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Iterated-logarithm laws for convex hulls of random walks with drift

Cygan, Wojciech; Sandrić, Nikola; Šebek, Stjepan; Wade, Andrew R.

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Authors

Wojciech Cygan

Nikola Sandrić

Stjepan Šebek



Abstract

We establish laws of the iterated logarithm for intrinsic volumes of the convex hull of many-step, multidimensional random walks whose increments have two moments and a non-zero drift. Analogous results in the case of zero drift, where the scaling is different, were obtained by Khoshnevisan. Our starting point is a version of Strassen’s functional law of the iterated logarithm for random walks with drift. For the special case of the area of a planar random walk with drift, we compute explicitly the constant in the iterated-logarithm law by solving an isoperimetric problem reminiscent of the classical Dido problem. For general intrinsic volumes and dimensions, our proof exploits a novel zero–one law for functionals of convex hulls of walks with drift, of some independent interest. As another application of our approach, we obtain iterated logarithm laws for intrinsic volumes of the convex hull of the centre of mass (running average) process associated to the random walk.

Citation

Cygan, W., Sandrić, N., Šebek, S., & Wade, A. R. (2024). Iterated-logarithm laws for convex hulls of random walks with drift. Transactions of the American Mathematical Society, 377(9), 6695-6724

Journal Article Type Article
Acceptance Date Jun 2, 2024
Online Publication Date Jul 16, 2024
Publication Date 2024-09
Deposit Date Jul 20, 2023
Publicly Available Date Jul 16, 2024
Journal Transactions of the American Mathematical Society
Print ISSN 0002-9947
Electronic ISSN 1088-6850
Publisher American Mathematical Society
Peer Reviewed Peer Reviewed
Volume 377
Issue 9
Pages 6695-6724
Public URL https://durham-repository.worktribe.com/output/1168227

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