2001
DOI: 10.7153/mia-04-21
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On Ky Fan's inequality

Abstract: Abstract. In this paper we prove several Ky Fan type inequalities involving certain StolarskyTobey means. (2000): 26D15. Mathematics subject classification

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Cited by 6 publications
(4 citation statements)
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“…This result was known to the authors of this paper prior to the publication of [7]. Application of Lemma 2.1, part (i) to the last inequality and the second inequality in (1.12) gives …”
Section: R F {Xyz) = \ F [(T + X)(t + Y)(t + Z)] T Jo~lmentioning
confidence: 84%
See 1 more Smart Citation
“…This result was known to the authors of this paper prior to the publication of [7]. Application of Lemma 2.1, part (i) to the last inequality and the second inequality in (1.12) gives …”
Section: R F {Xyz) = \ F [(T + X)(t + Y)(t + Z)] T Jo~lmentioning
confidence: 84%
“…The following inequality -< -V* F is established in [7]. This result was known to the authors of this paper prior to the publication of [7].…”
Section: R F {Xyz) = \ F [(T + X)(t + Y)(t + Z)] T Jo~lmentioning
confidence: 90%
“…For the logarithmic and identric means, there are some good results. See, for example, [4,7,9,[11][12][13][14][15] and the references cited therein.…”
Section: Introduction and Notationmentioning
confidence: 99%
“…This result, commonly referred to as the Ky Fan inequality, has stimulated an interest of many researchers. New proofs, improvements and generalizations of the inequality (1.7) have been found ( For instance, see [7,12,18]).…”
Section: Introduction and Notationmentioning
confidence: 99%