On the joint distribution of the area and the number of peaks for Bernoulli excursions
Abstract
Let Pn be a random Bernoulli excursion of length 2n. We show that the area under Pn and the number of peaks of Pn are asymptotically independent. We also show that these statistics have the correlation coefficient asymptotic to c /n for large n, where c < 0, and explicitly compute the coefficient c.
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