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semigroupBuilding
The inequality discovered by L. K. Hua in 1965 has been generalized in several directions. In this paper, we adopt a certain conjugate method to give a simple and fundamental inequality on two functions on a semigroup, which is the key to the proof of many gen-eralizations of Hua’s inequality. 1
This paper investigates Hölder’s inequality under the condition of r-conjugate exponents in the sens...
A Kallman-Rota type inequality for evolution semigroups and applications for real valued functions a...
The current note serves to develop generalisations of Chebyshev’s inequality for Hölder functions of...
We give a new interpretation of Hua’s inequality and its generalization. From this inter-pretation, ...
AbstractSome generalizations and refinements of the well-known Hölder’s inequality are obtained
Kraljevič and Kurepa in 1970 [14] proved a nice Landau type inequality for semigroups by making use ...
The purpose of this paper is to present a short proof of the Chuang’s inequality
We extend a theorem from 'Generalizations of Lehman’s inequality' (Sándor, 2006) proved for function...
Abstract. Some new refinements are presented for Jensen’s inequality. These strengthen several resul...
ABSTRACT. In this note we present a proof of the inequality H /H ’ G /G’ n n n n where H n and
We present several new generalized versions of refined Hölder’s inequalities proposed by Tian and Hu...
International audienceThe purpose of this paper is to revisit the proof of the Gearhart- Priiss-Huan...
Here we present Poincaré type general L p inequalities regarding semigroups, cosine and sine operato...
Abstract. Young’s integral inequality is reformulated with upper and lower bounds for the remainder....
Abstract In this paper, we present some new extensions of Hölder’s inequality and give a condition u...
This paper investigates Hölder’s inequality under the condition of r-conjugate exponents in the sens...
A Kallman-Rota type inequality for evolution semigroups and applications for real valued functions a...
The current note serves to develop generalisations of Chebyshev’s inequality for Hölder functions of...
We give a new interpretation of Hua’s inequality and its generalization. From this inter-pretation, ...
AbstractSome generalizations and refinements of the well-known Hölder’s inequality are obtained
Kraljevič and Kurepa in 1970 [14] proved a nice Landau type inequality for semigroups by making use ...
The purpose of this paper is to present a short proof of the Chuang’s inequality
We extend a theorem from 'Generalizations of Lehman’s inequality' (Sándor, 2006) proved for function...
Abstract. Some new refinements are presented for Jensen’s inequality. These strengthen several resul...
ABSTRACT. In this note we present a proof of the inequality H /H ’ G /G’ n n n n where H n and
We present several new generalized versions of refined Hölder’s inequalities proposed by Tian and Hu...
International audienceThe purpose of this paper is to revisit the proof of the Gearhart- Priiss-Huan...
Here we present Poincaré type general L p inequalities regarding semigroups, cosine and sine operato...
Abstract. Young’s integral inequality is reformulated with upper and lower bounds for the remainder....
Abstract In this paper, we present some new extensions of Hölder’s inequality and give a condition u...
This paper investigates Hölder’s inequality under the condition of r-conjugate exponents in the sens...
A Kallman-Rota type inequality for evolution semigroups and applications for real valued functions a...
The current note serves to develop generalisations of Chebyshev’s inequality for Hölder functions of...
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