Extension of Hilbert's inequality

Abstract: In this paper we make some further extensions of discrete Hilbert's inequality by using Euler-Maclaurin summation formula. We give the improvements of some previously obtained results and also compare our results with some previously known from the literature.

“…In this section, we first improve the result of [7,Lemma 2] by showing that inequality (1.4) is valid for any s > 2 when λ = 1. We then deduce that lim n→∞ f s (n) = 0.…”

“…We note that the above inequality is valid when λ < 0 by the integral test. In [7,Lemma 2], it is shown that the above inequality is valid when 0 < s ≤ 2, −1 < λ < s−1 and 2 < s ≤ 14, −1 < λ ≤ 1. In the next section, we extend this result to the case of 1 < λ ≤ 2, λ + 1 < s ≤ 5 to prove the following…”

A generalization of Hilbert's inequality

“…In this section, we first improve the result of [7,Lemma 2] by showing that inequality (1.4) is valid for any s > 2 when λ = 1. We then deduce that lim n→∞ f s (n) = 0.…”

“…We note that the above inequality is valid when λ < 0 by the integral test. In [7,Lemma 2], it is shown that the above inequality is valid when 0 < s ≤ 2, −1 < λ < s−1 and 2 < s ≤ 14, −1 < λ ≤ 1. In the next section, we extend this result to the case of 1 < λ ≤ 2, λ + 1 < s ≤ 5 to prove the following…”

A generalization of Hilbert's inequality

“…When K(m, n) = (m κ + n κ ) −λ , the kernel function is homogeneous of order −λ · κ. Specifying κ = λ = 1 we get Hilbert's expression in (1), while κ = 1 leads us to Yang's result (2). Assuming the homogeneity of K(·,·) and using non-conjugate Hölder pairs (p, q), p > 1, p −1 + q −1 1 we arrive at the classical Hilbert's double series theorems by Levin [5], Bonsall [1] and the recent ones by Krnić and Pečarić [4]. (We point out that the best constant problem is still open when p, q are not conjugated.…”

“…The range of the parameter λ ∈ (2 − min{p, q}, 2] in Yang's result (2) was enlarged (by new consequent parametrizations) to λ ∈ (0, 14] by Krnić and Pečarić, see [4,Theorems 1,2] in the conjugate, and [4, Theorem 4] for non-conjugate Hölder couple p, q. Therefore, the range of r in Theorem 1 can be enlarged as well.…”

“…The lonely Hilbert's double series theorems in the case of nonhomogeneous kernel remain the Mulholland's inequality [6], in which K(m, n) = ln(mn), m, n 2, and its extension by Yang, who takes Chapters 3,4]. So, the inequality result by He et al…”

Hilbert's double series theorem extended to the case of non-homogeneous kernels

A Half-Discrete Hilbert-Type Inequality with a Non-Homogeneous Kernel and Two Variables