Dijkstra: Difference between revisions
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''Dijstra's algorithm'' is a graph algortihm solving the single-source shortest-paths problem. | '''Dijstra's algorithm''' is a graph algortihm solving the single-source shortest-paths problem. | ||
== Requirements == | == Requirements == | ||
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* directed Grpah ''G'' = (''V,E'') | * directed Grpah ''G'' = (''V,E'') | ||
* weight function ''w'' : ''E'' → ℜ | * weight function ''w'' : ''E'' → ℜ | ||
* ∀ (''u,v'') ∈ | * ∀ (''u,v'') ∈ E : ''w''(''u,v'') ≥ 0 | ||
== Pseudocode == | == Pseudocode == |
Revision as of 16:40, 25 September 2014
Dijstra's algorithm is a graph algortihm solving the single-source shortest-paths problem.
Requirements
- directed Grpah G = (V,E)
- weight function w : E → ℜ
- ∀ (u,v) ∈ E : w(u,v) ≥ 0
Pseudocode
DIJKSTRA(G,w,s)
DIJKSTRA(G,w,s)
1 INITIALIZE-SINGLE-SOURCE(G,s)
2 S = ∅
3 Q = G.V
4 while Q ≠ ∅
5 u = EXTRACT-MIN(Q)
6 S = S ∪ {u}
7 for each vertex v ∈ G.Adj[u]
8 RELAX(u,v,w)
RELAX(u,v,w)
RELAX(u,v,w)
1 if v.d > u.d + w(u,v)
2 v.d = u.d + w(u,v)
3 v.π = u
INITIALIZE-SINGLE-SOURCE(G,s)
INITIALIZE-SINGLE-SOURCE(G,s)
1 for each vertex v ∈ G.V
2 v.d = ∞
3 v.π = NIL
4 s.d = 0