An Extended Hilbert-Type Inequality with Two Internal Variables Involving One Partial Sums

Wang, Aizhen; Yang, Bicheng

doi:10.3390/axioms12090871

Open AccessArticle

An Extended Hilbert-Type Inequality with Two Internal Variables Involving One Partial Sums

by

Aizhen Wang

and

Bicheng Yang

^*

School of Mathematics, Guangdong University of Education, Guangzhou 510303, China

^*

Author to whom correspondence should be addressed.

Axioms 2023, 12(9), 871; https://doi.org/10.3390/axioms12090871

Submission received: 26 July 2023 / Revised: 17 August 2023 / Accepted: 22 August 2023 / Published: 10 September 2023

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Abstract

:

By the use of the techniques of analysis and some useful formulas, we give a new extension of Hilbert-type inequality with two internal variables involving one partial sums, which is a refinement of a published inequality. We provide a few equivalent conditions of the best possible constant related to multi parameters. We obtain the equivalent inequalities, the operator expressions as well as a few inequalities with the particular parameters as applications.

Keywords:

weight coefficient; parameter; partial sums; equivalent form; mid-value theorem

MSC:

26D15; 47A05

1. Introduction

Assuming that

p > 1^{} (q > 1), \frac{1}{p} + \frac{1}{q} = 1, a_{m}, b_{n} \geq 0, 0 < \sum_{m = 1}^{\infty} a_{m}^{p} < \infty

and

0 < \sum_{n = 1}^{\infty} b_{n}^{q} < \infty,

we have the well known Hardy-Hilbert’s inequality as follows (ref. [1], Theorem 315):

\sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{a_{m} b_{n}}{m + n} < \frac{π}{\sin (π / p)} {(\sum_{m = 1}^{\infty} a_{m}^{p})}^{\frac{1}{p}} {(\sum_{n = 1}^{\infty} b_{n}^{q})}^{\frac{1}{q}}

(1)

where, the constant factor

\frac{π}{\sin (π / p)}

is the best possible.

In 2006, by putting

λ_{i} \in {(0, 2]}^{} (i = 1, 2), λ_{1} + λ_{2} = λ \in (0, 4],

Krnic et al. [2] gave a generalization of Inequality (1) as follows:

\sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{a_{m} b_{n}}{{(m + n)}^{λ}} < B (λ_{1}, λ_{2}) {[\sum_{m = 1}^{\infty} m^{p (1 - λ_{1}) - 1} a_{m}^{p}]}^{\frac{1}{p}} {[\sum_{n = 1}^{\infty} n^{q (1 - λ_{2}) - 1} b_{n}^{q}]}^{\frac{1}{q}},

(2)

with the best possible constant factor

B (λ_{1}, λ_{2})

(

B (u, v) : = \int_{0}^{\infty} \frac{t^{u - 1}}{{(1 + t)}^{u + v}} d t^{} (u, v > 0)

is the Beta function). For

p = q = 2,

λ_{1} = λ_{2} = \frac{λ}{2}

in Inequality (2), it deduces to the inequality in Yang’s paper [3].

Inequalities (1) and (2) with their integral analogues played an important role in analysis and its applications (ref. [4,5,6,7,8,9,10,11,12,13,14]). By using the weight functions in 2016, Hong et al. [15] obtained a few equivalent conditions of the extension of Inequality (1) with the best constant factor related to multi parameters. Some further results were provided by [16,17,18,19,20].

In 2019, by using Inequality (2), Adiyasuren et. al. [21] gave an extension of Inequality (2) involving partial sums: if

λ_{i} \in (0, 1] \cap (0, λ)

(λ \in (0, 2];

i = 1, 2),

λ_{1} + λ_{2} = λ,

a_{m}, b_{n} \geq 0,

then it follows that

\sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{a_{m} b_{n}}{{(m + n)}^{λ}} < λ_{1} λ_{2} B (λ_{1}, λ_{2}) {(\sum_{m = 1}^{\infty} m^{- p λ_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} {(\sum_{n = 1}^{\infty} n^{- q λ_{2} - 1} B_{n}^{q})}^{\frac{1}{q}},

(3)

with the best constant

λ_{1} λ_{2} B (λ_{1}, λ_{2})

, involving two partial sums

A_{m} : = \sum_{i = 1}^{m} a_{i}

and

B_{n} : = \sum_{k = 1}^{n} b_{k}

(m, n \in {1, 2, \dots})

,

A_{m} = o (e^{t m})

,

B_{n} = o (e^{t n})

(t > 0; m, n \to \infty),

such that

0 < \sum_{m = 1}^{\infty} m^{- p λ_{1} - 1} A_{m}^{p} < \infty^{} a n d 0 < \sum_{n = 1}^{\infty} n^{- q λ_{2} - 1} B_{n}^{q} < \infty .

(4)

In 2021, Liao et al. [22] gave an extension of Inequality (3) with the kernel as

\frac{1}{{(m^{α} + n^{β})}^{λ}} (α, β \in (0, 1])

involving one partial sums. But the constant factor in this inequality seems not to be the best possible unless at

α = β = 1

. In 2023, by using the mid-value theorem, Hong et al. [23,24] gave a new inequality as well as the reverse with the same kernel as [22] involving two partial sums, and proved that the constant factor is the best possible in some conditions.

In this article, by applying the methods in [23], and using the techniques of introduced parameters, some useful formulas and the mid-value theorem, we give a new extension of Hardy-Hilbert’s inequality with the internal variables involving one partial sums, which is a refinement of the inequality in [22]. We also provide a few equivalent statements of the best possible constant factor related to several parameters. As applications, we obtain the equivalent inequalities, the operator expressions as well as a few inequalities with the particular parameters. The lemmas and theorems provide an extensive account of this type of inequalities.

2. Some Lemmas

In what follows of this article, we assume that

p > 1^{} (q > 1), \frac{1}{p} + \frac{1}{q} = 1,

λ \in (0, 5],

α, β \in (0, 1],

λ_{1} \in (- 1, \frac{2}{α} - 1] \cap (- 1, λ), λ_{2} \in (0, \frac{2}{β}] \cap (0, λ + 1),

{\hat{λ}}_{1} : = \frac{λ - λ_{2}}{p} + \frac{λ_{1}}{q},

{\hat{λ}}_{2} : = \frac{λ - λ_{1}}{q} + \frac{λ_{2}}{p} .

We still suppose that

a_{m}, b_{n} \geq 0,

A_{m} : = \sum_{j = 1}^{m} a_{j},

(m, n \in N

= {1, 2, \dots}),

such that

A_{m} = o (e^{t m^{α}})

(t > 0; m \to \infty),

and

0 < \sum_{m = 1}^{\infty} m^{- p α {\hat{λ}}_{1} - 1} A_{m}^{p} < \infty, 0 < \sum_{n = 1}^{\infty} n^{q (1 - β {\hat{λ}}_{2}) - 1} b_{n}^{q} < \infty .

(5)

For showing the main results, we give the following key lemma by using the mid-value theorem:

Lemma 1.

If

t > 0

, then the following inequality holds:

\sum_{m = 1}^{\infty} e^{- t m^{α}} a_{m} \leq t α \sum_{m = 1}^{\infty} e^{- t m^{α}} m^{α - 1} A_{m} .

(6)

Proof.

For

A_{m} e^{- t m^{α}} = o {(1)}^{} (m \to \infty)

, in view of Abel’s summation formula, we obtain

\sum_{m = 1}^{\infty} e^{- t m^{α}} a_{m} = \lim_{m \to \infty} A_{m} e^{- t m^{α}} + \sum_{m = 1}^{\infty} A_{m} [e^{- t m^{α}} - e^{- t {(m + 1)}^{α}}] = \sum_{m = 1}^{\infty} A_{m} [e^{- t m^{α}} - e^{- t {(m + 1)}^{α}}] .

