A multidimensional recurring mean inequality is shown. Furthermore, we prove some new inequalities, which can be considered to be the extensions of those established inequalities, including, for example, the Polya-Szegö and Kantorovich inequalities
Suppose that X, Y are positive random variables and m is a numerical (commutative) mean. We prove th...
We show that an almost trivial inequality between the first and second moment and the maximal value ...
AbstractIn Statistics, generalized means of positive random variables are often considered. As is we...
A multidimensional recurring mean inequality is shown. Furthermore, we prove some new inequalities, ...
(communicated by R. Bhatia) Abstract. We derive bounds on the variance of a random variable in terms...
AbstractIn this paper, we obtain some new inequalities by means of the mean inequalities of random v...
Presenting the first unified treatment of limit theorems for multiple sums of independent random var...
Bo-Yan Xi, Ying Wu, Huan-Nan Shi, and Feng Qi, \textit{Generalizations of several inequalities relat...
Sharpened versions of a Kolmogorov's inequality for sums of independent Bernoulli random variables a...
A variant of the well-known Chebyshev inequality for scalar random variables can be formulated in th...
Inspired by the work of Zhefei He and Mingjin Wang which was published in the Journal of Inequalitie...
In this short note, a conjecture ([4]: J. K. Merikoski, Extending means of two variables to several...
International audienceWe here propose some new algorithms to compute bounds for (1) cumulative densi...
An extension of Kantorovich inequality to $n$-operators (Takeaki Yamazaki) Kanagawa University In th...
A law of a repeat algorithm has been considered. The aim to be attained is to study distribution of ...
Suppose that X, Y are positive random variables and m is a numerical (commutative) mean. We prove th...
We show that an almost trivial inequality between the first and second moment and the maximal value ...
AbstractIn Statistics, generalized means of positive random variables are often considered. As is we...
A multidimensional recurring mean inequality is shown. Furthermore, we prove some new inequalities, ...
(communicated by R. Bhatia) Abstract. We derive bounds on the variance of a random variable in terms...
AbstractIn this paper, we obtain some new inequalities by means of the mean inequalities of random v...
Presenting the first unified treatment of limit theorems for multiple sums of independent random var...
Bo-Yan Xi, Ying Wu, Huan-Nan Shi, and Feng Qi, \textit{Generalizations of several inequalities relat...
Sharpened versions of a Kolmogorov's inequality for sums of independent Bernoulli random variables a...
A variant of the well-known Chebyshev inequality for scalar random variables can be formulated in th...
Inspired by the work of Zhefei He and Mingjin Wang which was published in the Journal of Inequalitie...
In this short note, a conjecture ([4]: J. K. Merikoski, Extending means of two variables to several...
International audienceWe here propose some new algorithms to compute bounds for (1) cumulative densi...
An extension of Kantorovich inequality to $n$-operators (Takeaki Yamazaki) Kanagawa University In th...
A law of a repeat algorithm has been considered. The aim to be attained is to study distribution of ...
Suppose that X, Y are positive random variables and m is a numerical (commutative) mean. We prove th...
We show that an almost trivial inequality between the first and second moment and the maximal value ...
AbstractIn Statistics, generalized means of positive random variables are often considered. As is we...
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