Add to ORKGWe derive nonparametric confidence intervals for the eigenvalues of the Hessian at modes of a density estimate. This provides information about the strength and shape of modes and can also be used as a significance test. We use a data-splitting approach in which potential modes are identified using the first half of the data and inference is done with the second half of the data. To get valid confidence sets for the eigenvalues, we use a bootstrap based on an elementary-symmetric-polynomial (ESP) transformation. This leads to valid bootstrap con-fidence sets regardless of any multiplicities in the eigenvalues. We also suggest a new method for bandwidth selection, namely, choosing the bandwidth to max-imize the number of significant modes. W...
http://demonstrations.wolfram.com/NonparametricDensityEstimationRobustCrossValidationBandwidth/. Thi...
Uniform confidence bands for densities f via nonparametric kernel estimates were first constructed b...
The kernel persists as the most useful tool for density estimation. Although, in general, fixed kern...
We derive non-parametric confidence intervals for the eigenvalues of the Hessian at modes of a densi...
We propose a procedure for detecting the modes of a density estimate and test their significance. We...
In this study a family of estimators is developed for local maxima, or modes, of a multivariate prob...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/15...
We suggest two new methods for conditional density estimation. The first is based on locally fitting...
Modes, or local maxima, are often among the most interesting features of a probability density funct...
We suggest two improved methods for conditional density estimation. The rst is based on locally ttin...
Four nonparametric estimates of the mode of a density function are investigated. Two mode estimates ...
International audienceIn this work we give new density estimators by averaging classical density est...
We propose a framework for nonparametric maximum likelihood estimation of densities in situations wh...
We propose a method for the construction of simultaneous confidence bands for (a smoothed version of...
Abstract. A data-driven bandwidth choice for a kernel density estimator called critical bandwidth is...
http://demonstrations.wolfram.com/NonparametricDensityEstimationRobustCrossValidationBandwidth/. Thi...
Uniform confidence bands for densities f via nonparametric kernel estimates were first constructed b...
The kernel persists as the most useful tool for density estimation. Although, in general, fixed kern...
We derive non-parametric confidence intervals for the eigenvalues of the Hessian at modes of a densi...
We propose a procedure for detecting the modes of a density estimate and test their significance. We...
In this study a family of estimators is developed for local maxima, or modes, of a multivariate prob...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/15...
We suggest two new methods for conditional density estimation. The first is based on locally fitting...
Modes, or local maxima, are often among the most interesting features of a probability density funct...
We suggest two improved methods for conditional density estimation. The rst is based on locally ttin...
Four nonparametric estimates of the mode of a density function are investigated. Two mode estimates ...
International audienceIn this work we give new density estimators by averaging classical density est...
We propose a framework for nonparametric maximum likelihood estimation of densities in situations wh...
We propose a method for the construction of simultaneous confidence bands for (a smoothed version of...
Abstract. A data-driven bandwidth choice for a kernel density estimator called critical bandwidth is...
http://demonstrations.wolfram.com/NonparametricDensityEstimationRobustCrossValidationBandwidth/. Thi...
Uniform confidence bands for densities f via nonparametric kernel estimates were first constructed b...
The kernel persists as the most useful tool for density estimation. Although, in general, fixed kern...