Shortest Path Problem: Difference between revisions
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OPT(a, n-1) = min(w(u,a) + OPT(n-1, u)) | OPT(a, n-1) = min(w(u,a) + OPT(n-1, u)) | ||
</pre> | </pre> | ||
where <math> (u, a) \in E </math> | where | ||
<math> (u, a) \in E </math> |
Revision as of 01:44, 28 February 2024
Definitions
A path is a sequence of nodes such that for all consecutive nodes, there exist an edge
Let there be a weight assigned to each edge.
Single Source Shortest Path (SSSP)
Given a graph , source node , outupt the shortest path from the source
Variants
- Single destination problem: shortest path from all nodes to a single destination
- Single pair problem: Shortest path between input pair
Implementation
All shortest path must have edges. If this condition is not satisfied, there is a cycle in in the path, and therefore it is not the shortest.
OPT(a, n-1) = min(w(u,a) + OPT(n-1, u))
where