Let's say I have this graph

- always a full graph
- one start node - also the finish node
- weighted nodes and vertices

I want to find a path short as possible but with the best score (sum of points of nodes) - in other words a path that can't be longer then some defined constant but give me the best amount of points. And I want to start and stop in the same node and don't want to go over already visited nodes.

Are there any algorithms which could help me with this problem or do you have any ideas how to solve it?

Oh, and it's *not* a homework, I just want to create a special path finder.

**EDIT**

So far I've been able to construct a working algorithm which can find some path in a few seconds. But I don't get the amount of points I'd like to - I get only about 85% of the desired score. And if I change the algoritm's parameters then time will be in hours and more...

`(u,v)`

such that`u`

is your source and`(u,v),(v,u)`

is the shortest path. You didn't mention any problems using the same edge twice. – amit Mar 17 '12 at 18:14`v -> ... -> v`

, and`v`

must be visited twice. – amit Mar 17 '12 at 18:16`(start,v) -> (v,start)`

feasible in your situation? – amit Mar 17 '12 at 18:23`start -> 5p -> 2p -> start`

would give me more points and the same length. One of possible solutions could be also this:`start -> 5p -> 8p -> start`

(depending on the maximum allowed length). – Tomas Mar 17 '12 at 18:29