Abstract

In unconditionally secure protocols, a sender and receiver are able to communicate their secrets to each other without the eavesdropper(s) being able to learn the secret, even when the eavesdropper intercepts the entire communication. We investigate such protocols for the special case of deals of cards over players, where two players aim to communicate to each other their hand of cards without the remaining player(s) learning a single card from either hand. In this contribution we show that a particular protocol of length strictly larger than two (i.e., consisting of more than just one announcement by one player, and one other announcement by the other player) is after all not acceptable, and therefore does not constitute a new solution. The demonstration requires a detailed case-based analysis. The result may bring a general approach to arbitrary finite-length protocols closer.