### Improving Hölder s inequality

2021-6-19 · Improving Hölder s inequality Satyanad Kichenassamy To cite this version Satyanad Kichenassamy. Improving Hölder s inequality. Houston Journal of Mathematics 2010 35 (1) pp.303-312. hal-00826949

### A Class of Generalizations of Hölder s Inequality

der s inequality using arguments of convex analysis. In Section 2 we formulate an optimi-zation problem and obtain (1.4) as its solution using a constructive method namely the Kuhn-Tucker theory. A Class of Generalizations of Hölder s Inequality

### Hölder s inequality in nLab

2018-4-5 · Hölder s inequality is closely related to the notion of log-convexity. On the one hand we saw that the inequality follows from the convexity of the exponential function which is the most basic log-convex function of all. On another hand we have the following result which uses Hölder s inequality.

### The Improvement of Hölder s Inequality with -Conjugate

Abstract. This paper investigates Hölder s inequality under the condition of -conjugate exponents in the sense that . Successively we have under -conjugate exponents relative to the -norm investigated generalized Hölder s inequality the interpolation of Hölder s inequality and generalized -order Hölder s inequality which is an expansion of the known Hölder s inequality.

### A generalized Hölder-type inequalities for measurable

2020-8-8 · We prove a generalized Hölder-type inequality for measurable operators associated with a semi-finite von Neumann algebra which is a generalization of the result shown by Bekjan (Positivity 21 113–126 2017). This also provides a generalization of the unitarily invariant norm inequalities for matrix due to Bhatia–Kittaneh Horn–Mathisa Horn–Zhan and Zou under a cohyponormal condition.

### Hölder s Inequalities -- from Wolfram MathWorld

2021-7-19 · Similarly Hölder s inequality for sums states that sum_(k=1) na_kb_k<=(sum_(k=1) na_k p) (1/p)(sum_(k=1) nb_k q) (1/q) (4) with equality when b_k=ca_k (p-1). (5) If p=q=2 this becomes Cauchy s inequality.

### real analysisProving Hölder s InequalityMathematics

2021-6-10 · In the vast majority of books dealing with Real Analysis Hölder s inequality is proven by the use of Young s inequality for the case in which p q > 1 and they usually have as an exercise the question whether this inequality is valid for p = 1 which means that q = ∞ . Well if f ∈ L1 and g ∈ L∞ then ‖f‖1 = ∫b a f(x) dx

### Extensions and demonstrations of Hölder s inequality

2019-4-8 · YanandGao JournalofInequalitiesandApplications20192019 97 Page2of12 Yang s 13 14 insightsintoinequalitieshavefurtherledtoseveralinferences.Qi s 15 16

### Hölder inequalityEncyclopedia of Mathematics

2012-11-29 · Hölder inequality. The Hölder inequality for sums. Let a s and b s be certain sets of complex numbers s ∈ S where S is a finite or an infinite set of indices. The following inequality of Hölder is valid ( a s b s) and C are independent of s ∈ S. In the limit case when p = 1 q = ∞ Hölder s inequality has the form.

### Hölder s identity — Princeton University

We clarify that Hölder s inequality can be stated more generally than is often realized. This is an immediate consequence of an analogous information-theoretic identity which we call Hölder s identity. We also explain Andrew R. Barron s original use of the identity.

### linear algebraHölder s inequality for matrices

2021-6-5 · There are (at least two) "generalizations" of Hölder inequality to the non-commutative case. One is the so called tracial matrix Hölder inequality langle A B rangle_ HS = mat Tr (A dagger B) le A_p B_q where A_p is the Schatten p -norm and 1/p 1/q=1 . You can find a proof here.

### Extensions and demonstrations of Hölder s inequality

2019-4-8 · YanandGao JournalofInequalitiesandApplications20192019 97 Page2of12 Yang s 13 14 insightsintoinequalitieshavefurtherledtoseveralinferences.Qi s 15 16

### On Subdividing of Hölder s Inequality for Sums

4 S. Abramovich B. Mond J.E. Pečarić Sharpening Hölder s inequality J. Math Anal Appl. 196 (1995) p.1131–1134.

### Hölder s inequality in nLab

2018-4-5 · Hölder s inequality is closely related to the notion of log-convexity. On the one hand we saw that the inequality follows from the convexity of the exponential function which is the most basic log-convex function of all. On another hand we have the following result which uses Hölder s inequality.

