We present a new, natural way to construct nonparametric multivariate tolerance regions. Unlike the classical nonparametric tolerance intervals, where the endpoints are determined by beforehand chosen order statistics, we take the shortest interval, that contains a certain number of observations. We extend this idea to higher dimensions by replacing the class of intervals by a general class of indexing sets, which specializes to the classes of ellipsoids, hyperrectangles or convex sets. The asymptotic behavior of our tolerance regions is derived using empirical process theory, in particular the concept of generalized quantiles. Finite sample properties of our tolerance regions are investigated through a simulation study. Real data examples ...
We review and contrast frequentist and Bayesian definitions of tolerance regions. We give conditions...
Confidence intervals are used to capture a parameter of interest, usually a mean or a quantile, at a...
Suppose a random variable takes on values in an interval. The minimal distance from the expectation ...
We present a new natural way to construct nonparametric multivariate tolerance regions. Unlike the c...
We present a new, natural way to construct nonparametric multi-variate tolerance regions. Unlike the...
Di Bucchianico, A., Einmahl, J. H. J., & Mushkudiani, N. A. (2001). Smallest nonparametric tole...
AbstractA tolerance region is a map from the sample space of one statistical model to the event spac...
A major problem in statistical quality control is to detect a change in the underlying distribution ...
A tolerance region for a population is a region computed using a random sample, so that the region w...
A tolerance interval is a statistical interval that covers at least 100ρ% of the population of inter...
The tolerance package for R provides a set of functions for estimating and plotting tolerance limits...
In this paper we offer a unified approach to the problem of nonparametric regression on the unit int...
AbstractA method is given for constructing a prediction region having smallest expected measure with...
AbstractIn this paper a procedure of construction of β-expectation tolerance regions in the framewor...
summary:In the paper a test of the hypothesis $\mu+c \sigma \leq M$, $\mu - c \sigma \geq m$ on para...
We review and contrast frequentist and Bayesian definitions of tolerance regions. We give conditions...
Confidence intervals are used to capture a parameter of interest, usually a mean or a quantile, at a...
Suppose a random variable takes on values in an interval. The minimal distance from the expectation ...
We present a new natural way to construct nonparametric multivariate tolerance regions. Unlike the c...
We present a new, natural way to construct nonparametric multi-variate tolerance regions. Unlike the...
Di Bucchianico, A., Einmahl, J. H. J., & Mushkudiani, N. A. (2001). Smallest nonparametric tole...
AbstractA tolerance region is a map from the sample space of one statistical model to the event spac...
A major problem in statistical quality control is to detect a change in the underlying distribution ...
A tolerance region for a population is a region computed using a random sample, so that the region w...
A tolerance interval is a statistical interval that covers at least 100ρ% of the population of inter...
The tolerance package for R provides a set of functions for estimating and plotting tolerance limits...
In this paper we offer a unified approach to the problem of nonparametric regression on the unit int...
AbstractA method is given for constructing a prediction region having smallest expected measure with...
AbstractIn this paper a procedure of construction of β-expectation tolerance regions in the framewor...
summary:In the paper a test of the hypothesis $\mu+c \sigma \leq M$, $\mu - c \sigma \geq m$ on para...
We review and contrast frequentist and Bayesian definitions of tolerance regions. We give conditions...
Confidence intervals are used to capture a parameter of interest, usually a mean or a quantile, at a...
Suppose a random variable takes on values in an interval. The minimal distance from the expectation ...