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
for all u ∈ V
loop is not nested into the first.