Impact
~8k
people reached
- 0 posts edited
- 0 helpful flags
- 14 votes cast
May
14 |
awarded | Supporter |
May
14 |
awarded | Editor |
May
14 |
revised |
How hard is this in terms of computational complexity?
added 242 characters in body; deleted 242 characters in body |
May
14 |
comment |
How hard is this in terms of computational complexity?
Re rrenaud: Yes. In my previous comment I stated that I should add a terminal character to each string. If I do that, the only constraint is that I need to keep the terminal character fixed at the end. |
May
14 |
comment |
How hard is this in terms of computational complexity?
Re sleeplessnerd: There are some instances where a DAG that is not a tree minimizes the cost, but I think in general there exists a tree that minimizes the cost. For example, a graph that minimizes BA, BE, and BBE can be a DAG that is not a tree. Incidentally, I noticed a flaw in my problem description, in that if I want your algorithm to work properly, I need to end each string with a terminal character. Other than that, I think your algorithm is correct and I feel silly for missing it. That's what happens when you decide a problem is hard at 3 AM without checking yourself in the morning! |
May
14 |
comment |
How hard is this in terms of computational complexity?
Re Aryabhatta: sorry that it is not clear. What I am doing is walking down each path in the dag. When I am done walking down a path, I move back up to where the last branch from that path occurred and walk down that path. The idea is that if I have already walked down the prefix of a path, I just have to visit the rest of it. I care about walking down each path in this manner, so I may visit a node multiple times if it lies on multiple paths. Does this make it clear? |
May
14 |
awarded | Student |
May
14 |
asked | How hard is this in terms of computational complexity? |