We obtain a new sharp lower estimate for tails of the central chi-square distribution. Using it we prove quite accurate lower bounds for the chi-square quantiles covering the case of increasing number of degrees of freedom and simultaneously tending to zero tail probabilities. In the case of small tail probabilities we also provide upper bounds for these quantiles which are close enough to the lower ones. As a byproduct we propose a simple approximation formula which is easy to calculate for the chi-square quantiles. It is expressed explicitly in terms of tail probabilities and a number of degrees of freedom.2000 AMS Mathematics Subject Classification: Primary: 62E17; Secondary: 60E15, 62E15, 62Q05, 65C60 We obtain a new sharp lower es...
In this paper, we define a generalized chi-square distribution by using a new parameter k \u3e 0. we...
The quantile function of probability distributions is often sought after because of their usefulnes...
In the past, tables have been published for the chi-square, t and F distributions. These tables hav...
The quantiles of the central and non-central chi squared distributions cannot be expressed as explic...
An upper and lower bound are presented for the difference between the distribution functions of nonc...
In this paper, we prove a local limit theorem for the chi-square distribution with $r > 0$ degrees o...
Some new upper bounds for noncentral chi-square cdf are derived from the basic symmetries of the mul...
International audienceWe describe a lower bound for the critical value of the supremum of a Chi-Squa...
A simple and novel asymptotic bound for the maximum error resulting from the use of the central limi...
AbstractIn this paper we consider the probability density function (pdf) of a non-central χ2 distrib...
The purpose of this paper is to give an explicit estimator dominating the positive part of the UMVUE...
This Demonstration explores the chi-squared distribution for large degrees of freedom , which, when ...
This article provides an alternative method to derive the noncentral chi-square distribution. This m...
Chi square distribution is a continuous probability distribution primarily used in hypothesis testi...
We provide a nonasymptotic bound on the distance between a noncentral chi square distribution and a ...
In this paper, we define a generalized chi-square distribution by using a new parameter k \u3e 0. we...
The quantile function of probability distributions is often sought after because of their usefulnes...
In the past, tables have been published for the chi-square, t and F distributions. These tables hav...
The quantiles of the central and non-central chi squared distributions cannot be expressed as explic...
An upper and lower bound are presented for the difference between the distribution functions of nonc...
In this paper, we prove a local limit theorem for the chi-square distribution with $r > 0$ degrees o...
Some new upper bounds for noncentral chi-square cdf are derived from the basic symmetries of the mul...
International audienceWe describe a lower bound for the critical value of the supremum of a Chi-Squa...
A simple and novel asymptotic bound for the maximum error resulting from the use of the central limi...
AbstractIn this paper we consider the probability density function (pdf) of a non-central χ2 distrib...
The purpose of this paper is to give an explicit estimator dominating the positive part of the UMVUE...
This Demonstration explores the chi-squared distribution for large degrees of freedom , which, when ...
This article provides an alternative method to derive the noncentral chi-square distribution. This m...
Chi square distribution is a continuous probability distribution primarily used in hypothesis testi...
We provide a nonasymptotic bound on the distance between a noncentral chi square distribution and a ...
In this paper, we define a generalized chi-square distribution by using a new parameter k \u3e 0. we...
The quantile function of probability distributions is often sought after because of their usefulnes...
In the past, tables have been published for the chi-square, t and F distributions. These tables hav...