Limit shape of random convex polygonal lines: Even more universality

The paper concerns the limit shape (under some probability measure) of convex polygonal lines with vertices on Z+2, starting at the origin and with the right endpoint n=(n1,n2)→∞. In the case of the uniform measure, an explicit limit shape γ⁎:={(x1,x2)∈R+2:1−x1+x2=1} was found independently by Versh...

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Bibliographic Details
Published inJournal of combinatorial theory. Series A Vol. 127; pp. 353 - 399
Main Author Bogachev, Leonid V.
Format Journal Article
LanguageEnglish
Published Elsevier Inc 01.09.2014
Subjects
Convex lattice polygonal line
Cumulants
Generating function
Limit shape
Local limit theorem
Multiplicative measures
Möbius inversion formula
Generating function
Möbius inversion formula
Limit shape
Local limit theorem
Convex lattice polygonal line
Cumulants
Multiplicative measures
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Summary:The paper concerns the limit shape (under some probability measure) of convex polygonal lines with vertices on Z+2, starting at the origin and with the right endpoint n=(n1,n2)→∞. In the case of the uniform measure, an explicit limit shape γ⁎:={(x1,x2)∈R+2:1−x1+x2=1} was found independently by Vershik (1994) [19], Bárány (1995) [3], and Sinaĭ (1994) [16]. Recently, Bogachev and Zarbaliev (1999) [5] proved that the limit shape γ⁎ is universal for a certain parametric family of multiplicative probability measures generalizing the uniform distribution. In the present work, the universality result is extended to a much wider class of multiplicative measures, including (but not limited to) analogs of the three meta-types of decomposable combinatorial structures — multisets, selections, and assemblies. This result is in sharp contrast with the one-dimensional case where the limit shape of Young diagrams associated with integer partitions heavily depends on the distributional type.
ISSN:0097-3165
1096-0899
DOI:10.1016/j.jcta.2014.07.005