Mean Divisibility of Multinomial coefficients
Abstract
Let m1,...,ms be positive integers. Consider the sequence defined by multinomial coefficients: an=(m1+m2+... +ms)nm1 n, m2 n,..., ms n. Fix a positive integer k 2. We show that there exists a positive integer C(k) such that Πn=1t aknΠn=1t an ∈ 1C(k) for all positive integer t, if and only if GCD(m1,...,ms)=1.
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