Recurrence of bipartite planar maps

Jakob E. Björnberg; Sigurdur Ö Stefánsson

doi:10.1214/EJP.v19-3102

Recurrence of bipartite planar maps

Jakob E. Björnberg, Sigurdur Ö Stefánsson

Faculty of Physical Sciences

University of Iceland

Research output: Contribution to journal › Article › peer-review

Abstract

This paper concerns random bipartite planar maps which are defined by assigning weights to their faces. The paper presents a threefold contribution to the theory. Firstly, we prove the existence of the local limit for all choices of weights and describe it in terms of an infinite mobile. Secondly, we show that the local limit is in all cases almost surely recurrent. And thirdly, we show that for certain choices of weights the local limit has exactly one face of infinite degree and has in that case spectral dimension 4/3 (the latter requires a mild moment condition).

Original language	English
Journal	Electronic Journal of Probability
Volume	19
DOIs	https://doi.org/10.1214/EJP.v19-3102
Publication status	Published - 12 Mar 2014

Other keywords

Local limits
Planar maps
Random walk
Simply generated trees

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10.1214/EJP.v19-3102

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abstract = "This paper concerns random bipartite planar maps which are defined by assigning weights to their faces. The paper presents a threefold contribution to the theory. Firstly, we prove the existence of the local limit for all choices of weights and describe it in terms of an infinite mobile. Secondly, we show that the local limit is in all cases almost surely recurrent. And thirdly, we show that for certain choices of weights the local limit has exactly one face of infinite degree and has in that case spectral dimension 4/3 (the latter requires a mild moment condition).",

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N2 - This paper concerns random bipartite planar maps which are defined by assigning weights to their faces. The paper presents a threefold contribution to the theory. Firstly, we prove the existence of the local limit for all choices of weights and describe it in terms of an infinite mobile. Secondly, we show that the local limit is in all cases almost surely recurrent. And thirdly, we show that for certain choices of weights the local limit has exactly one face of infinite degree and has in that case spectral dimension 4/3 (the latter requires a mild moment condition).

AB - This paper concerns random bipartite planar maps which are defined by assigning weights to their faces. The paper presents a threefold contribution to the theory. Firstly, we prove the existence of the local limit for all choices of weights and describe it in terms of an infinite mobile. Secondly, we show that the local limit is in all cases almost surely recurrent. And thirdly, we show that for certain choices of weights the local limit has exactly one face of infinite degree and has in that case spectral dimension 4/3 (the latter requires a mild moment condition).

KW - Local limits

KW - Planar maps

KW - Random walk

KW - Simply generated trees

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DO - 10.1214/EJP.v19-3102

M3 - Article

SN - 1083-6489

VL - 19

JO - Electronic Journal of Probability

JF - Electronic Journal of Probability

ER -

Recurrence of bipartite planar maps

Abstract

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