In this paper, we study the distribution on \ (kⁿ\) for the parameter recording the number of indices \ (i n-1\) within a word \ (w=w₁ wₙ\) such that \ (|w₈+₁-wᵢ|\ 1\) and compute the corresponding (bivariate) generating function. A circular version of the problem wherein one considers whether or not \ (|wₙ-w₁|\ 1\) as well is also treated. As special cases of our results, one obtains formulas involving staircase and Hertzsprung words in both the linear and circular cases. We make use of properties of special matrices in deriving our results, which may be expressed in terms of Chebyshev polynomials. A generating function formula is also found for the comparable statistic on finite set partitions with a fixed number of blocks represented sequentially.
Fried et al. (Tue,) studied this question.
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