We set function

g (x) = e^{- t x^{α}}, x \in [m, m + 1] .

Then we find that

g' (x) = - t α x^{α - 1} e^{- t x^{α}},

and for

x \in [m, m + 1],

α \in (0, 1],

the function

h (x) : = x^{α - 1} e^{- t x^{α}}

is decreasing. In view of the mid-value theorem, it follows that

\begin{array}{l} \sum_{m = 1}^{\infty} e^{- t m^{α}} a_{m} & = - \sum_{m = 1}^{\infty} A_{m} (g (m + 1) - g (m)) \\ ^{}^{}^{}^{} = - \sum_{m = 1}^{\infty} A_{m} g' (m + θ) = t α \sum_{m = 1}^{\infty} h (m + θ) A_{m} \\ ^{}^{}^{}^{} \leq t α \sum_{m = 1}^{\infty} h (m) A_{m} = t α \sum_{m = 1}^{\infty} m^{α - 1} e^{- t m^{α}} A_{m}^{} (θ \in (0, 1)), \end{array}

namely, Equation (6) follows.

The lemma is proved. □

For showing the inequalities in Lemma 3, we need the following lemma:

Lemma 2.

(ref. [4], (2.2.3)). (i) Assuming that

{(- 1)}^{k} \frac{d^{k}}{d t^{k}} g (t) > 0,

t \in [m, \infty)

,

g^{(k)} (\infty) = 0

(k = 0, 1, 2, 3)

,

P_{j} (t), B_{j}^{} (j \in N)

are Bernoulli functions and Bernoulli numbers of j-order, it follows that

\int_{m}^{\infty} P_{2 q - 1} (t) g (t) d t = - ε_{q} \frac{B_{2 q}}{2 q} g {(m)}^{} (0 < ε_{q} < 1; q = 1, 2, \dots) .

(7)

In particular, for

q = 1,

B_{2} = \frac{1}{6}

, we have

- \frac{1}{12} g (m) < \int_{m}^{\infty} P_{1} (t) g (t) d t < 0;

(8)

for

q = 2,

B_{4} = - \frac{1}{30}

, we have

0 < \int_{m}^{\infty} P_{3} (t) g (t) d t < \frac{1}{120} g (m) .

(9)

(ii) (ref. [4], (2.3.2)) If

f (t) (> 0) \in C^{3} [m, \infty), f^{(k)} (\infty) = 0 {(k = 0, 1, 2, 3)}

, then the following Euler-Maclaurin summation formula holds:

\sum_{k = m}^{\infty} f (k) = \int_{m}^{\infty} f (t) d t + \frac{1}{2} f (m) + \int_{m}^{\infty} P_{1} (t) f^{'} (t) d t,

(10)

\int_{m}^{\infty} P_{1} (t) f^{'} (t) d t = - \frac{1}{12} f^{'} (m) + \frac{1}{6} \int_{m}^{\infty} P_{3} (t) f^{‴} (t) d t .

(11)

Lemma 3.

For

s \in (0, 6],

s_{2} \in (0, \frac{2}{β}] \cap (0, s),

k_{s} (s_{2}) : = B (s_{2}, s - s_{2})

, indicate the weight coefficient as follows:

ϖ_{s} (s_{2}, m) : = m^{α (s - s_{2})} {\sum_{n = 1}^{\infty} \frac{β n^{β s_{2} - 1}}{{(m^{α} + n^{β})}^{s}}}^{} (m \in N) .

(12)

We have

0 < k_{s} (s_{2}) (1 - O (\frac{1}{m^{α s_{2}}})) < ϖ_{s} (s_{2}, m) < k_{s} {(s_{2})}^{} (m \in N) .

(13)

where, we indicate

O (\frac{1}{m^{α s_{2}}}) : = \frac{1}{k_{s} (s_{2})} \int_{0}^{\frac{1}{m^{α}}} \frac{u^{s_{2} - 1}}{{(1 + u)}^{s}} d u > 0 .

Proof.

For fixed

m \in N

, we define

g (m, t)

as follows:

g (m, t) : = {\frac{β t^{β s_{2} - 1}}{{(m^{α} + t^{β})}^{s}}}^{} (t > 0) .

In view of Inequality (10), it follows that

\begin{array}{l} \sum_{n = 1}^{\infty} g (m, n) & = \int_{1}^{\infty} g (m, t) d t + \frac{1}{2} g (m, 1) + \int_{1}^{\infty} P {}_{1}{(t)} g^{'} (m, t) d t \\ = \int_{0}^{\infty} g (m, t) d t - h (m), \\ h (m) & : = \int_{0}^{1} g (m, t) d t - \frac{1}{2} g (m, 1) - \int_{1}^{\infty} P_{1} (t) g^{'} (m, t) d t . \end{array}

We obtain that

- \frac{1}{2} g (m, 1) = \frac{- β}{2 {(m^{α} + 1)}^{s}}

and find

\begin{array}{l} ^{} \int_{0}^{1} g (m, t) d t = β \int_{0}^{1} \frac{t^{β s_{2} - 1}}{{(m^{α} + t^{β})}^{s}} d t \overset{u = t^{β}}{=} \int_{0}^{1} \frac{u^{s_{2} - 1}}{{(m^{α} + u)}^{s}} d u \\ = \frac{1}{s_{2}} \int_{0}^{1} \frac{d u^{s_{2}}}{{(m^{α} + u)}^{s}} = \frac{1}{s_{2}} \frac{u^{s_{2}}}{{(m^{α} + u)}^{s}} |_{0}^{1} + \frac{s}{s_{2}} \int_{0}^{1} \frac{u^{s_{2}}}{{(m^{α} + u)}^{s + 1}} d u \\ = \frac{1}{s_{2}} \frac{1}{{(m^{α} + 1)}^{s}} + \frac{s}{s_{2} (s_{2} + 1)} \int_{0}^{1} \frac{d u^{s_{2} + 1}}{{(m^{α} + u)}^{s + 1}} \\ ^{} > \frac{1}{s_{2}} \frac{1}{{(m^{α} + 1)}^{s}} + \frac{s}{s_{2} (s_{2} + 1)} {[\frac{u^{s_{2} + 1}}{{(m^{α} + u)}^{s + 1}}]}_{0}^{1} + \frac{s (s + 1)}{s_{2} (s_{2} + 1) {(m^{α} + 1)}^{s + 2}} \int_{0}^{1} u^{s_{2} + 1} d u \\ = \frac{1}{s_{2}} \frac{1}{{(m^{α} + 1)}^{s}} + \frac{λ}{s_{2} (s_{2} + 1)} \frac{1}{{(m^{α} + 1)}^{s + 1}} + \frac{s (s + 1)}{s_{2} (s_{2} + 1) (s_{2} + 2)} \frac{1}{{(m^{α} + 1)}^{s + 2}}, \\ - g^{'} (m, t) = - \frac{β (β s_{2} - 1) t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s}} + \frac{β^{2} s t^{β + β s_{2} - 2}}{{(m^{α} + t^{β})}^{s + 1}} \\ = - \frac{β (β s_{2} - 1) t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s}} + \frac{β^{2} s (m^{α} + t^{β} - m^{α}) t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s + 1}} = \frac{β (β s - β s_{2} + 1) t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s}} - \frac{β^{2} s m^{α} t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s + 1}} . \end{array}

For

0 < s_{2} \leq \frac{2}{β}, 0 < β \leq 1, s_{2} < s \leq 6

, it follows that

{(- 1)}^{i} \frac{d^{i}}{d t^{i}} [\frac{t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s}}] > 0, {(- 1)}^{i} \frac{d^{i}}{d t^{i}} [\frac{t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s + 1}}] > 0^{} (i = 0, 1, 2, 3) .

