Rerooting Multi-type Branching Trees: The Infinite Spine Case

Benedikt Stufler ()
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Benedikt Stufler: Vienna University of Technology

Journal of Theoretical Probability, 2022, vol. 35, issue 2, 653-684

Abstract: Abstract We prove local convergence results for rerooted conditioned multi-type Galton–Watson trees. The limit objects are multitype variants of the random sin-tree constructed by Aldous (1991), and differ according to which types recur infinitely often along the backwards growing spine.

Keywords: Multi-type Galton–Watson trees; Fringe distributions; Local convergence (search for similar items in EconPapers)
Date: 2022
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DOI: 10.1007/s10959-020-01069-y

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