Log-Concavity and Related Properties of the Cycle Index Polynomials
نویسندگان
چکیده
Let An denote the n-th cycle index polynomial, in the variables Xj , for the symmetric group on n letters. We show that if the variables Xj are assigned nonnegative real values which are logconcave, then the resulting quantities An satisfy the two inequalities An−1An+1 ≤ An ≤ ( n+1 n ) An−1An+1. This implies that the coefficients of the formal power series exp(g(u)) are log-concave whenever those of g(u) satisfy a condition slightly weaker than log-concavity. The latter includes many familiar combinatorial sequences, only some of which were previously known to be log-concave. To prove the first inequality we show that in fact the difference An−An−1An+1 can be written as a polynomial with positive coefficients in the expressions Xj and XjXk −Xj−1Xk+1, j ≤ k. The second inequality is proven combinatorially, by working with the notion of a marked permutation, which we introduce in this paper. The latter is a permutation each of whose cycles is assigned a subset of available markers {Mi,j}. Each marker has a weight, wt(Mi,j) = xj , and we relate the second inequality to properties of the weight enumerator polynomials. Finally, using asymptotic analysis, we show that the same inequalities hold for n sufficiently large when the Xj are fixed with only finitely many nonzero values, with no additional assumption on the Xj .
منابع مشابه
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ورودعنوان ژورنال:
- J. Comb. Theory, Ser. A
دوره 74 شماره
صفحات -
تاریخ انتشار 1996