Abstract: We consider nonparametric estimation of the covariance function for dense functional data using computationally efficient tensor product B-splines. We develop both local and global asymptotic distributions for the proposed estimator, and show that our estimator is as efficient as an “oracle ” estimator where the true mean function is known. Simultaneous confidence envelopes are developed based on asymptotic theory to quantify the variability in the covariance estimator and to make global inferences on the true covariance. Monte Carlo simulation experiments provide strong evidence that corroborates the asymptotic theory. Examples of near infrared spectroscopy data and speech recognition data are provided to illustrate the proposed ...
We propose straightforward nonparametric estimators for the mean and the covariance functions of fun...
Covariance function estimation is a fundamental task in multivariate functional data analysis and ar...
In the modern era of high and infinite dimensional data, classical statistical methodology is often ...
We consider nonparametric estimation of a covariance function on the unit square, given a sample of ...
Abstract. High-dimensional statistical tests often ignore correlations to gain simplicity and stabil...
The density function of the limiting spectral distribution of general sample covariance matrices is ...
<p>The use of sparse precision (inverse covariance) matrices has become popular because they allow f...
A framework is developed for inference concerning the covariance operator of a functional random pr...
High-dimensional statistical tests often ignore correlations to gain simplicity and stability leadin...
An increasing number of statistical problems arise in connection with functional calibration. In eac...
Abstract: We consider nonparametric regression in the context of functional data, that is, when a ra...
Abstract. Several nonparametric procedures have been proposed in the spatial setting for covariance ...
Abstract. In this paper, we obtain asymptotic confidence bands for both the density and regression f...
This thesis focuses on non-parametric covariance estimation for random surfaces, i.e.~functional dat...
Abstract: Functional data analysis has received considerable recent attention and a number of succes...
We propose straightforward nonparametric estimators for the mean and the covariance functions of fun...
Covariance function estimation is a fundamental task in multivariate functional data analysis and ar...
In the modern era of high and infinite dimensional data, classical statistical methodology is often ...
We consider nonparametric estimation of a covariance function on the unit square, given a sample of ...
Abstract. High-dimensional statistical tests often ignore correlations to gain simplicity and stabil...
The density function of the limiting spectral distribution of general sample covariance matrices is ...
<p>The use of sparse precision (inverse covariance) matrices has become popular because they allow f...
A framework is developed for inference concerning the covariance operator of a functional random pr...
High-dimensional statistical tests often ignore correlations to gain simplicity and stability leadin...
An increasing number of statistical problems arise in connection with functional calibration. In eac...
Abstract: We consider nonparametric regression in the context of functional data, that is, when a ra...
Abstract. Several nonparametric procedures have been proposed in the spatial setting for covariance ...
Abstract. In this paper, we obtain asymptotic confidence bands for both the density and regression f...
This thesis focuses on non-parametric covariance estimation for random surfaces, i.e.~functional dat...
Abstract: Functional data analysis has received considerable recent attention and a number of succes...
We propose straightforward nonparametric estimators for the mean and the covariance functions of fun...
Covariance function estimation is a fundamental task in multivariate functional data analysis and ar...
In the modern era of high and infinite dimensional data, classical statistical methodology is often ...