Cramér-type moderate deviation of normal approximation for unbounded exchangeable pairs
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Publication:2108479
DOI10.3150/21-BEJ1457MaRDI QIDQ2108479
Publication date: 19 December 2022
Published in: Bernoulli (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1901.09526
Stein's methodCramér-type moderate deviationgeneral Curie-Weiss modelexchangeable pair approachsums of local statistics
Equilibrium statistical mechanics (82Bxx) Special processes (60Kxx) Statistical distribution theory (62Exx)
Related Items (2)
Cramér-type moderate deviations under local dependence ⋮ Cramér-type moderate deviation of normal approximation for unbounded exchangeable pairs
Cites Work
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- Asymptotics of the mean-field Heisenberg model
- Asymptotics of mean-field \(\mathrm{O}(N)\) models
- Identifying the limiting distribution by a general approach of Stein's method
- Nonnormal approximation by Stein's method of exchangeable pairs with application to the Curie-Weiss model
- Stein's method for dependent random variables occuring in statistical mechanics
- Exchangeable pairs and Poisson approximation
- Some asymptotic and large deviation results in Poisson approximation
- On coupling constructions and rates in the CLT for dependent summands with applications to the antivoter model and weighted \(U\)-statistics
- Berry-Esseen bounds of normal and nonnormal approximation for unbounded exchangeable pairs
- From Stein identities to moderate deviations
- Cramér-type moderate deviation of normal approximation for unbounded exchangeable pairs
- A refined Cramér-type moderate deviation for sums of local statistics
- Cramér-type moderate deviation theorems for nonnormal approximation
- Rates of convergence in the Blume-Emery-Griffiths model
- On rates of convergence in the Curie-Weiss-Potts model with an external field
- Stein's method for concentration inequalities
- Moderate deviations in Poisson approximation: a first attempt
- On Stein’s method for multivariate normal approximation
- Normal Approximation by Stein’s Method
- Limit theorems for sums of dependent random variables occurring in statistical mechanics
- A short survey of Stein's method
- CLT-related large deviation bounds based on Stein's method
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