijkstra's Algorithm in C #include #define INFINITY 9999 #define MAX 10 void Dijkstra(int Graph(MAX)(MAX), int n, int start); void Dijkstra(int Graph(MAX)(MAX), int n, int start) ( int cost(MAX)(MAX), distance(MAX), pred(MAX); int visited(MAX), count, mindistance, nextnode, i, j; // Creating cost matrix for (i = 0; i < n; i++) for (j = 0; j < n; j++) if (Graph(i)(j) == 0) cost(i)(j) = INFINITY; else cost(i)(j) = Graph(i)(j); for (i = 0; i < n; i++) ( distance(i) = cost(start)(i); pred(i) = start; visited(i) = 0; ) distance(start) = 0; visited(start) = 1; count = 1; while (count < n - 1) ( mindistance = INFINITY; for (i = 0; i < n; i++) if (distance(i) < mindistance && !visited(i)) ( mindistance = distance(i); nextnode = i; ) visited(nextnode) = 1; for (i = 0; i < n; i++) if (!visited(i)) if (mindistance + cost(nextnode)(i) < distance(i)) ( distance(i) = mindistance + cost(nextnode)(i); pred(i) = nextnode; ) count++; ) // Printing the distance for (i = 0; i < n; i++) if (i != start) ( printf("Distance from source to %d: %d", i, distance(i)); ) ) int main() ( int Graph(MAX)(MAX), i, j, n, u; n = 7; Graph(0)(0) = 0; Graph(0)(1) = 0; Graph(0)(2) = 1; Graph(0)(3) = 2; Graph(0)(4) = 0; Graph(0)(5) = 0; Graph(0)(6) = 0; Graph(1)(0) = 0; Graph(1)(1) = 0; Graph(1)(2) = 2; Graph(1)(3) = 0; Graph(1)(4) = 0; Graph(1)(5) = 3; Graph(1)(6) = 0; Graph(2)(0) = 1; Graph(2)(1) = 2; Graph(2)(2) = 0; Graph(2)(3) = 1; Graph(2)(4) = 3; Graph(2)(5) = 0; Graph(2)(6) = 0; Graph(3)(0) = 2; Graph(3)(1) = 0; Graph(3)(2) = 1; Graph(3)(3) = 0; Graph(3)(4) = 0; Graph(3)(5) = 0; Graph(3)(6) = 1; Graph(4)(0) = 0; Graph(4)(1) = 0; Graph(4)(2) = 3; Graph(4)(3) = 0; Graph(4)(4) = 0; Graph(4)(5) = 2; Graph(4)(6) = 0; Graph(5)(0) = 0; Graph(5)(1) = 3; Graph(5)(2) = 0; Graph(5)(3) = 0; Graph(5)(4) = 2; Graph(5)(5) = 0; Graph(5)(6) = 1; Graph(6)(0) = 0; Graph(6)(1) = 0; Graph(6)(2) = 0; Graph(6)(3) = 1; Graph(6)(4) = 0; Graph(6)(5) = 1; Graph(6)(6) = 0; u = 0; Dijkstra(Graph, n, u); return 0; )
// Dijkstra's Algorithm in C++ #include #include #define INT_MAX 10000000 using namespace std; void DijkstrasTest(); int main() ( DijkstrasTest(); return 0; ) class Node; class Edge; void Dijkstras(); vector* AdjacentRemainingNodes(Node* node); Node* ExtractSmallest(vector& nodes); int Distance(Node* node1, Node* node2); bool Contains(vector& nodes, Node* node); void PrintShortestRouteTo(Node* destination); vector nodes; vector edges; class Node ( public: Node(char id) : id(id), previous(NULL), distanceFromStart(INT_MAX) ( nodes.push_back(this); ) public: char id; Node* previous; int distanceFromStart; ); class Edge ( public: Edge(Node* node1, Node* node2, int distance) : node1(node1), node2(node2), distance(distance) ( edges.push_back(this); ) bool Connects(Node* node1, Node* node2) ( return ( (node1 == this->node1 && node2 == this->node2) || (node1 == this->node2 && node2 == this->node1)); ) public: Node* node1; Node* node2; int distance; ); /////////////////// void DijkstrasTest() ( Node* a = new Node('a'); Node* b = new Node('b'); Node* c = new Node('c'); Node* d = new Node('d'); Node* e = new Node('e'); Node* f = new Node('f'); Node* g = new Node('g'); Edge* e1 = new Edge(a, c, 1); Edge* e2 = new Edge(a, d, 2); Edge* e3 = new Edge(b, c, 2); Edge* e4 = new Edge(c, d, 1); Edge* e5 = new Edge(b, f, 3); Edge* e6 = new Edge(c, e, 3); Edge* e7 = new Edge(e, f, 2); Edge* e8 = new Edge(d, g, 1); Edge* e9 = new Edge(g, f, 1); a->distanceFromStart = 0; // set start node Dijkstras(); PrintShortestRouteTo(f); ) /////////////////// void Dijkstras() ( while (nodes.size()> 0) ( Node* smallest = ExtractSmallest(nodes); vector* adjacentNodes = AdjacentRemainingNodes(smallest); const int size = adjacentNodes->size(); for (int i = 0; i at(i); int distance = Distance(smallest, adjacent) + smallest->distanceFromStart; if (distance distanceFromStart) ( adjacent->distanceFromStart = distance; adjacent->previous = smallest; ) ) delete adjacentNodes; ) ) // Find the node with the smallest distance, // remove it, and return it. Node* ExtractSmallest(vector& nodes) ( int size = nodes.size(); if (size == 0) return NULL; int smallestPosition = 0; Node* smallest = nodes.at(0); for (int i = 1; i distanceFromStart distanceFromStart) ( smallest = current; smallestPosition = i; ) ) nodes.erase(nodes.begin() + smallestPosition); return smallest; ) // Return all nodes adjacent to 'node' which are still // in the 'nodes' collection. vector* AdjacentRemainingNodes(Node* node) ( vector* adjacentNodes = new vector(); const int size = edges.size(); for (int i = 0; i node1 == node) ( adjacent = edge->node2; ) else if (edge->node2 == node) ( adjacent = edge->node1; ) if (adjacent && Contains(nodes, adjacent)) ( adjacentNodes->push_back(adjacent); ) ) return adjacentNodes; ) // Return distance between two connected nodes int Distance(Node* node1, Node* node2) ( const int size = edges.size(); for (int i = 0; i Connects(node1, node2)) ( return edge->distance; ) ) return -1; // should never happen ) // Does the 'nodes' vector contain 'node' bool Contains(vector& nodes, Node* node) ( const int size = nodes.size(); for (int i = 0; i < size; ++i) ( if (node == nodes.at(i)) ( return true; ) ) return false; ) /////////////////// void PrintShortestRouteTo(Node* destination) ( Node* previous = destination; cout << "Distance from start: " id
node2 == node) ( cout << "adjacent: " id
Dijkstra's Algorithm Complexity
Time Complexity: O(E Log V)
where, E is the number of edges and V is the number of vertices.
Space Complexity: O(V)
Dijkstra's Algorithm Applications
- To find the shortest path
- In social networking applications
- In a telephone network
- To find the locations in the map