### Hölder s identity — Princeton University

We clarify that Hölder s inequality can be stated more generally than is often realized. This is an immediate consequence of an analogous information-theoretic identity which we call Hölder s identity. We also explain Andrew R. Barron s original use of the identity.

### A generalized Hölder-type inequalities for measurable

2020-8-8 · We prove a generalized Hölder-type inequality for measurable operators associated with a semi-finite von Neumann algebra which is a generalization of the result shown by Bekjan (Positivity 21 113–126 2017). This also provides a generalization of the unitarily invariant norm inequalities for matrix due to Bhatia–Kittaneh Horn–Mathisa Horn–Zhan and Zou under a cohyponormal condition.

### More on Hölder s Inequality and It s Reverse via the

2020-10-18 · Hölder s inequality is one of the greatest inequalities in pure and applied mathematics. As is well known Hölder s inequality plays a very important role in different branches of modern mathematics

### Explore further

_ -CSDNblog.csdn Hölder zhuanlan.zhihuHolder zhuanlan.zhihu Hölder _-CSDNblog.csdn(Holder)_yanghhcnblogsRecommended to you based on what s popular • Feedback### Hölder s Inequality Brilliant Math Science Wiki

Hölder s inequality is often used to deal with square (or higher-power) roots of expressions in inequalities since those can be eliminated through successive multiplication. Here is an example Let a b c a b c a b c be positive reals satisfying a b c = 3 a b c=3 a b c = 3 .

### Bounding the Partition Function using Hölder s Inequality

2019-1-10 · Bounding the Partition Function using H older s Inequality Qiang Liu qliu1 uci.edu Alexander Ihler ihler ics.uci.edu Department of Computer Science University of California Irvine CA 92697 USA Abstract We describe an algorithm for approximate in-ference in graphical models based on H older s inequality that provides upper and lower

### Sharpening Hölder s inequalityKTH

2018-2-5 · Sharpening Hölder s inequality Author H. Hedenmalm (joint work with D. Stolyarov V. Vasyunin P. Zatitskiy) Created Date 2/5/2018 1 38 43 PM

### The Improvement of Hölder s Inequality with -Conjugate

Abstract. This paper investigates Hölder s inequality under the condition of -conjugate exponents in the sense that . Successively we have under -conjugate exponents relative to the -norm investigated generalized Hölder s inequality the interpolation of Hölder s inequality and generalized -order Hölder s inequality which is an expansion of the known Hölder s inequality.

### Hölder s identity — Princeton University

We clarify that Hölder s inequality can be stated more generally than is often realized. This is an immediate consequence of an analogous information-theoretic identity which we call Hölder s identity. We also explain Andrew R. Barron s original use of the identity.

### A generalized Hölder-type inequalities for measurable

2020-8-8 · We prove a generalized Hölder-type inequality for measurable operators associated with a semi-finite von Neumann algebra which is a generalization of the result shown by Bekjan (Positivity 21 113–126 2017). This also provides a generalization of the unitarily invariant norm inequalities for matrix due to Bhatia–Kittaneh Horn–Mathisa Horn–Zhan and Zou under a cohyponormal condition.

### Hölder inequalityEncyclopedia of Mathematics

2012-11-29 · Hölder inequality. The Hölder inequality for sums. Let a s and b s be certain sets of complex numbers s ∈ S where S is a finite or an infinite set of indices. The following inequality of Hölder is valid ( a s b s) and C are independent of s ∈ S. In the limit case when p = 1 q = ∞ Hölder s inequality has the form.

### Hölder s identity — Princeton University

### Young s Minkowski s and H older s inequalities

2011-9-16 · The rst thing to note is Young s inequality is a far-reaching generalization of Cauchy s inequality. In particular if p = 2 then 1 p = p 1 p = 1 2 and we have Cauchy s inequality ab 1 2 a2 1 2 b2 (4) Normally to use Young s inequality one chooses a speci c p and a and b are free-oating quantities. For instance if p = 5 we get

### The Improvement of Hölder s Inequality with -Conjugate

Abstract. This paper investigates Hölder s inequality under the condition of -conjugate exponents in the sense that . Successively we have under -conjugate exponents relative to the -norm investigated generalized Hölder s inequality the interpolation of Hölder s inequality and generalized -order Hölder s inequality which is an expansion of the known Hölder s inequality.

