Ordered exponential random walks.ALEA Lat

Denis Denisov, Will FitzGerald · 2023 · DOI 10.30757/alea.v20-45

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Non-colliding space-time inhomogeneous Markov chains

math.PR · 2026-06-25 · unverdicted · novelty 7.0

Derives leading asymptotics for collision-time tails of integrable inhomogeneous Markov chains via steepest-descent analysis and Karlin-McGregor expansion, confirming a prediction for push-block particle systems.

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Non-colliding space-time inhomogeneous Markov chains math.PR · 2026-06-25 · unverdicted · none · ref 38
Derives leading asymptotics for collision-time tails of integrable inhomogeneous Markov chains via steepest-descent analysis and Karlin-McGregor expansion, confirming a prediction for push-block particle systems.

Ordered exponential random walks.ALEA Lat

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