Sequential Gaussian approximation for nonstationary time series in high dimensions
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Publication:6635728
DOI10.3150/22-bej1577MaRDI QIDQ6635728
Publication date: 12 November 2024
Published in: Bernoulli (Search for Journal in Brave)
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Cites Work
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- Extremes of a class of nonhomogeneous Gaussian random fields
- Change-point analysis in increasing dimension
- Common breaks in means and variances for panel data
- Notes on the dimension dependence in high-dimensional central limit theorems for hyperrectangles
- Local linear quantile estimation for nonstationary time series
- Uniform change point tests in high dimension
- Strong approximation for a class of stationary processes
- The use of subseries values for estimating the variance of a general statistic from a stationary sequence
- Extensions of results of Komlós, Major, and Tusnády to the multivariate case
- Estimation of the variance of partial sums for \(\rho\)-mixing random variables
- Fitting time series models to nonstationary processes
- Gaussian approximation for high dimensional time series
- Gaussian approximation for high dimensional vector under physical dependence
- Towards a general theory for nonlinear locally stationary processes
- Relevant change points in high dimensional time series
- Optimum bounds for the distributions of martingales in Banach spaces
- Beyond Gaussian approximation: bootstrap for maxima of sums of independent random vectors
- An asymptotic test for constancy of the variance under short-range dependence
- Improved central limit theorem and bootstrap approximations in high dimensions
- Sequential change point detection in high dimensional time series
- Stein's method for normal approximation in Wasserstein distances with application to the multivariate central limit theorem
- The CLT in high dimensions: quantitative bounds via martingale embedding
- Uniform nonparametric inference for time series
- Estimation and inference of time-varying auto-covariance under complex trend: a difference-based approach
- Testing and estimating change-points in the covariance matrix of a high-dimensional time series
- High-dimensional change-point detection under sparse alternatives
- Central limit theorems and bootstrap in high dimensions
- A high-dimensional CLT in \(\mathcal {W}_2\) distance with near optimal convergence rate
- Gaussian approximations and multiplier bootstrap for maxima of sums of high-dimensional random vectors
- Komlós-Major-Tusnády approximation under dependence
- Detecting simultaneous changepoints in multiple sequences
- Structural breaks in time series
- The accuracy of strong Gaussian approximation for sums of independent random vectors
- Gaussian approximations for non-stationary multiple time series
- An approximation of partial sums of independent RV's, and the sample DF. II
- An approximation of partial sums of independent RV'-s, and the sample DF. I
- On the tail behavior of sums of independent random variables
- A new method to prove strassen type laws of invariance principle. 1
- Large‐sample approximations and change testing for high‐dimensional covariance matrices of multivariate linear time series and factor models
- Inference on Causal and Structural Parameters using Many Moment Inequalities
- Optimal Gaussian Approximation For Multiple Time Series
- Change Point Analysis of Correlation in Non-stationary Time Series
- Heteroscedasticity and Autocorrelation Robust Structural Change Detection
- Nonlinear system theory: Another look at dependence
- Change‐point detection in panel data
- Nearly optimal central limit theorem and bootstrap approximations in high dimensions
- Functional Estimation and Change Detection for Nonstationary Time Series
- Gaussian Approximation and Spatially Dependent Wild Bootstrap for High-Dimensional Spatial Data
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