The Boolean quadratic forms and tangent law
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Published:2024-01-29
Issue:
Volume:
Page:
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ISSN:2010-3263
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Container-title:Random Matrices: Theory and Applications
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language:en
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Short-container-title:Random Matrices: Theory Appl.
Author:
Ejsmont Wiktor1ORCID,
Hęćka Patrycja1ORCID
Affiliation:
1. Department of Telecommunications and Teleinformatics, Wroclaw University of Science and Technology, Wybrzeże Wyspiańskiego 27, 50-370 Wrocław, Poland
Abstract
In [W. Ejsmont and F. Lehner, The free tangent law,Adv. Appl. Math. 121 (2020) 102093], we study the limit sums of free commutators and anticommutators and show that the generalized tangent function [Formula: see text] describes the limit distribution. This is the generating function of the higher order tangent numbers of Carlitz and Scoville (see (1.6) in [L. Carlitz and R. Scoville, Tangent numbers and operators, Duke Math. J. 39 (1972) 413–429]) which arose in connection with the enumeration of certain permutations. In this paper, we continue to study the limit of weighted sums of Boolean commutators and anticommutators and we show that the shifted generalized tangent function appears in a limit theorem. In order to do this, we shall provide an arbitrary cumulants formula of the quadratic form. We also apply this result to obtain several results in a Boolean probability theory.
Funder
Narodowe Centrum Nauki, Poland WEAVEUNISONO
Publisher
World Scientific Pub Co Pte Ltd
Subject
Discrete Mathematics and Combinatorics,Statistics, Probability and Uncertainty,Statistics and Probability,Algebra and Number Theory
Cited by
1 articles.
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