Add to ORKGIn the paper, we provide an alternative and united proof of a double in-equality for bounding the arithmetic-geometric mean. Moreover we prove that the bounding constants of the double inequality are the best possible.\ud \u
For fixed s≥1 and any t1,t2∈(0,1/2) we prove that the double inequality Gs(t1a+(1-t1)b,t1b+(1-t1)a)A...
AbstractRecently, Sagae and Tanabe defined a geometric mean of positive definite matrices and proved...
We link some equivalent forms of the arithmetic-geometric mean inequality in probability and mathema...
In the paper, we provide an alternative and united proof of a double in-equality for bounding the ar...
In the note, using Cauchy-Schwartz-Buniakowski's inequality, the authors give a new proof of the ari...
For , the power mean of order of two positive numbers and is defined by , for , and , for...
The goal of this short note is the presentation of an elementary proof of the well-known inequality ...
AbstractA formula is derived from which one can obtain a family of two-sided inequalities involving ...
In this paper, we discuss some inequalities which are obtained by adding a non-negative expression t...
In the current note, we investigate the mathematical relations among the weighted arithmetic mean&nd...
We link some equivalent forms of the arithmetic-geometric mean inequality in probability and mathema...
Two families of means (called Heinz means and Heron means) that interpolate between the geometric an...
© 2015 Australian Mathematical Publishing Association Inc. Exact upper and lower bounds on the diffe...
Abstract In the article, we present the best possible parameters λ = λ ( p ) $\lambda=\lambda (p)$ a...
The arithmetic-geometric mean inequality: √ab ≤ (a+b)/2, for a,b≥ 0Ensino Médio::MatemáticaEducação ...
For fixed s≥1 and any t1,t2∈(0,1/2) we prove that the double inequality Gs(t1a+(1-t1)b,t1b+(1-t1)a)A...
AbstractRecently, Sagae and Tanabe defined a geometric mean of positive definite matrices and proved...
We link some equivalent forms of the arithmetic-geometric mean inequality in probability and mathema...
In the paper, we provide an alternative and united proof of a double in-equality for bounding the ar...
In the note, using Cauchy-Schwartz-Buniakowski's inequality, the authors give a new proof of the ari...
For , the power mean of order of two positive numbers and is defined by , for , and , for...
The goal of this short note is the presentation of an elementary proof of the well-known inequality ...
AbstractA formula is derived from which one can obtain a family of two-sided inequalities involving ...
In this paper, we discuss some inequalities which are obtained by adding a non-negative expression t...
In the current note, we investigate the mathematical relations among the weighted arithmetic mean&nd...
We link some equivalent forms of the arithmetic-geometric mean inequality in probability and mathema...
Two families of means (called Heinz means and Heron means) that interpolate between the geometric an...
© 2015 Australian Mathematical Publishing Association Inc. Exact upper and lower bounds on the diffe...
Abstract In the article, we present the best possible parameters λ = λ ( p ) $\lambda=\lambda (p)$ a...
The arithmetic-geometric mean inequality: √ab ≤ (a+b)/2, for a,b≥ 0Ensino Médio::MatemáticaEducação ...
For fixed s≥1 and any t1,t2∈(0,1/2) we prove that the double inequality Gs(t1a+(1-t1)b,t1b+(1-t1)a)A...
AbstractRecently, Sagae and Tanabe defined a geometric mean of positive definite matrices and proved...
We link some equivalent forms of the arithmetic-geometric mean inequality in probability and mathema...