Permanents of cyclic (0,1) matrices

Journal of Combinatorial Theory Pub Date : 1969-12-01 DOI:10.1016/S0021-9800(69)80058-X

N. Metropolis, M.L. Stein, P.R. Stein

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引用次数: 18

Abstract

An efficient method is presented for evaluating the permanents P_n^k of cyclic (0,1) matrices of dimension n and common row and column sum k. A general method is developed for finding recurrence rules for P_n^k (k fixed); the recurrence rules are given in semiexplicit form for the range 4≤k≤9. A table of P_n^k is included for the range 4≤k≤9, k≤n≤80. The P_n^k are calculated in the form $P_{n}^{k} = 2 + \sum_{τ - 1}^{[\frac{k - 1}{2}]} T_{τ}^{k} (n)$ where the T_t^k(n) satisfy recurrence rules given symbolically by the characteristic equations of certain (0, 1) matrices Π_r^k; the latter turn out to be identical with the r-th permanental compounds of certain simpler matrices Π₁^k. Finally, formal expressions for P_n^k are given which allow one to write down the solution to the generalized Ménage Problem in terms of sums over scalar products of the iterates of a set of unit vectors.

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循环(0,1)矩阵的永久元

给出了求维数为n的循环(0,1)矩阵的恒量Pnk的一种有效方法，并给出了求Pnk (k固定)的递归规则的一般方法;以半显式形式给出了4≤k≤9范围内的递归规则。在4≤k≤9,k≤n≤80范围内，包含一个Pnk表。Pnk的计算形式为:Pnk=2+∑τ−1[k−12]τk(n)，其中Ttk(n)满足由某些(0,1)矩阵的特征方程符号化地给出的递归规则Πrk;后者与某些更简单的矩阵的r-永久化合物相同Π1k。最后，给出了Pnk的形式表达式，它允许人们用单位向量集合的迭代的标量积的和的形式写出广义msamnage问题的解。

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Journal of Combinatorial Theory

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