By Inequalities (8)–(11), we obtain

\begin{array}{l} β (β s - β s_{2} + 1) \int_{1}^{\infty} P_{1} (t) \frac{t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s}} d t > - \frac{β (β s - β s_{2} + 1)}{12 {(m^{α} + 1)}^{s}}, \\ \overset{}{} - β^{2} m^{α} s \int_{1}^{\infty} P_{1} (t) \frac{t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s + 1}} d t \\ = \frac{β^{2} m^{α} s}{12 {(m^{α} + 1)}^{s + 1}} - \frac{β^{2} m^{α} s}{6} \int_{1}^{\infty} P_{3} (t) [\frac{t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s + 1}}]^{″} d t \\ > \frac{β^{2} m^{α} s}{12 {(m^{α} + 1)}^{s + 1}} - \frac{β^{2} m^{α} s}{720} [\frac{t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s + 1}}]_{t = 1}^{″} \\ > \frac{β^{2} (m^{α} + 1 - 1) s}{12 {(m^{α} + 1)}^{s + 1}} - \frac{β^{2} (m^{α} + 1) s}{720} [\frac{(s + 1) (s + 2) β^{2}}{{(m^{α} + 1)}^{s + 3}} + \frac{β (s + 1) (5 - β - 2 β s_{2})}{{(m^{α} + 1)}^{s + 2}} + \frac{(2 - β s_{2}) (3 - β s_{2})}{{(m^{α} + 1)}^{s + 1}}] \\ = \frac{β^{2} s}{12 {(m^{α} + 1)}^{s}} - \frac{β^{2} s}{12 {(m^{α} + 1)}^{s + 1}} \\ - \frac{β^{2} s}{720} [\frac{(s + 1) (s + 2) β^{2}}{{(m^{α} + 1)}^{s + 2}} + \frac{β (s + 1) (5 - β - 2 β s_{2})}{{(m^{α} + 1)}^{s + 1}} + \frac{(2 - β s_{2}) (3 - β s_{2})}{{(m^{α} + 1)}^{s}}] . \end{array}

Then it follows that

h (m) > \frac{1}{{(m^{α} + 1)}^{s}} h_{1} + \frac{λ}{{(m^{α} + 1)}^{s + 1}} h_{2} + \frac{s (s + 1)}{{(m^{α} + 1)}^{s + 2}} h_{3},

where, we set

h_{1} : = \frac{1}{s_{2}} - \frac{β}{2} - \frac{β - β^{2} s_{2}}{12} - \frac{β^{2} s (2 - β s_{2}) (3 - β s_{2})}{720},

h_{2} : = \frac{1}{s_{2} (s_{2} + 1)} - \frac{β^{2}}{12} - \frac{β^{3} (s + 1) (5 - β - 2 β s_{2})}{720},

and

h_{3} : = \frac{1}{s_{2} (s_{2} + 1) (s_{2} + 2)} - \frac{β^{4} (s + 2)}{720} .

We find

h_{1} \geq \frac{1}{s_{2}} - \frac{β}{2} - \frac{β - β^{2} s_{2}}{12} - \frac{s β^{2} (2 - β s_{2}) (3 - β s_{2})}{720} = \frac{g (s_{2})}{720 s_{2}},

where, we indicate the function

g {(σ)}^{} (σ \in (0, \frac{2}{β}])

as follows:

g (σ) : = 720 - (420 β + 6 s β^{2}) σ + (60 β^{2} + 5 s β^{3}) σ^{2} - s β^{4} σ^{3} .

We obtain that for

β \in (0, 1], s \in (0, 6]

,

\begin{array}{l} g^{'} (σ) & = - (420 β + 6 s β^{2}) + 2 (60 β^{2} + 5 s β^{3}) σ - 3 β^{4} σ^{2} \\ ^{}^{} \overset{}{} \leq - 420 β - 6 s β^{2} + 2 (60 β^{2} + 5 s β^{3}) \frac{2}{β} = (14 s β - 180) β < 0, \end{array}

and then it follows that

h_{1} \geq \frac{g (s_{2})}{720 s_{2}} \geq \frac{g (2 / β)}{720 s_{2}} = \frac{1}{6 s_{2}} > 0 .

We find that for

s_{2} \in (0, \frac{2}{β}]

,

h_{2} > \frac{β^{2}}{6} - \frac{β^{2}}{12} - \frac{5 (s + 1) β^{2}}{720} = (\frac{1}{12} - \frac{s + 1}{140}) β^{2} > 0,

and

h_{3} \geq (\frac{1}{24} - \frac{s + 2}{720}) β^{3} > 0^{} (0 < s \leq 6) .

Therefore, we have

h (m) > 0,

and then setting

u = m^{- α} t^{β},

it follows that

\begin{array}{l} ϖ_{s} (s_{2}, m) = m^{α (s - s_{2})} \sum_{n = 1}^{\infty} g (m, n) < m^{α (s - s_{2})} \int_{0}^{\infty} g (m, t) d t \\ = β m^{α (s - s_{2})} \int_{0}^{\infty} \frac{t^{β s_{2} - 1} d t}{{(m^{α} + t^{β})}^{s}} = \int_{0}^{\infty} \frac{u^{s_{2} - 1} d u}{{(1 + u)}^{s}} = B (s_{2}, s - s_{2}) = k_{s} (s_{2}) . \end{array}

By Inequality (10), it follows that

\begin{matrix} \sum_{n = 1}^{\infty} g (m, n) & = \int_{1}^{\infty} g (m, t) d t + \frac{1}{2} g (m, 1) + \int_{1}^{\infty} P_{1} (t) g^{'} (m, t) d t \\ \overset{}{} = \int_{1}^{\infty} g (m, t) d t + H (m), \\ H (m) & : = \frac{1}{2} g (m, 1) + \int_{1}^{\infty} P_{1} (t) g^{'} (m, t) d t . \end{matrix}

We have fond that

\frac{1}{2} g (m, 1) = \frac{β}{2 {(m^{α} + 1)}^{s}}

, and

^{} g^{'} (m, t) = - \frac{β (β s - β s_{2} + 1) t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s}} + \frac{β^{2} s m^{α} t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s + 1}} .

For

s_{2} \in (0, \frac{2}{β}] \cap (0, s), 0 < s \leq 6,

in view of Inequality (7), it follows that

^{} - β (β s - β s_{2} + 1) \int_{1}^{\infty} P_{1} (t) \frac{t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s}} d t > 0,

and

^{} β^{2} m^{α} s \int_{1}^{\infty} P_{1} (t) \frac{t^{β s_{2} - 2}}{{(m^{α} + t^{β})}^{s + 1}} d t > - \frac{β^{2} m^{α} s}{12 {(m^{α} + 1)}^{s + 1}} > - \frac{β^{2} s}{12 {(m^{α} + 1)}^{s}} .