### real analysisProving Hölder s InequalityMathematics

2021-6-10 · In the vast majority of books dealing with Real Analysis Hölder s inequality is proven by the use of Young s inequality for the case in which p q > 1 and they usually have as an exercise the question whether this inequality is valid for p = 1 which means that q = ∞ . Well if f ∈ L1 and g ∈ L∞ then ‖f‖1 = ∫b a f(x) dx

### Ele-MathKeyword page Hölder inequality

Articles containing keyword "Hölder inequality" MIA-01-01 » Hölder type inequalities for matrices (01/1998) MIA-01-05 » Why Hölder s inequality should be called Rogers inequality (01/1998) MIA-01-37 » Some new Opial-type inequalities (07/1998) MIA-02-02 » A note on some classes of Fourier coefficients (01/1999) MIA-03-37 » Generalization theorem on convergence and integrability for

### real analysisProving Hölder s InequalityMathematics

2021-6-10 · In the vast majority of books dealing with Real Analysis Hölder s inequality is proven by the use of Young s inequality for the case in which p q > 1 and they usually have as an exercise the question whether this inequality is valid for p = 1 which means that q = ∞ . Well if f ∈ L1 and g ∈ L∞ then ‖f‖1 = ∫b a f(x) dx

### Bounding the Partition Function using Hölder s Inequality

2019-1-10 · Bounding the Partition Function using H older s Inequality Qiang Liu qliu1 uci.edu Alexander Ihler ihler ics.uci.edu Department of Computer Science University of California Irvine CA 92697 USA Abstract We describe an algorithm for approximate in-ference in graphical models based on H older s inequality that provides upper and lower

### Hölder s and Minkowski s Inequalities SpringerLink

FREIMER M. and G. S. MUDHALKAR A class of generalizations of Hölder s inequality Inequalities in Statistics and Probability. IMS Lecture Notes — Monograph Series 5

### Cauchy-Schwarz Inequality

2020-7-19 · Young s inequality can be used to prove Hölder s inequality. It is also widely used to estimate the norm of nonlinear terms in PDE theory since it allows one to estimate a product of two terms by a sum of the same terms raised to a power and scaled .

### On Subdividing of Hölder s Inequality for Sums

4 S. Abramovich B. Mond J.E. Pečarić Sharpening Hölder s inequality J. Math Anal Appl. 196 (1995) p.1131–1134.

### Generalized Hölder s inequality for g-integral IEEE

2016-8-31 · Generalized Hölder s inequality for g-integral Abstract One extension of Hölder inequality in the frame of pseudo-analysis is given. The extension of Hölder inequality is presented for the case of g-semirings and some illustrative examples are given. Published

### Improving Hölder s inequality

2021-6-19 · Improving Hölder s inequality Satyanad Kichenassamy To cite this version Satyanad Kichenassamy. Improving Hölder s inequality. Houston Journal of Mathematics 2010 35 (1) pp.303-312. hal-00826949

### functional analysisHölder s inequality with three

2021-6-12 · Hölder s inequality with three functions. Let p q r ∈ (1 ∞) with 1 / p 1 / q 1 / r = 1. Prove that for every functions f ∈ Lp(R) g ∈ Lq(R) and h ∈ Lr(R) ∫R fgh ≤ ‖f‖p ⋅ ‖g‖q ⋅ ‖h‖r.

### functional analysisHölder s inequality with three

2021-6-12 · Hölder s inequality with three functions. Let p q r ∈ (1 ∞) with 1 / p 1 / q 1 / r = 1. Prove that for every functions f ∈ Lp(R) g ∈ Lq(R) and h ∈ Lr(R) ∫R fgh ≤ ‖f‖p ⋅ ‖g‖q ⋅ ‖h‖r.

### Symmetry Free Full-Text More on Hölder s Inequality

Hölder s inequality is one of the greatest inequalities in pure and applied mathematics. As is well known Hölder s inequality plays a very important role in different branches of modern mathematics such as linear algebra classical real and complex analysis probability and statistics qualitative theory of differential equations and their applications.