Greedy Gossiping
Abstract
The renowned Gossiping Problem (1971) asks the following. There are n people who each know an item of gossip. In a telephone call, two people share all the gossip they know. How many calls are needed for all of them to be informed of all the gossip? If n 4, the answer is 2n-4. We initiate and solve the related Greedy Gossiping Problem: given a fixed number m<2n-4 of calls, at most how much gossip can be known altogether? If every call increases the total knowledge of gossip as much as possible, the sum reaches n2 only when m=2n-3. Our main result is that surprisingly, for each m<2n-4, this calling strategy is optimal.
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