Hence, we have

H (m) > \frac{β}{2 {(m^{α} + 1)}^{s}} - \frac{β^{2} s}{12 {(m^{α} + 1)}^{s}} \geq \frac{β}{2 {(m^{α} + 1)}^{s}} - \frac{6 β}{12 {(m^{α} + 1)}^{s}} = 0,

and then it follows that

ϖ_{s} (s_{2}, m) = m^{α (s - s_{2})} \sum_{n = 1}^{\infty} g (m, n) > m^{α (s - s_{2})} \int_{1}^{\infty} g (m, t) d t \begin{array}{l} ^{}^{}^{} = m^{α (s - s_{2})} \int_{0}^{\infty} g (m, t) d t - m^{α (s - s_{2})} \int_{0}^{1} g (m, t) d t \\ ^{}^{}^{} = k_{s} (s_{2}) [1 - \frac{1}{k_{s} (s_{2})} \int_{0}^{\frac{1}{m^{α}}} \frac{u^{s_{2} - 1}}{{(1 + u)}^{s}} d u] > 0, \end{array}

where,

O (\frac{1}{m^{α s_{2}}}) = \frac{1}{k_{s} (s_{2})} \int_{0}^{\frac{1}{m^{α}}} \frac{u^{s_{2} - 1}}{{(1 + u)}^{s}} d u,

satisfying

0 < \int_{0}^{\frac{1}{m^{α}}} \frac{u^{s_{2} - 1}}{{(1 + u)}^{s}} d u < \int_{0}^{\frac{1}{m^{α}}} u^{s_{2} - 1} d u = \frac{1}{s_{2} m^{α s_{2}}} .

Hence, Inequalities (13) follow.

This proves the lemma. □

By applying the above lemma, we obtain an extended Hardy-Hilbert’s inequality as follows.

Lemma 4.

The following inequality is valid:

I_{λ + 1} : = \sum_{n = 1}^{\infty} \sum_{m = 1}^{\infty} \frac{m^{α - 1}}{{(m^{α} + n^{β})}^{λ + 1}} A_{m} b_{n} < {(\frac{1}{β} k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(\frac{1}{α} k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} \times {(\sum_{m = 1}^{\infty} m^{- p α {\hat{λ}}_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} {(\sum_{n = 1}^{\infty} n^{q (1 - β {\hat{λ}}_{2}) - 1} b_{n}^{q})}^{\frac{1}{q}} .

(14)

Proof.

By the symmetry, for

s_{1} \in (0, \frac{2}{α}] \cap (0, s), s \in (0, 6],

the inequalities for the next weight coefficient is obtained as follows

\begin{array}{l} 0 < k_{s} (s_{1}) (1 - O (\frac{1}{n^{β s_{1}}})) < ω_{s} (s_{1}, n) \\ : = n^{β (s - s_{1})} \sum_{m = 1}^{\infty} \frac{α m^{α s_{1} - 1}}{{(m^{α} + n^{β})}^{s}} < k_{s} (s_{1}) : = B {(s_{1}, s - s_{1})}^{} (n \in N), \end{array}

(15)

where, we set

O (\frac{1}{n^{β s_{1}}}) : = \frac{1}{k_{s} (s_{1})} \int_{0}^{\frac{1}{n^{β}}} \frac{u^{s_{1} - 1}}{{(1 + u)}^{s}} d u > 0^{} (n \in N) .

By using H

\ddot{o}

lder’s inequality (ref. [25]), we find

\begin{array}{l} I_{λ + 1} = \sum_{n = 1}^{\infty} \sum_{m = 1}^{\infty} \frac{1}{{(m^{α} + n^{β})}^{λ + 2}} [\frac{m^{α (- λ {}_{1}) / q} {(β n^{β - 1})}^{1 / p} m^{α - 1}}{n^{β (1 - λ_{2}) / p} {(α m^{α - 1})}^{1 / q}} A_{m}] [\frac{n^{β (1 - λ_{2}) / p} {(α m^{α - 1})}^{1 / q}}{m^{α (- λ {}_{1}) / q} {(β n^{β - 1})}^{1 / p}} b_{n}] \\ \leq {[\sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{β m^{p (α - 1)}}{{(m^{α} + n^{β})}^{λ + 1}} \frac{m^{α (- λ {}_{1}) (p - 1)} n^{β - 1} A_{m}^{p}}{n^{β (1 - λ_{2})} {(α m^{α - 1})}^{p - 1}}]}^{\frac{1}{p}} \\ \times {[\sum_{n = 1}^{\infty} \sum_{m = 1}^{\infty} \frac{α}{(m^{α} + n^{β}) 1} \frac{n^{β (1 - λ_{2}) (q - 1)} m^{α - 1} b_{n}^{q}}{m^{α (- λ {}_{1})} {(β n^{β - 1})}^{q - 1}}]}^{\frac{1}{q}} \\ = {(\frac{1}{β} \sum_{m = 1}^{\infty} ϖ_{λ + 1} (λ_{2}, m) m^{- p α {\hat{λ}}_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} \\ \times {(\frac{1}{α} \sum_{n = 1}^{\infty} ω_{λ + 1} (λ {}_{1}+ 1, n) n^{q (1 - β {\hat{λ}}_{2}) - 1} b_{n}^{q})}^{\frac{1}{q}} . \end{array}

Then by Inequalities (13) and (15) (for

s = λ + 1, s_{1} = λ_{1} + 1, s_{2} = λ_{2}

), in view of Inequality (6), we have Inequality (14).

This proves the lemma. □

3. Main Results

In view of Lemma 1 and Lemma 3, we obtain the following main results:

Theorem 1.

We have an inequality as follows:

I : = \sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{a_{m} b_{n}}{{(m^{α} + n^{β})}^{λ}} < {(\frac{α}{β})}^{\frac{1}{p}} λ {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} \times {(\sum_{m = 1}^{\infty} m^{- p α {\hat{λ}}_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} {[\sum_{n = 1}^{\infty} n^{q (1 - β {\hat{λ}}_{2}) - 1} b_{n}^{q}]}^{\frac{1}{q}} .

(16)

In particular, for

λ_{1} + λ_{2} = λ

, we have

0 < \sum_{m = 1}^{\infty} m^{- p α λ_{1} - 1} A_{m}^{p} < \infty, 0 < \sum_{n = 1}^{\infty} n^{q (1 - β λ_{2}) - 1} b_{n}^{q} < \infty,

(17)

and the following inequality:

\sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{a_{m} b_{n}}{{(m^{α} + n^{β})}^{λ}} < {(\frac{α}{β})}^{\frac{1}{p}} λ B (λ_{1} + 1, λ_{2}) \times {(\sum_{m = 1}^{\infty} m^{- p α λ_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} {[\sum_{n = 1}^{\infty} n^{q (1 - β λ_{2}) - 1} b_{n}^{q}]}^{\frac{1}{q}} .

(18)

Proof.

In view of the following equality relate to the Gamma function:

\frac{1}{{(m^{α} + n^{β})}^{λ}} = \frac{1}{Γ (λ)} \int_{0}^{\infty} t^{λ - 1} e^{- (m^{α} + n^{β}) t} d t,

and Inequality (6), we obtain

\begin{array}{l} I & = \frac{1}{Γ (λ)} \sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} a_{m} b_{n} \int_{0}^{\infty} t^{λ - 1} e^{- (m^{α} + n^{β}) t} d t \\ = \frac{1}{Γ (λ)} \int_{0}^{\infty} t^{λ - 1} (\sum_{m = 1}^{\infty} e^{- m^{α} t} a_{m}) (\sum_{n = 1}^{\infty} e^{- n^{β} t} b_{n}) d t \\ \leq \frac{1}{Γ (λ)} \int_{0}^{\infty} t^{λ - 1} (t α \sum_{m = 1}^{\infty} e^{- m^{α} t} m^{α - 1} A_{m}) (\sum_{n = 1}^{\infty} e^{- n^{β} t} b_{n}) d t \\ = \frac{α}{Γ (λ)} \sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} m^{α - 1} A_{m} b_{n} \int_{0}^{\infty} t^{λ} e^{- (m^{α} + n^{β}) t} d t \\ = α \frac{Γ (λ + 1)}{Γ (λ)} \sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{m^{α - 1}}{{(m^{α} + n^{β})}^{λ + 1}} A_{m} b_{n} . \end{array}

Hence by Inequality (14), it follows that Inequality (16) is valid.

