Counting Baxter Matrices

Abstract

Donald Knuth recently introduced the notion of a Baxter matrix, generalizing Baxter permutations. We show that for fixed number of rows, r, the number of Baxter matrices with r rows and k columns eventually satisfies a polynomial in k of degree 2r-2. We also give a proof of Knuth's conjecture that the number of 1's in a r × k Baxter matrix is less than r+k.

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