I'm thinking about a problem in graphs, one part of this problem is as described:

We have a graph G=(V,E), and its spanning tree T=(V,F) (F is subset of E), for each min cut in G (on E), which partitions the graph into two subgraphs with nodes (U,U') (not necessary for each subgraph to be connected) we check the size of this cut in F, name size of them G(U,U') and T(U,U'), I want to find:

```
ratio = max{T(U,U')/G(U,U')} for all possible U,U'
```

I think this is NP-Hard, but I cannot prove it. Something is obvious here, that is if we have a vertex in T with same degree as G, ratio is `1`

, Also It is obvious 0 < ratio <= 1.

U intersect U' = null, U union U' = V, and none of the U and U' are empty.