Bijective enumerations of -free 0-1 matrices
Abstract
We construct a new bijection between the set of n× k 0-1 matrices with no three 1's forming a configuration and the set of (n,k)-Callan sequences, a simple structure counted by poly-Bernoulli numbers. We give two applications of this result: We derive the generating function of -free matrices, and we give a new bijective proof for an elegant result of Aval et al. that states that the number of complete non-ambiguous forests with n leaves is equal to the number of pairs of permutations of \1,…,n\ with no common rise.
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