A unimodal sequence with mode at a quarter length
Abstract
We show that the number A(n,m) of partitions with m even parts and largest hook length n is strongly unimodal with mode [(n-1)/4] for n 6. We establish this result by induction, using a 5-term recurrence due to Lin, Xiong and Yan, and two 4-term recurrences obtained by Zeilberger's algorithm. The sequence A(n,m) is not log-concave. Using M\"obius transformation and the method of interlacing zeros, we obtain that every zero of every generating function Σm A(n,m)zm lies on the left half part of the circle |z-1|=2. Moreover, as a direct application of Wang and Zhang's characterization of root geometry of polynomial sequences that satisfy a recurrence of type (1,1), we see that all these zeros are densely distributed on the half circle.
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