This proves the theorem. □

In the following two theorems, we give a few equivalent conditions of the best value related to multi parameters in Inequality (16).

Theorem 2.

Suppose that

λ \in (0, 5], λ_{1} \in (0, \frac{2}{α} - 1] \cap (0, λ), λ_{2} \in (0, \frac{2}{β}] \cap (0, λ) .

If

λ_{1} + λ_{2} = λ,

then the constant factor

{(\frac{α}{β})}^{\frac{1}{p}} λ

{(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}}

is the best possible in Inequality (16).

Proof.

Now, we prove that

{(\frac{α}{β})}^{\frac{1}{p}} λ B (λ_{1} + 1, λ_{2}) (= {(\frac{α}{β})}^{\frac{1}{p}} λ_{1} B (λ_{1}, λ_{2}))

is the best possible constant in Inequality (18).

For any

ε \in (0, \min {p λ_{1}, q λ_{2}})

, we put

{\tilde{a}}_{m} : = m^{α (λ_{1} - \frac{ε}{p}) - 1}, {\tilde{b}}_{n} : = n^{β (λ_{2} - \frac{ε}{q}) - 1}^{} (m, n \in N) .

Since

0 < λ_{1} - \frac{ε}{p} \leq \frac{2}{α} - 1, 0 < α (λ_{1} - \frac{ε}{p}) \leq 2 - α < 2,

in view of (2.2.24) (ref. [5]), we find

\begin{array}{l} {\tilde{A}}_{m} & : = \sum_{i = 1}^{m} {\tilde{a}}_{i} = \sum_{i = 1}^{m} i^{α (λ_{1} - \frac{ε}{p}) - 1} = \int_{1}^{m} t^{α (λ_{1} - \frac{ε}{p}) - 1} d t \\ + \frac{1}{2} [m^{α (λ_{1} - \frac{ε}{p}) - 1} + 1] + \frac{ε_{0}}{12} [α (λ_{1} - \frac{ε}{p}) - 1] [m^{α (λ_{1} - \frac{ε}{p}) - 2} - 1] \\ = \frac{1}{α (λ_{1} - \frac{ε}{p})} (m^{α (λ_{1} - \frac{ε}{p})} + c_{1} + O {}_{1}{(m^{α (λ_{1} - \frac{ε}{p}) - 1})}) \end{array} \leq \frac{m^{α (λ_{1} - \frac{ε}{p})}}{α (λ_{1} - \frac{ε}{p})} {(1 + | c_{1} | m^{- α (λ_{1} - \frac{ε}{p})} + | O {}_{1}{(m^{- 1})} |)}^{} (ε_{0} \in (0, 1); m \in N, m \to \infty)

(

c_{1}

is a constant). We observe that

{\tilde{A}}_{m} = o (e^{t m^{α}}) {(t > 0; m \to \infty)}

.

If there exists a positive constant

M (\leq {(\frac{α}{β})}^{\frac{1}{p}} λ B (λ_{1} + 1, λ_{2}))

, such that Inequality (18) is value as we replace

{(\frac{α}{β})}^{\frac{1}{p}} λ B (λ_{1} + 1, λ_{2})

by

M

. Then, substitution of

a_{m} = {\tilde{a}}_{m},

b_{n} = {\tilde{b}}_{n}

and

A_{m} = {\tilde{A}}_{m}

in Inequality (18), we find

\tilde{I} : = \sum_{n = 1}^{\infty} \sum_{m = 1}^{\infty} \frac{{\tilde{a}}_{m} {\tilde{b}}_{n}}{{(m^{α} + n^{β})}^{λ}} < M {(\sum_{m = 1}^{\infty} m^{- p α λ_{1} - 1} {\tilde{A}}_{m}^{p})}^{\frac{1}{p}} {[\sum_{n = 1}^{\infty} n^{q (1 - β λ_{2}) - 1} {\tilde{b}}_{n}^{q}]}^{\frac{1}{q}} .

(19)

Setting

a (x) \to 0^{} (x \to \infty),

we find

\lim_{x \to \infty} \frac{{(1 + a (x))}^{p} - 1}{a (x)} = \lim_{x \to \infty} \frac{p {(1 + a (x))}^{p - 1} a' (x)}{a' (x)} = \lim_{x \to \infty} p {(1 + a (x))}^{p - 1} = p,

namely,

{(1 + a (x))}^{p} = 1 + O {(a (x))}^{} (x \to \infty) .

Then we obtain

\begin{array}{l} (1 + | c_{1} | m^{- α (λ_{1} - \frac{ε}{p})} + | O_{1} (m^{- 1}) |) p = 1 + O (| c_{1} | m^{- α (λ_{1} - \frac{ε}{p})} + | O^{1} (m^{- 1}) |) \\ = 1 + O (m^{- α (λ_{1} - \frac{ε}{p})}) + \tilde{O} (m^{- 1}) (m \in N; m \to \infty) . \end{array}

Hence, we have

\begin{array}{l} \sum_{m = 1}^{\infty} m^{- p α λ_{1} - 1} {\tilde{A}}_{m}^{p} & \leq {[\frac{1}{α (λ_{1} - \frac{ε}{p})}]}^{p} \sum_{m = 1}^{\infty} m^{- α ε - 1} {(1 + | c_{1} | m^{- α (λ_{1} - \frac{ε}{p})} + | O {}_{1}{(m^{- 1})} |)}^{p} \\ = {[\frac{1}{α (λ_{1} - \frac{ε}{p})}]}^{p} \sum_{m = 1}^{\infty} m^{- α ε - 1} (1 + O (m^{- α (λ_{1} - \frac{ε}{p})}) + \tilde{O} (m^{- 1})) \\ = {[\frac{1}{α (λ_{1} - \frac{ε}{p})}]}^{p} [\sum_{m = 1}^{\infty} m^{- α ε - 1} + \sum_{m = 1}^{\infty} (O (m^{- α (λ_{1} + \frac{ε}{q}) - 1} + \tilde{O} (m^{- α ε - 2}))] \\ = {[\frac{1}{α (λ_{1} - \frac{ε}{p})}]}^{p} (\sum_{m = 2}^{\infty} m^{- α ε - 1} + O_{1} (1)) \\ < {[\frac{1}{α (λ_{1} - \frac{ε}{p})}]}^{p} (\int_{1}^{\infty} x^{- α ε - 1} d x + O_{1} (1)) = {[\frac{1}{α (λ_{1} - \frac{ε}{p})}]}^{p} (\frac{1}{α ε} + O_{1} (1)) . \end{array}

We still find that

\sum_{n = 1}^{\infty} n^{q (1 - β λ_{2}) - 1} {\tilde{b}}_{n}^{q} = 1 + \sum_{n = 2}^{\infty} n^{- β ε - 1} < 1 + \int_{1}^{\infty} y^{- β ε - 1} d y = 1 + \frac{1}{β ε} .

Then, we obtain

\tilde{I} < \frac{M}{ε} \frac{1}{α (λ_{1} - \frac{ε}{p})} {(\frac{1}{α} + ε O_{1} (1))}^{\frac{1}{p}} {(\frac{1}{β} + ε)}^{\frac{1}{q}} .

