The equivalent conditions for norm of a Hilbert-type integral operator with a combination kernel and its applications

IF 3.5 2区 数学 Q1 MATHEMATICS, APPLIED Applied Mathematics and Computation Pub Date : 2024-09-24 DOI:10.1016/j.amc.2024.129076
Qiong Liu
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引用次数: 0

Abstract

Introducing adaptation parameters σ,σ1, formal parameters λi(i=1,2,3,4),κ,τ, and type parameters μ,ν, the integration operator is defined as T:Lpp(1μσˆ)1(R+)Lppνσˆ1(R+), Tf(y)=R+eλ1xμyν+κeλ2xμyνeλ3xμyν+τeλ4xμyνf(x)dx,yR+. Using the weight function method, a general Hilbert-type integral inequality is obtained, thereby proving the boundedness of the operator. The constant factor of the general Hilbert-type inequality is the best possible if and only if the adaptation parameters satisfy σ=σ1. From this, the formula for calculating the operator norm is obtained. In terms of application, some results from the references have been consolidated by discussing the combination of formal parameters and type parameters, and many new operator inequalities of different types and forms have been derived.
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具有组合核的希尔伯特型积分算子的规范等价条件及其应用
引入适应参数 σ,σ1、形式参数 λi(i=1,2,3,4),κ,τ 和类型参数 μ,ν,积分算子定义为 T:Lpp(1-μσˆ)-1(R+)→Lppνσˆ-1(R+),Tf(y)=∫R+eλ1xμyν+κe-λ2xμyνeλ3xμyν+τe-λ4xμyνf(x)dx,y∈R+。利用权函数方法,可以得到一般希尔伯特型积分不等式,从而证明算子的有界性。只有当且仅当适应参数满足 σ=σ1 时,一般希尔伯特型不等式的常数因子才是最好的。由此可以得到算子规范的计算公式。在应用方面,通过讨论形式参数和类型参数的结合,巩固了参考文献中的一些成果,并推导出许多不同类型和形式的新算子不等式。
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来源期刊
CiteScore
7.90
自引率
10.00%
发文量
755
审稿时长
36 days
期刊介绍: Applied Mathematics and Computation addresses work at the interface between applied mathematics, numerical computation, and applications of systems – oriented ideas to the physical, biological, social, and behavioral sciences, and emphasizes papers of a computational nature focusing on new algorithms, their analysis and numerical results. In addition to presenting research papers, Applied Mathematics and Computation publishes review articles and single–topics issues.
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