A következő kombinatorika szemináriumok ideje
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Abstract: It is elementary to see that the removal of any single element from a poset decreases the dimension of the poset by at most 1. So the removal of any pair decreases the dimension by at most 2. If the removal of a certain pair decreases the dimension by less than 2, it is called a removable pair. It is a classic conjecture that every poset on at least 3 points contains a removable pair. We discuss the history and the related theory, and we present a proof for a somewhat younger version of the conjecture for fractional dimension. The talk will not assume any prior knowledge of poset theory.
Joint work with Peter Hamburger and Attila Pór.
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