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A source in a directed graph is a node that has no edges going into it. Give a linear-time algorithm that takes as input a directed graph in adjacency list format, and outputs all of its sources.

solution:

Finding the sources of a directed graph. We will keep an array in[u] which holds the indegree (number of incoming edges) of each node. For a source, this value is zero.

function sources(G)
Input: Directed graph G = (V,E)
Output: A list of G's source nodes
for all u ∈ V : in[u] = 0
for all u ∈ V :
    for all edges (u,w) ∈ E:
      in[w] = in[w] + 1

L = empty linked list
for all u ∈ V :
    if in[u] is 0: add u to L
return L

the thing i particularly do not understand about the code above is the innermost for loop in the first code block what exactly does in[w] = in[w]+1 mean? i think it means its counting the indegrees of each node, but how exactly it's doing that i cannot picture it, can someone please help me visualize this aspect

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  • It is looping over all edges u->w and incrementing the indegree for w node. What don't you understand? Nov 1, 2013 at 5:25
  • why specifically the w node and not u as well? how does that work? Nov 1, 2013 at 5:33
  • The edge is a directed edge from u to w. We want to count the number of incoming edges to the nodes. The node with zero 'incoming' edges is our source node. Nov 1, 2013 at 5:36
  • 1
    The indentation in your pseudo code is misleading. The second for all u ∈ V loop is not nested into the first.
    – Henry
    Nov 1, 2013 at 6:33

1 Answer 1

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in[w] = in[w] + 1 increases the number of edges going into w.

Maybe an example will help:

Consider a simple graph:

a ---> b

The adjacency list representation is:

a: {b}
b: {}

Now the algorithm will loop through all vertices.

For a, it will loop over the edge (a,b) and increase b's count.

For b, there are no edges.

Now a's count is still zero, thus it is a source vertex.

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