Difference between revisions of "Radon's Inequality"

Revision as of 15:30, 14 March 2023

Radon's Inequality states:

$\frac{ a_1^{p+1} } { b_1^p } + \frac{ a_2 ^{p+1} } { b_2^p } + \cdots + \frac{ a_n ^{p+1} } { b_n^p } \geq \frac{ (a_1 + a_2 + \cdots+ a_n ) ^{p+1} } { (b_1 + b_2 + \cdots+ b_n )^p}$

It is a direct consequence of Hölder's Inequality, and a generalization of Titu's Lemma (for p=2, it is just that).

Proof

Just apply Hölder for:

$(b_1 + b_2 + \cdots+ b_n )^{p/(p+1)}\left(\frac{ a_1^{p+1} } { b_1^p } + \frac{ a_2 ^{p+1} } { b_2^p } + \cdots + \frac{ a_n ^{p+1} } { b_n^p }\right)^{1/(p+1)} \geq a_1 + a_2 + \cdots+ a_n \Leftrightarrow$ $\frac{ a_1^{p+1} } { b_1^p } + \frac{ a_2 ^{p+1} } { b_2^p } + \cdots + \frac{ a_n ^{p+1} } { b_n^p } \geq \frac{ (a_1 + a_2 + \cdots+ a_n ) ^{p+1} } { (b_1 + b_2 + \cdots+ b_n )^p}$

Further Generalizations

$\frac{ a_1^{p+m} } { b_1^p } + \frac{ a_2 ^{p+m} } { b_2^p } + \cdots + \frac{ a_n ^{p+m} } { b_n^p } \geq \frac{ (a_1 + a_2 + \cdots+ a_n ) ^{p+m} } { (b_1 + b_2 + \cdots+ b_n )^p}$

@@ Line 14: / Line 14: @@
 === Further Generalizations ===
-<cmath> \frac{ a_1^{p+m} } { b_1^p } + \frac{ a_2 ^{p+m} } { b_2^p } + \cdots + \frac{ a_n ^{p+m} } { b_n^p } \geq \frac{ (a_1 + a_2 + \cdots+ a_n ) ^{p+m} } { (b_1 + b_2 + \cdots+ b_n )^p} </cmath>
-Proof also by Hölder for:
-<cmath>(b_1 + b_2 + \cdots+ b_n )^{p/(p+m)}\left(\frac{ a_1^{p+m} } { b_1^p } + \frac{ a_2 ^{p+m} } { b_2^p } + \cdots + \frac{ a_n ^{p+m} } { b_n^p }\right)^{m/(p+m)} \geq a_1 + a_2 + \cdots+ a_n  \Leftrightarrow</cmath>
 <cmath> \frac{ a_1^{p+m} } { b_1^p } + \frac{ a_2 ^{p+m} } { b_2^p } + \cdots + \frac{ a_n ^{p+m} } { b_n^p } \geq \frac{ (a_1 + a_2 + \cdots+ a_n ) ^{p+m} } { (b_1 + b_2 + \cdots+ b_n )^p} </cmath>

Page

Toolbox

Search

Difference between revisions of "Radon's Inequality"

Revision as of 15:30, 14 March 2023

Proof

Further Generalizations