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I would like to use it to find the maximum cost of ways. What and how to rewrite to make it work?

This code finds the min cost, and I don't know, what to do. I've found it in the internet, but it can contains mistakes.

#include <iostream>
#include <vector>
#include <string>
#include <list>

#include <limits> // for numeric_limits

#include <set>
#include <utility> // for pair
#include <algorithm>
#include <iterator>


typedef int vertex_t;
typedef double weight_t;

const weight_t max_weight = std::numeric_limits<double>::infinity();

struct neighbor {
vertex_t target;
weight_t weight;
neighbor(vertex_t arg_target, weight_t arg_weight)
    : target(arg_target), weight(arg_weight) { }
};

typedef std::vector<std::vector<neighbor> > adjacency_list_t;


void DijkstraComputePaths(vertex_t source,
                      const adjacency_list_t &adjacency_list,
                      std::vector<weight_t> &min_distance,
                      std::vector<vertex_t> &previous)
{
int n = adjacency_list.size();
min_distance.clear();
min_distance.resize(n, max_weight);
min_distance[source] = 0;
previous.clear();
previous.resize(n, -1);
std::set<std::pair<weight_t, vertex_t> > vertex_queue;
vertex_queue.insert(std::make_pair(min_distance[source], source));

while (!vertex_queue.empty())
{
    weight_t dist = vertex_queue.begin()->first;
    vertex_t u = vertex_queue.begin()->second;
    vertex_queue.erase(vertex_queue.begin());

    // Visit each edge exiting u
const std::vector<neighbor> &neighbors = adjacency_list[u];
    for (std::vector<neighbor>::const_iterator neighbor_iter = neighbors.begin();
         neighbor_iter != neighbors.end();
         neighbor_iter++)
    {
        vertex_t v = neighbor_iter->target;
        weight_t weight = neighbor_iter->weight;
        weight_t distance_through_u = dist + weight;
    if (distance_through_u < min_distance[v]) {
        vertex_queue.erase(std::make_pair(min_distance[v], v));

        min_distance[v] = distance_through_u;
        previous[v] = u;
        vertex_queue.insert(std::make_pair(min_distance[v], v));

    }

    }
}
}


std::list<vertex_t> DijkstraGetShortestPathTo(
vertex_t vertex, const std::vector<vertex_t> &previous)
{
std::list<vertex_t> path;
for ( ; vertex != -1; vertex = previous[vertex])
    path.push_front(vertex);
return path;
}


int main()
{
// remember to insert edges both ways for an undirected graph
adjacency_list_t adjacency_list(6);
// 0 = a
adjacency_list[0].push_back(neighbor(1, 7));
adjacency_list[0].push_back(neighbor(2, 9));
adjacency_list[0].push_back(neighbor(5, 14));
adjacency_list[0].push_back(neighbor(4, 14));
adjacency_list[0].push_back(neighbor(4, 914));
// 1 = b
adjacency_list[1].push_back(neighbor(0, 7));
adjacency_list[1].push_back(neighbor(2, 10));
adjacency_list[1].push_back(neighbor(3, 15));
// 2 = c
adjacency_list[2].push_back(neighbor(0, 9));
adjacency_list[2].push_back(neighbor(1, 10));
adjacency_list[2].push_back(neighbor(3, 11));
adjacency_list[2].push_back(neighbor(5, 2));
// 3 = d
adjacency_list[3].push_back(neighbor(1, 15));
adjacency_list[3].push_back(neighbor(2, 11));
adjacency_list[3].push_back(neighbor(4, 6));
// 4 = e
adjacency_list[4].push_back(neighbor(3, 6));
adjacency_list[4].push_back(neighbor(5, 9));
// 5 = f
adjacency_list[5].push_back(neighbor(0, 14));
adjacency_list[5].push_back(neighbor(2, 2));
adjacency_list[5].push_back(neighbor(4, 9));

std::vector<weight_t> min_distance;
std::vector<vertex_t> previous;
DijkstraComputePaths(0, adjacency_list, min_distance, previous);
std::cout << "Distance from 0 to 4: " << min_distance[4] << std::endl;
std::list<vertex_t> path = DijkstraGetShortestPathTo(4, previous);
std::cout << "Path : ";
std::copy(path.begin(), path.end(), std::ostream_iterator<vertex_t>(std::cout, " "));
std::cout << std::endl;

return 0;
}
share|improve this question

closed as not a real question by Sean Owen, bensiu, Mr. Alien, EdChum, Raghunandan Apr 21 '13 at 7:39

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center. If this question can be reworded to fit the rules in the help center, please edit the question.

1 Answer 1

Instead of tracking the way with the minimum cost found so far track the one with the maximum:

if (distance_through_u > min_distance[v]) {

The distance vector must be initialized with the minimum allowed distance now, so

min_distance.resize(n, -max_weight);   // not a C++ expert, should be -inf

And keep in mind that now min_distance stores the maximum distance, so change its name as well as the name of every other involved var, so not to confuse who reads your code ;)

share|improve this answer
    
but it now writes "inf" –  Tűzálló Földgolyó Apr 20 '13 at 19:16
    
@TűzállóFöldgolyó try now –  BlackBear Apr 20 '13 at 19:18
    
it is not good... it's running, and running... nothing happens –  Tűzálló Földgolyó Apr 20 '13 at 19:25
    
@BlackBear I'm confused why you thought this would work. Consider a graph with all positive weights. What's the longest way to get from arbitrary node a to b? Simple. Go to b. Then go back to a. Then go to b... It's infinity. Try using conventional Dijkstra's with a negative cycle (you get the same result). It might be possible to convert "Dijkstra's" into solving OP's problem but it would be pretty much an entirely different algorithm at that point. –  rliu Apr 20 '13 at 20:02
    
edit I was a bit imprecise. I think technically Dijkstra's will pick an arbitrary path that is reasonably long. If you write Dijkstra's a certain way (so that no node is added twice) then you won't get infinity, but you also won't get the longest path with no repeated nodes (just think about it) –  rliu Apr 20 '13 at 20:04

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