In this paper we develop valid inference for high-dimensional time series. We extend the desparsified lasso to a time series setting under Near-Epoch Dependence (NED) assumptions allowing for non-Gaussian, serially correlated and heteroskedastic processes, where the number of regressors can possibly grow faster than the time dimension. We first derive an error bound under weak sparsity, which, coupled with the NED assumption, means this inequality can also be applied to the (inherently misspecified) nodewise regressions performed in the desparsified lasso. This allows us to establish the uniform asymptotic normality of the desparsified lasso under general conditions, including for inference on parameters of increasing dimensions. Additional...
We establish oracle inequalities for a version of the Lasso in high-dimensional fixed effects dynami...
<p>This thesis addresses several challenges unanswered in classical statistics. The first is the pro...
The vector autoregressive (VAR) model is a powerful tool in modeling complex time series and has bee...
In this paper we develop valid inference for high-dimensional time series. We extend the desparsifie...
The desparsified lasso is a high-dimensional estimation method which provides uniformly valid infere...
Serially correlated high-dimensional data are prevalent in the big data era. In order to predict and...
In this paper we develop inference for high dimensional linear models, with serially correlated erro...
In recent years, extensive research has focused on the $\ell_1$ penalized least squares (Lasso) esti...
The thesis introduces structured machine learning regressions for high-dimensional time series data ...
Constructing confidence intervals in high-dimensional models is a challenging task due to the lack o...
This thesis examines methods of doing inference with high-dimensional time series data. High-dimensi...
In this paper we study high-dimensional correlated random effects panel data models. Our setting is...
In high dimensional data, the number of covariates is larger than the sample size, which makes the e...
Performing statistical inference in high-dimensional models is an outstanding challenge. A ma-jor so...
We consider the estimation and inference in a system of high-dimensional regression equations allowi...
We establish oracle inequalities for a version of the Lasso in high-dimensional fixed effects dynami...
<p>This thesis addresses several challenges unanswered in classical statistics. The first is the pro...
The vector autoregressive (VAR) model is a powerful tool in modeling complex time series and has bee...
In this paper we develop valid inference for high-dimensional time series. We extend the desparsifie...
The desparsified lasso is a high-dimensional estimation method which provides uniformly valid infere...
Serially correlated high-dimensional data are prevalent in the big data era. In order to predict and...
In this paper we develop inference for high dimensional linear models, with serially correlated erro...
In recent years, extensive research has focused on the $\ell_1$ penalized least squares (Lasso) esti...
The thesis introduces structured machine learning regressions for high-dimensional time series data ...
Constructing confidence intervals in high-dimensional models is a challenging task due to the lack o...
This thesis examines methods of doing inference with high-dimensional time series data. High-dimensi...
In this paper we study high-dimensional correlated random effects panel data models. Our setting is...
In high dimensional data, the number of covariates is larger than the sample size, which makes the e...
Performing statistical inference in high-dimensional models is an outstanding challenge. A ma-jor so...
We consider the estimation and inference in a system of high-dimensional regression equations allowi...
We establish oracle inequalities for a version of the Lasso in high-dimensional fixed effects dynami...
<p>This thesis addresses several challenges unanswered in classical statistics. The first is the pro...
The vector autoregressive (VAR) model is a powerful tool in modeling complex time series and has bee...