Abstract By using weight coefficients, technique of real analysis, and Hermite-Hadamard’s inequality, we give a more accurate Hardy-Mulholland-type inequality with multiparameters and a best possible constant factor related to the beta function. The equivalent forms, the reverses, the operator expressions, and some particular cases are also considered
Abstract A new discrete Mulholland-type inequality in the whole plane with a best possible constant ...
In this paper, some extensions and improvements of the reverse Hardy-Littlewood’s inequality are est...
In this paper, by introducing some parameters and by employing a sharpening of Hölder’s inequality,...
Abstract By using the way of weight coefficients, the technique of real analysis, and Hermite-Hadama...
Abstract Using weight coefficients and applying the well-known Hermite-Hadamard inequality, a new Ha...
Abstract By introducing independent parameters, applying the weight coefficients, and Hermite-Hadama...
Abstract We present a new reverse Mulholland-type inequality in the whole plane with a best possible...
A new, more accurate extension of Mulholland’s inequality in the whole plane with a best possible co...
Abstract By means of the weight coefficients, using the idea of introduced parameters and the techni...
Abstract By introducing multi-parameters, applying the weight coefficients and Hermite–Hadamard’s in...
Abstract By means of the weight functions, Hermite–Hadamard’s inequality, and the techniques of real...
Abstract By means of weight coefficients and the technique of real analysis, a new Hardy-Mulholland-...
By the use of weight coefficients and Hermite-Hadamard’s inequality, a new extension of Hardy-Hilber...
By the use of weight coefficients and Hermite-Hadamard's inequality, a new extension of Hardy-H...
This paper deals with a generalization of the Hardy-Hilbert inequality with best constant factor whi...
Abstract A new discrete Mulholland-type inequality in the whole plane with a best possible constant ...
In this paper, some extensions and improvements of the reverse Hardy-Littlewood’s inequality are est...
In this paper, by introducing some parameters and by employing a sharpening of Hölder’s inequality,...
Abstract By using the way of weight coefficients, the technique of real analysis, and Hermite-Hadama...
Abstract Using weight coefficients and applying the well-known Hermite-Hadamard inequality, a new Ha...
Abstract By introducing independent parameters, applying the weight coefficients, and Hermite-Hadama...
Abstract We present a new reverse Mulholland-type inequality in the whole plane with a best possible...
A new, more accurate extension of Mulholland’s inequality in the whole plane with a best possible co...
Abstract By means of the weight coefficients, using the idea of introduced parameters and the techni...
Abstract By introducing multi-parameters, applying the weight coefficients and Hermite–Hadamard’s in...
Abstract By means of the weight functions, Hermite–Hadamard’s inequality, and the techniques of real...
Abstract By means of weight coefficients and the technique of real analysis, a new Hardy-Mulholland-...
By the use of weight coefficients and Hermite-Hadamard’s inequality, a new extension of Hardy-Hilber...
By the use of weight coefficients and Hermite-Hadamard's inequality, a new extension of Hardy-H...
This paper deals with a generalization of the Hardy-Hilbert inequality with best constant factor whi...
Abstract A new discrete Mulholland-type inequality in the whole plane with a best possible constant ...
In this paper, some extensions and improvements of the reverse Hardy-Littlewood’s inequality are est...
In this paper, by introducing some parameters and by employing a sharpening of Hölder’s inequality,...
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