In view of Inequality (15) (for

s = λ \in (0, 5], s_{1} = λ_{1} - \frac{ε}{p} \in (0, \frac{2}{α} - 1] \cap (0, λ)

), we find

\begin{array}{l} \tilde{I} = \sum_{n = 1}^{\infty} \sum_{m = 1}^{\infty} \frac{m^{α (λ_{1} - \frac{ε}{p}) - 1}}{{(m^{α} + n^{β})}^{λ}} n^{β (λ_{2} - \frac{ε}{q}) - 1} = \frac{1}{α} \sum_{n = 1}^{\infty} n^{- β ε - 1} [n^{β (λ_{2} + \frac{ε}{q})} \sum_{m = 1}^{\infty} \frac{α m^{α (λ_{1} - \frac{ε}{p}) - 1}}{{(m^{α} + n^{β})}^{λ}}] \\ \overset{}{} \geq \frac{1}{α} k_{λ} (λ_{1} - \frac{ε}{p}) \sum_{n = 1}^{\infty} n^{- β ε - 1} (1 - O (\frac{1}{n^{β (λ_{1} - \frac{ε}{p})}})) \\ \overset{}{} = \frac{1}{α} k_{λ} (λ_{1} - \frac{ε}{p}) (\sum_{n = 1}^{\infty} n^{- β ε - 1} - \sum_{n = 1}^{\infty} O (\frac{1}{n^{β (λ_{1} + \frac{ε}{q}) + 1}})) \\ \overset{}{} > \frac{1}{α} k_{λ} (λ_{1} - \frac{ε}{p}) (\int_{1}^{\infty} y^{- β ε - 1} d y - O_{2} (1)) \\ \overset{}{} = \frac{1}{α ε} B (λ_{1} - \frac{ε}{p}, λ_{2} + \frac{ε}{p}) (\frac{1}{β} - ε O_{2} (1)) . \end{array}

Based on the above results, we have

\frac{1}{α} B (λ_{1} - \frac{ε}{p}, λ_{2} + \frac{ε}{p}) (\frac{1}{β} - ε O_{2} (1)) < ε \tilde{I} < M \frac{1}{α (λ_{1} - \frac{ε}{p})} {(\frac{1}{α} + ε O_{1} (1))}^{\frac{1}{p}} {(\frac{1}{β} + ε O_{2} (1))}^{\frac{1}{q}} .

Setting

ε \to 0^{+}

, based on the continuity of the Beta function, we find

\frac{1}{α β} B (λ_{1}, λ_{2}) \leq M \frac{1}{α λ_{1}} {(\frac{1}{α})}^{\frac{1}{p}} {(\frac{1}{β})}^{\frac{1}{q}},

namely,

{(\frac{α}{β})}^{\frac{1}{p}} λ B (λ_{1} + 1, λ_{2}) = {(\frac{α}{β})}^{\frac{1}{p}} λ_{1} B (λ_{1}, λ_{2}) \leq M .

Hence, the constant factor

M = {(\frac{α}{β})}^{\frac{1}{p}} λ B (λ_{1} + 1, λ_{2})

in Inequality (18) is the best possible.

The theorem is proved. □

Theorem 3.

Assume that

λ \in (0, 5], λ_{1} \in (0, \frac{2}{α} - 1] \cap (0, λ), λ_{2} \in (0, \frac{2}{β}] \cap (0, λ) .

If the constant factor

{(\frac{α}{β})}^{\frac{1}{p}} λ

{(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}}

in Inequality (16) is the best value, then for

λ - λ_{1} - λ_{2} \leq \min {p (\frac{2}{α} - 1 - λ_{1}), q (\frac{2}{β} - λ_{2})},

we have

λ_{1} + λ_{2} = λ .

Proof.

For

{\hat{λ}}_{1} = \frac{λ - λ_{2}}{p} + \frac{λ_{1}}{q} = \frac{λ - λ_{1} - λ_{2}}{p} + λ_{1}, {\hat{λ}}_{2} = \frac{λ - λ_{1}}{q} + \frac{λ_{2}}{p} = \frac{λ - λ_{1} - λ_{2}}{q} + λ_{2}

, we find

{\hat{λ}}_{1} + {\hat{λ}}_{2} = λ,

and

0 < {\hat{λ}}_{1}, {\hat{λ}}_{2} < \frac{λ}{p} + \frac{λ}{q} = λ .

For

λ - λ_{1} - λ_{2} \leq p (\frac{2}{α} - 1 - λ_{1}),

we have

{\hat{λ}}_{1} \leq \frac{2}{α} - 1

; for

λ - λ_{1} - λ_{2}

\leq q (\frac{2}{β} - λ_{2}),

we find

{\hat{λ}}_{2} \leq \frac{2}{β}

. For

λ_{i} = {\hat{λ}}_{i}^{} (i = 1, 2)

in Inequality (18), we obtain

\sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{a_{m} b_{n}}{{(m^{α} + n^{β})}^{λ}} < {(\frac{α}{β})}^{\frac{1}{p}} λ B ({\hat{λ}}_{1} + 1, {\hat{λ}}_{2}) \times {(\sum_{m = 1}^{\infty} m^{- p α {\hat{λ}}_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} {[\sum_{n = 1}^{\infty} n^{q (1 - β {\hat{λ}}_{2}) - 1} b_{n}^{q}]}^{\frac{1}{q}} .

(20)

In view of H

\ddot{o}

lder’s inequality (ref. [25]), we obtain

\begin{array}{l} ^{} B ({\hat{λ}}_{1} + 1, {\hat{λ}}_{2}) = k_{λ + 1} (\frac{λ - λ_{2}}{p} + \frac{λ_{1}}{q} + 1) \\ = \int_{0}^{\infty} \frac{1}{{(1 + u)}^{λ + 1}} u^{\frac{λ - λ_{2}}{p} + \frac{λ_{1}}{q}} d u = \int_{0}^{\infty} \frac{1}{{(1 + u)}^{λ + 1}} (u^{\frac{λ - λ_{2}}{p}}) (u^{\frac{λ_{1}}{q}}) d u \\ \geq {[\int_{0}^{\infty} \frac{1}{{(1 + u)}^{λ + 1}} u^{λ - λ_{2}} d u]}^{\frac{1}{p}} {[\int_{0}^{\infty} \frac{1}{{(1 + u)}^{λ + 1}} u^{λ_{1}} d u]}^{\frac{1}{q}} \\ = {[\int_{0}^{\infty} \frac{1}{{(1 + v)}^{λ + 1}} v^{λ_{2} - 1} d v]}^{\frac{1}{p}} {[\int_{0}^{\infty} \frac{1}{{(1 + u)}^{λ + 1}} u^{λ_{1}} d u]}^{\frac{1}{q}} \\ = {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} . \end{array}

(21)

If constant factor

{(\frac{α}{β})}^{\frac{1}{p}} λ

{(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}}

in Inequality (16) is the best possible, then by Inequalities (16) and (20), it follows that

{(\frac{α}{β})}^{\frac{1}{p}} λ {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} \leq {(\frac{α}{β})}^{\frac{1}{p}} λ B ({\hat{λ}}_{1} + 1, {\hat{λ}}_{2})^{} (\in R_{+}),

which means that

B ({\hat{λ}}_{1} + 1, {\hat{λ}}_{2}) \geq {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} .

(22)

Then by Inequality (21), we have

B ({\hat{λ}}_{1} + 1, {\hat{λ}}_{2}) = {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}};

Hence, Inequality (21) keeps the form of equality.

