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arxiv 2103.03615 v1 pith:3Q4YZ57R submitted 2021-03-05 math.CO math-phmath.MPquant-ph

Generating series and matrix models for meandric systems with one shallow side

classification math.CO math-phmath.MPquant-ph
keywords meandricsystemsshallowsidearchcorrespondinggeneratinginterval
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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In this article, we investigate meandric systems having one shallow side: the arch configuration on that side has depth at most two. This class of meandric systems was introduced and extensively examined by I. P. Goulden, A. Nica, and D. Puder in 2020. Shallow arch configurations are in bijection with the set of interval partitions. We study meandric systems by using moment-cumulant transforms for non-crossing and interval partitions, corresponding to the notions of free and boolean independence, respectively, in non-commutative probability. We obtain formulas for the generating series of different classes of meandric systems with one shallow side, by explicitly enumerating the simpler, irreducible objects. In addition, we propose random matrix models for the corresponding meandric polynomials, which can be described in the language of quantum information theory, in particular that of quantum channels.

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