Skip to content

Latest commit

 

History

History

depth-first-search

Folders and files

NameName
Last commit message
Last commit date

parent directory

..
 
 
 
 
 
 

Depth First Search (DFS)

Objective

  • Learn about one of the more famous graph algorithms
  • Learn uses of DFS

Overview

When searching a graph, one of the approaches is called depth first search. This "dives" "down" the graph as far as it can before needing to backtrack and explore another branch.

The algorithm never attempts to explore a vert that it either has explored or is exploring.

For example, when starting from the upper left, the numbers on this graph show a vertex visitation order in a DFS:

DFS visit order

The bold lines show with edges were followed. (The thin edges were not followed since their destination nodes had already been visited.)

(Of course, the exact order will vary depending on which branches get taken first and which vertex is the starting vertex.)

Applications of DFS

Coloring Vertexes

As the graph is explored, it's useful to color verts as you arrive at them and as you leave them behind as "already searched".

Commonly, unvisited verts are white, verts whose neighbors are being explored are gray, and verts with no unexplored neighbors are black.

Recursion

Since we want to pursue leads in the graph as far as we can, and then "back up" to an earlier branch point to explore that way, recursion is a good approach to help "remember" where we left off.

Looking at it with pseudocode to make the recursion more apparent:

explore(graph) {
    visit(this_vert);
    explore(remaining_graph);
}

Pseudocode for DFS

DFS(graph):
    for v of graph.verts:
        v.color = white
        v.parent = null

    for v of graph.verts:
        if v.color == white:
            DFS_visit(v)

DFS_visit(v):
    v.color = gray

    for neighbor of v.adjacent_nodes:
        if neighbor.color == white:
            neighbor.parent = v
            DFS_visit(neighbor)

    v.color = black

Exercises

  • Build a random graph and show a vertex visitation order for DFS.

  • One more for good measure.