Since Inequality (21) keeps the form of equality, there exist constants

A

and

B

, such that they are not both zero and (ref.)

A u^{λ - λ_{2}} = B u^{λ_{1}}^{} a . e .

in

R_{+} .

Assuming that

A \neq 0

, we have

u^{λ - λ_{2} - λ_{1}} = {\frac{B}{A}}^{} a . e .

in

R_{+},

and

λ - λ_{2} - λ_{1} = 0

. Hence, we have

λ_{1} + λ_{2} = λ

.

This proves the theorem. □

Remark 1.

Since the constant in Inequality (18) is the best value, inequality Inequality (18) is a refinement of the inequalities in [16].

4. Equivalent Inequalities and Operator Expressions

Theorem 4.

The following inequality is valid equivalent to Inequality (16):

J : = {\sum_{n = 1}^{\infty} n^{p β {\hat{λ}}_{2} - 1} {[\sum_{m = 1}^{\infty} \frac{a_{m}}{{(m^{α} + n^{β})}^{λ}}]}^{p}}^{\frac{1}{p}} < {(\frac{α}{β})}^{\frac{1}{p}} λ {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} {(\sum_{m = 1}^{\infty} m^{- p α {\hat{λ}}_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} .

(23)

For

λ_{1} + λ_{2} = λ

, the following inequality is valid, which is equivalent to Inequality (18):

{\sum_{n = 1}^{\infty} n^{p β λ_{2} - 1} {[\sum_{m = 1}^{\infty} \frac{a_{m}}{{(m^{α} + n^{β})}^{λ}}]}^{p}}^{\frac{1}{p}} < {(\frac{α}{β})}^{\frac{1}{p}} λ B (λ_{1} + 1, λ_{2}) {(\sum_{m = 1}^{\infty} m^{- p α λ_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} .

(24)

Proof.

Assuming that Inequality (23) is value, by H

\ddot{o}

lder’s inequality, we find

I = \sum_{n = 1}^{\infty} [n^{- \frac{1}{p} + β {\hat{λ}}_{2}} \sum_{m = 1}^{\infty} \frac{a_{m}}{{(m^{α} + n^{β})}^{λ}}] (n^{\frac{1}{p} - β {\hat{λ}}_{2}} b_{n}) \leq J {[\sum_{n = 1}^{\infty} n^{q (1 - β {\hat{λ}}_{2}) - 1} b_{n}^{q}]}^{\frac{1}{q}} .

(25)

By Inequalities (16) and (23) follows. Assuming that Inequality (16) is valid, setting

b_{n} : = n^{p β {\hat{λ}}_{2} - 1} {[\sum_{m = 1}^{\infty} \frac{a_{m}}{{(m^{α} + n^{β})}^{λ}}]}^{p - 1}, n \in N,

it follows that

\sum_{n = 1}^{\infty} n^{q (1 - β {\hat{λ}}_{2}) - 1} b_{n}^{q} = J^{p} = I .

(26)

If

J = \infty

, then it is impossible that makes Inequality (23) value, namely,

J < \infty

; if

J = 0

, then Inequality (23) is naturally valid. Assume that

0 < J < \infty .

In view of Inequality (16), we find

J^{p} = I < {(\frac{α}{β})}^{\frac{1}{p}} λ {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} {(\sum_{m = 1}^{\infty} m^{- p α {\hat{λ}}_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} J^{p - 1},

J < {(\frac{α}{β})}^{\frac{1}{p}} λ {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} {(\sum_{m = 1}^{\infty} m^{- p α {\hat{λ}}_{1} - 1} A_{m}^{p})}^{\frac{1}{p}} .

Hence, we have Inequality (23), which is equivalent to Inequality (16).

This proves the theorem. □

By the equivalency of Inequalities (16) and (23), we have

Theorem 5.

Assume that

λ \in (0, 5], λ_{1} \in (0, \frac{2}{α} - 1] \cap (0, λ), λ_{2} \in (0, \frac{2}{β}] \cap (0, λ) .

If

λ_{1} + λ_{2} = λ

, then

{(\frac{α}{β})}^{\frac{1}{p}} λ

{(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}}

is the best possible constant factor in Inequality (23). If the same constant factor in Inequality (23) is the best possible, then for

λ - λ_{1} - λ_{2} \leq \min {p (\frac{2}{α} - 1 - λ_{1}), q (\frac{2}{β} - λ_{2})}

, we have

λ_{1} + λ_{2} = λ

.

Proof.

We prove that the following constant factor

{(\frac{α}{β})}^{\frac{1}{p}} λ B (λ_{1} + 1, λ_{21}) (= {(\frac{α}{β})}^{\frac{1}{p}} λ_{1} B (λ_{1}, λ_{21}))

in Inequality (24) is the best possible. Otherwise, we would reach a contradiction that the same constant in Inequality (18) is not the best value by using Inequality (25) (for

λ_{1} + λ_{2} = λ

).

If the constant in Inequality (23) is the best value, then the same constant in Inequality (16) is still the best value. Otherwise, by Inequality (26) (for

λ_{1} + λ_{2} = λ

), we would reach a contradiction that the same constant factor in Inequality (24) is not the best value.

This proves theorem. □

We indicate the functions as follows:

ϕ (m) : = m^{- p α {\hat{λ}}_{1} - 1},

ψ (n) : = n^{q (1 - β {\hat{λ}}_{2}) - 1},

wherefrom,

ψ^{1 - p} (n) : = n^{p β {\hat{λ}}_{2} - 1}^{} (m, n \in N) .

We still indicate some linear spaces as follows:

\begin{array}{l} l_{q, ψ} : = {b = {b_{n}}_{n = 1}^{\infty}; | | b | |_{q, ψ} = {(\sum_{n = 1}^{\infty} ψ (n) | b_{n} |^{q})}^{\frac{1}{q}} < \infty}, \\ l_{p, ψ^{1 - p}} : = {c = {c_{n}}_{n = 1}^{\infty}; | | b | |_{p, ψ^{1 - p}} = {(\sum_{n = 1}^{\infty} ψ^{1 - p} (n) | c_{n} |^{p})}^{\frac{1}{p}} < \infty}, \\ l_{p, ϕ} : = {d = {d_{m}}_{m = 1}^{\infty}; | | d | |_{p, ϕ} = {(\sum_{m = 1}^{\infty} ϕ (m) | d_{m} |^{p})}^{\frac{1}{p}} < \infty}, \\ B : = {a = {a_{m}}_{m = 1}^{\infty}; A = {A_{m}}_{m = 1}^{\infty} \in l_{p, ϕ}}^{} (A_{m} = \sum_{i = 1}^{m} a {}_{i}) . \end{array}

For

a = {a_{m}}_{m = 1}^{\infty} (> 0) \in B

, setting

c = {c_{n}}_{n = 1}^{\infty} :

c_{n} : = \sum_{m = 1}^{\infty} \frac{a_{m}}{{(m^{α} + n^{β})}^{λ}}

, inequality (23) can be rewritten as:

| | c | |_{p, ψ^{1 - p}} < {(\frac{α}{β})}^{\frac{1}{p}} λ {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} | | A | |_{p, ϕ} < \infty,

namely,

c \in l_{p, ψ^{1 - p}}

.

Definition 1.

