We study the worst case error of kernel density estimates via subset approximation. A kernel density estimate of a distribution is the convolution of that distribution with a fixed kernel (e.g. Gaussian kernel). Given a subset (i.e. a point set) of the input distribution, we can compare the kernel density estimates of the input distribution with that of the subset and bound the worst case error. If the maximum error is ε, then this subset can be thought of as an ε-sample (aka an ε-approximation) of the range space defined with the input distribution as the ground set and the fixed kernel representing the family of ranges. Interestingly, in this case the ranges are not binary, but have a continuous range (for simplicity we focus on kernels w...
We consider convolution sampling and reconstruction of signals in certain reproducing kernel subspac...
We consider the problem of reconstructing a function from a finite set of noise-corrupted samples. T...
We describe a technique for comparing distributions without the need for density estimation as an in...
Kernel density estimates are a robust way to reconstruct a continuous distribution from a discrete p...
While robust parameter estimation has been well studied in parametric density es-timation, there has...
Kernel mean embeddings are a popular tool that consists in representing probability measures by thei...
The smoothing parameter or window width for a kernel estimator of a probability density at a point h...
There are various methods for estimating a density. A group of methods which estimate the density as...
We consider the problem of kernel classification. Works on kernel regression have shown that the rat...
Many interesting machine learning problems are best posed by considering instances that are distribu...
Kernel density estimation is a widely used method for estimating a distribution based on a sample of...
Abstract. Some linkages between kernel and penalty methods of density estimation are explored. It is...
A new class of kernels for long-run variance and spectral density estimation is developed by exponen...
Embeddings of probability measures into reproducing kernel Hilbert spaces have been proposed as a st...
We focus on the distribution regression problem: regressing to a real-valued response from a probabi...
We consider convolution sampling and reconstruction of signals in certain reproducing kernel subspac...
We consider the problem of reconstructing a function from a finite set of noise-corrupted samples. T...
We describe a technique for comparing distributions without the need for density estimation as an in...
Kernel density estimates are a robust way to reconstruct a continuous distribution from a discrete p...
While robust parameter estimation has been well studied in parametric density es-timation, there has...
Kernel mean embeddings are a popular tool that consists in representing probability measures by thei...
The smoothing parameter or window width for a kernel estimator of a probability density at a point h...
There are various methods for estimating a density. A group of methods which estimate the density as...
We consider the problem of kernel classification. Works on kernel regression have shown that the rat...
Many interesting machine learning problems are best posed by considering instances that are distribu...
Kernel density estimation is a widely used method for estimating a distribution based on a sample of...
Abstract. Some linkages between kernel and penalty methods of density estimation are explored. It is...
A new class of kernels for long-run variance and spectral density estimation is developed by exponen...
Embeddings of probability measures into reproducing kernel Hilbert spaces have been proposed as a st...
We focus on the distribution regression problem: regressing to a real-valued response from a probabi...
We consider convolution sampling and reconstruction of signals in certain reproducing kernel subspac...
We consider the problem of reconstructing a function from a finite set of noise-corrupted samples. T...
We describe a technique for comparing distributions without the need for density estimation as an in...