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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2 Pith papers cite this work. Polarity classification is still indexing.
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2026 2verdicts
UNVERDICTED 2representative citing papers
Determinantal formulae for generating functions of totally symmetric plane partitions are derived, yielding lattice path and tableaux models that generalize the dual Littlewood identities.
citing papers explorer
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Non-colliding space-time inhomogeneous Markov chains
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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Determinantal formulae for a symmetric generating function of totally symmetric plane partitions
Determinantal formulae for generating functions of totally symmetric plane partitions are derived, yielding lattice path and tableaux models that generalize the dual Littlewood identities.