The Proofs of Triangle Inequality Using Binomial Inequalities

Barnes, Belinda; Wusu-Ansah, E.D J.O.; Amponsah, S. K.; Adjei, Isaac Akpor

doi:10.29020/nybg.ejpam.v11i1.3165

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Cited by 2 publications

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“…Since then many researchers across the globe had obtained different ways of proving triangle inequality. For example, see a research paper by authors in [2]. After the discovery of triangle inequality the so-called arithmetic-geometric mean AGM inequality:…”

Section: Introductionmentioning

confidence: 99%

The Proofs of Product Inequalities in Vector Spaces

Barnes

Owusu-Ansah²,

Amponsah³

et al. 2018

Eur. J. Pure Appl. Math.

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In this paper, we introduce the proofs of product inequalities:u v ≤ u + v , for all u, v ∈ [0, 2], and u + v ≤ u v , for allu, v ∈ [2, ∞). The first product inequality u v ≤ u + v holds forany two vectors in the interval [0, 1] in Holder’s space and also valid anytwo vectors in the interval [1, 2] in the Euclidean space. On the otherhand, the second product inequality u + v ≤ u v ∀u, v ∈ [2, ∞)only in Euclidean space. By applying the first product inequality to theL p spaces, we observed that if f : Ω → [0, 1], and g : Ω → R, thenf p g p ≤ f p + g p . Also, if f, g : Ω → R, then f p + g p ≤f p g p .

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Section: Introductionmentioning

confidence: 99%