Hi so i'm doing some test prep and i need to figure out parts b and c. I know part a is true and i can prove it, but finding the algorithms for part b and c is currently eluding me.
Solve the following for a minimum bottleneck tree where the edge with the maximum cost is referred to as the bottleneck. (a) Is every minimum-bottleneck spanning tree of G a minimum-spanning tree of G? Prove your claim.
(b) For a given cost c, give an O(n+m)-time algorithm to find if the bottleneck cost of a minimum-bottleneck spanning tree of G is not more than c.
(c) Find an algorithm to find a minimum-bottleneck spanning tree of G.
thanks in advance to anyone who can help me out