MASS
发表于 2025-3-21 19:51:35
书目名称Eigenvalue Distribution of Compact Operators影响因子(影响力)<br> http://figure.impactfactor.cn/if/?ISSN=BK0303217<br><br> <br><br>书目名称Eigenvalue Distribution of Compact Operators影响因子(影响力)学科排名<br> http://figure.impactfactor.cn/ifr/?ISSN=BK0303217<br><br> <br><br>书目名称Eigenvalue Distribution of Compact Operators网络公开度<br> http://figure.impactfactor.cn/at/?ISSN=BK0303217<br><br> <br><br>书目名称Eigenvalue Distribution of Compact Operators网络公开度学科排名<br> http://figure.impactfactor.cn/atr/?ISSN=BK0303217<br><br> <br><br>书目名称Eigenvalue Distribution of Compact Operators被引频次<br> http://figure.impactfactor.cn/tc/?ISSN=BK0303217<br><br> <br><br>书目名称Eigenvalue Distribution of Compact Operators被引频次学科排名<br> http://figure.impactfactor.cn/tcr/?ISSN=BK0303217<br><br> <br><br>书目名称Eigenvalue Distribution of Compact Operators年度引用<br> http://figure.impactfactor.cn/ii/?ISSN=BK0303217<br><br> <br><br>书目名称Eigenvalue Distribution of Compact Operators年度引用学科排名<br> http://figure.impactfactor.cn/iir/?ISSN=BK0303217<br><br> <br><br>书目名称Eigenvalue Distribution of Compact Operators读者反馈<br> http://figure.impactfactor.cn/5y/?ISSN=BK0303217<br><br> <br><br>书目名称Eigenvalue Distribution of Compact Operators读者反馈学科排名<br> http://figure.impactfactor.cn/5yr/?ISSN=BK0303217<br><br> <br><br>
狗舍
发表于 2025-3-21 20:46:07
Eigenvalues of Operators on Banach Spaces,ators have p-th power summable eigenvalues. It is thus natural to ask: What is the optimal order of summability of the eigenvalues of the above classes of operators on Banach spaces? This is the main topic of this chapter: we extend Weyl’s inequality to the above operator ideals on Banach spaces.
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发表于 2025-3-22 02:41:05
A. S. Markov,V. A. Romanov,N. B. Shaykhonmmability conditions. Further results in this direction were achieved and presented by Gohberg-Krein . Lately much more precise estimates were obtained by Birman-Solomjak who in their survey also treat the case of weighted kernel operators on unbounded domains.
巨大没有
发表于 2025-3-22 08:35:11
,Dizionario d’ingegneria naturalistica,an A denotes the closed linear hull of A in X. The topological dual of X is denoted X*(= L(X, K)) and the duality pairing written <x*,x> or x*(x) where x ∈ X, x* ∈ X*. The dual of an operator T is denoted by T*.
大方一点
发表于 2025-3-22 10:26:12
Dictionary of Statuses within EU Lawto prove general (upper) estimates for the eigenvalues of the operators belonging to such ideals. These abstract results are applied to integral operators to derive some non-classical results. The Banach space setting is essential: several applications, e.g. to Hille-Tamarkin kernels, have not been proved by the classical Hilbert space methods.
meretricious
发表于 2025-3-22 15:11:37
Introduction,mmability conditions. Further results in this direction were achieved and presented by Gohberg-Krein . Lately much more precise estimates were obtained by Birman-Solomjak who in their survey also treat the case of weighted kernel operators on unbounded domains.
meretricious
发表于 2025-3-22 20:18:14
Notations and Conventions,an A denotes the closed linear hull of A in X. The topological dual of X is denoted X*(= L(X, K)) and the duality pairing written <x*,x> or x*(x) where x ∈ X, x* ∈ X*. The dual of an operator T is denoted by T*.
CUR
发表于 2025-3-22 22:12:30
Banach Spaces and Operators,to prove general (upper) estimates for the eigenvalues of the operators belonging to such ideals. These abstract results are applied to integral operators to derive some non-classical results. The Banach space setting is essential: several applications, e.g. to Hille-Tamarkin kernels, have not been proved by the classical Hilbert space methods.
Lacunar-Stroke
发表于 2025-3-23 04:36:36
https://doi.org/10.1007/978-3-662-32571-1We apply the results on the eigenvalues of abstract operators on Banach spaces to determine the asymptotic distribution of the eigenvalues of integral operators T in function spaces Z.
挥舞
发表于 2025-3-23 08:58:07
Abbreviated New Drug ApplicationIn this chapter we consider some applications of the results about eigenvalues of Riesz operators (of chapter 2) to problems in the theory of Banach spaces. The question of the existence of a “trace” of an infinite-dimensional Riesz operator T ∈ L(X) is one of them.