Run DAG-SHORTEST-PATHS on the directed graph of Figure 24.5, using vertex r as the source.
straightforward.
Suppose we change line 3 of DAG-SHORTEST-PATHS to read 3 for the first |V| - 1 vertices, taken in topologically sorted order Show that the procedure would remain correct.
因为最后一次对结果没有影响.
The PERT chart formulation given above is somewhat unnatural. It would be more natural for vertices to represent jobs and edges to represent sequencing constraints; that is, edge (u, v) would indicate that job u must be performed before job v. Weights would then be assigned to vertices, not edges. Modify the DAG-SHORTEST-PATHS procedure so that it finds a longest path in a directed acyclic graph with weighted vertices in linear time.
PERT(G)
topologically sort the vertices of G
INITIALIZE(G)
for each vertex u, taken in topologically sorted order
do for each vertex v ∈ Adj[u]
do RELAX(u,v)
INITIALIZE(G)
for each vertex v ∈ V[G]
do d[v] = w[v]
π[v] = NIL
RELAX(u, v)
if(d[v] < d[u] + w[v])
d[v] = d[u] + w[v]
u[v] = uGive an efficient algorithm to count the total number of paths in a directed acyclic graph. Analyze your algorithm.
DAG-PATHS(G, s)
topologically sort the vertices of G
INITIALIZE(G, s)
for each vertex u, taken in topologically sorted order
do for each vertex v ∈ Adj[u]
do c[v] = c[v] + c[u]
INITIALIZE(G, s)
for each vertex v ∈ V[G]
do c[v] = 0
c[s] = 1Follow @louis1992 on github to help finish this task.
本节部分答案参考自这里