Define an operator

T : B \to l_{p, ψ^{1 - p}}

as follows: For any

a \in B,

there exists a unique representation

c = T a \in l_{p, ψ^{1 - p}}

, such that for any

n \in N,

we have

T a (n) = c_{n}

. Define the formal inner product of

T a

and

b \in l_{q, ψ}

and the norm of

T

as follows:

(T a, b) : = \sum_{n = 1}^{\infty} b_{n} \sum_{m = 1}^{\infty} \frac{a_{m n}}{{(m^{α} + n^{β})}^{λ}},

| | T | | : = \sup_{a (\neq 0) \in B} \frac{| | T a | |_{p, ψ^{1 - p}}}{| | A | |_{p, ϕ}} .

By using Theorems 2–4, we have

Theorem 6.

Assume that

a^{} (> 0)

\in B, b^{} (> 0) \in l_{q, ψ}, | | b | |_{q, ψ} > 0 .

We have the following equivalent inequalities:

(T a, b) < {(\frac{α}{β})}^{\frac{1}{p}} λ {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} | | A | |_{p, ϕ} | | b | |_{q, ψ},

(27)

| | T a | |_{p, ψ^{1 - p}} < {(\frac{α}{β})}^{\frac{1}{p}} λ {(k_{λ + 1}^{} (λ_{2}))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1} + 1))}^{\frac{1}{q}} | | A | |_{p, ϕ} .

(28)

Moreover, assume that

λ \in (0, 5], λ_{1} \in (0, \frac{2}{α} - 1] \cap (0, λ), λ_{2} \in (0, \frac{2}{β}] \cap (0, λ) .

If

λ_{1} + λ_{2} = λ

, then the constant factor

{(\frac{α}{β})}^{\frac{1}{p}}

λ {(k_{λ + 1}^{} (λ_{2} + 1))}^{\frac{1}{p}} {(k_{λ + 1}^{} (λ_{1}))}^{\frac{1}{q}}

in Inequality (27) and (28) is the best possible, namely,

| | T | | =

{(\frac{α}{β})}^{\frac{1}{p}} λ_{1}

B (λ_{1}, λ_{21})

. On the other hand, if the constant factor in Inequality (26) (or Inequality (27)) is the best possible, then for

λ - λ_{1} - λ_{2} \leq \min {p (\frac{2}{α} - 1 - λ_{1}), q (\frac{2}{β} - λ_{2})},

we have

λ_{1} + λ_{2} = λ

.

Remark 2.

(i) For

λ = 1, λ_{1} = \frac{1}{q}, λ_{2} = \frac{1}{p}

in Inequalities (18) and (24), we have the equivalent inequalities as follows:

\sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{a_{m} b_{n}}{m^{α} + n^{β}} < {(\frac{α}{β})}^{\frac{1}{p}} \frac{π}{q \sin (π / p)} \times {[\sum_{m = 1}^{\infty} m^{(1 - p) α - 1} A_{m}^{p}]}^{\frac{1}{p}} {[\sum_{n = 1}^{\infty} n^{(q - 1) (1 - β)} b_{n}^{q}]}^{\frac{1}{q}},

(29)

{[\sum_{n = 1}^{\infty} n^{β - 1} {(\sum_{m = 1}^{\infty} \frac{a_{m}}{m^{α} + n^{β}})}^{p}]}^{\frac{1}{p}} < {(\frac{α}{β})}^{\frac{1}{p}} \frac{π}{q \sin (π / p)} {[\sum_{m = 1}^{\infty} m^{(1 - p) α - 1} A_{m}^{p}]}^{\frac{1}{p}} .

(30)

(ii) For

λ = 1, λ_{1} = \frac{1}{p}, λ_{2} = \frac{1}{q}

in Inequalities (18) and (24), the equivalent inequalities are valid as follows:

\sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{a_{m} b_{n}}{m^{α} + n^{β}} < {(\frac{α}{β})}^{\frac{1}{p}} \frac{π}{p \sin (π / p)} \times {(\sum_{m = 1}^{\infty} m^{- α - 1} A_{m}^{p})}^{\frac{1}{p}} {(\sum_{n = 1}^{\infty} n^{q - β - 1} b_{n}^{q})}^{\frac{1}{q}},

(31)

{[\sum_{n = 1}^{\infty} n^{(p - 1) β - 1} {(\sum_{m = 1}^{\infty} \frac{a_{m}}{m^{α} + n^{β}})}^{p}]}^{\frac{1}{p}} < {(\frac{α}{β})}^{\frac{1}{p}} \frac{π}{p \sin (π / p)} {(\sum_{m = 1}^{\infty} m^{- α - 1} A_{m}^{p})}^{\frac{1}{p}} .

(32)

(iii) when

p = q = 2,

both Inequalities (29) and (31) deduce to

\sum_{m = 1}^{\infty} \sum_{n = 1}^{\infty} \frac{a_{m} b_{n}}{m^{α} + n^{β}} < {(\frac{α}{β})}^{\frac{1}{2}} \frac{π}{2} {(\sum_{m = 1}^{\infty} m^{- α - 1} A_{m}^{2} \sum_{n = 1}^{\infty} n^{1 - β} b_{n}^{2})}^{\frac{1}{2}},

(33)

and both Inequalities (30) and (32) deduce to the following inequality equivalent to Inequality (33):

{[\sum_{n = 1}^{\infty} n^{β - 1} {(\sum_{m = 1}^{\infty} \frac{a_{m}}{m^{α} + n^{β}})}^{2}]}^{\frac{1}{2}} < {(\frac{α}{β})}^{\frac{1}{2}} \frac{π}{2} {(\sum_{m = 1}^{\infty} m^{- α - 1} A_{m}^{2})}^{\frac{1}{2}}

(34)

We observe that the above constants are all the best value.

5. Conclusions

In this article, by means of the idea of introduced parameters and the techniques of real analysis, using Euler-Maclaurin summation formula as well as the mid-value theorem, we give a new extended Hardy-Hilbert’s inequality with the power functions as the internal variables involving one partial sums in Theorem 1, which is a refinement of a published inequality. We provide a few equivalent conditions of the best possible constant related to multi parameters in Theorem. 2 and 3. As applications, the equivalent inequalities are fond in Theorem. 4 and 5, and the operator expressions as well as a few inequalities with the particular parameters are considered in Theorem 5 and Remark 2.

Author Contributions

B.Y. carried out the mathematical studies, participated in the sequence alignment and drafted the manuscript. A.W. participated in the design of the study and performed the numerical analysis. All authors have read and agreed to the published version of the manuscript.

Funding

This work is supported by the National Science Foundation of China (No. 61772140), and the 2022 Guangdong Provincial Education Science Planning Project (Higher Education Project) (2022GXJK290).

Data Availability Statement

We declare that the data and material in this paper can be used publicly.

Acknowledgments

The authors thank the referee for his useful proposal to revise the paper.

Conflicts of Interest

The authors declare that they have no conflict of interest.

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Wang, A.; Yang, B. An Extended Hilbert-Type Inequality with Two Internal Variables Involving One Partial Sums. Axioms 2023, 12, 871. https://doi.org/10.3390/axioms12090871

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Wang A, Yang B. An Extended Hilbert-Type Inequality with Two Internal Variables Involving One Partial Sums. Axioms. 2023; 12(9):871. https://doi.org/10.3390/axioms12090871

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Wang, Aizhen, and Bicheng Yang. 2023. "An Extended Hilbert-Type Inequality with Two Internal Variables Involving One Partial Sums" Axioms 12, no. 9: 871. https://doi.org/10.3390/axioms12090871

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An Extended Hilbert-Type Inequality with Two Internal Variables Involving One Partial Sums

Abstract

1. Introduction

2. Some Lemmas

3. Main Results

4. Equivalent Inequalities and Operator Expressions

5. Conclusions

Author Contributions

Funding

Data Availability Statement

Acknowledgments

Conflicts of Interest

References

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