It is well known that not all the inferential procedures adopted in the multivariate PCA can be traightforwardly extended to the functional case. More specifically, the inference on the mean is typically based on the Mahalanobis distance, which is in general undefined when data belongs to an infinite dimensional space. However, the common approach to consider few principal components is in contrast with some properties of the Mahalanobis distance and it may cause a loss of information. To address this issue, we propose a generalization of Mahalanobis distance for functional data, which is able to: (i) consider all the infinite components of data basis expansion and (ii) present features similar to the Mahalanobis distance. This new metric i...
In this paper, we present inferential procedures to compare the means of two samples of functional d...
I consider the problem of estimating the Mahalanobis distance between multivariate normal population...
Functional principal component analysis (FPCA) has become the most widely used dimension reduction t...
This paper presents a general notion of Mahalanobis distance for functional data that extends the c...
<div><p>This article presents a new semidistance for functional observations that generalizes the Ma...
We present some asymptotic results on the distance between the means of samples of curves generated ...
In this work we propose a multivariate functional clustering technique based on a distance which gen...
In this work we propose a multivariate functional clustering technique based on a distance which ge...
This paper investigates the inferential properties of testing the means of Gaussian functional data,...
In this paper we study the main properties of a distance introduced by C.M. Cuadras (1974). This dis...
We introduce a novel variational method that allows to approximately integrate out kernel hyperparam...
.Functional data refer to data which consist of curves evaluated at a finite subset of some interval...
Based on the reasoning expressed by Mahalanobis in his original article, the present article extends...
A framework is developed for inference concerning the covariance operator of a functional random pr...
A popular approach for classifying functional data is based on the distances from the function or it...
In this paper, we present inferential procedures to compare the means of two samples of functional d...
I consider the problem of estimating the Mahalanobis distance between multivariate normal population...
Functional principal component analysis (FPCA) has become the most widely used dimension reduction t...
This paper presents a general notion of Mahalanobis distance for functional data that extends the c...
<div><p>This article presents a new semidistance for functional observations that generalizes the Ma...
We present some asymptotic results on the distance between the means of samples of curves generated ...
In this work we propose a multivariate functional clustering technique based on a distance which gen...
In this work we propose a multivariate functional clustering technique based on a distance which ge...
This paper investigates the inferential properties of testing the means of Gaussian functional data,...
In this paper we study the main properties of a distance introduced by C.M. Cuadras (1974). This dis...
We introduce a novel variational method that allows to approximately integrate out kernel hyperparam...
.Functional data refer to data which consist of curves evaluated at a finite subset of some interval...
Based on the reasoning expressed by Mahalanobis in his original article, the present article extends...
A framework is developed for inference concerning the covariance operator of a functional random pr...
A popular approach for classifying functional data is based on the distances from the function or it...
In this paper, we present inferential procedures to compare the means of two samples of functional d...
I consider the problem of estimating the Mahalanobis distance between multivariate normal population...
Functional principal component analysis (FPCA) has become the most widely used dimension reduction t...