半交叉积上的紧乘算子

Pub Date : 2021-10-14 DOI:10.4064/sm211107-22-7
G. Andreolas, M. Anoussis, C. Magiatis
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引用次数: 2

摘要

设A是一个Banach代数,且A,b∈A。由Ma,b(x) = axb给出的映射Ma,b: A→A称为乘法算子。自从1964年Vala发表了他的著作“紧算子的紧集”[15]以来,紧乘法算子的性质就得到了研究。设X是赋范空间,B(X)是所有从X到X的有界线性映射的代数。Vala证明了非零乘法算子Ma,b: b (X)→b (X)是紧的当且仅当算子a,b∈b (X)都是紧的。同样,在[16]中,如果映射x7→axa是紧的,则Vala定义了范代数的元素a是紧的。这个概念使得研究抽象赋范代数元素的紧性成为可能。[17]中的Ylinen研究了抽象C*-代数的紧致元素,并证明了a是C-代数a的紧致元素,当且仅当a在Hilbert空间H上存在一个等距*表示π,使得算子π(a)紧致。紧性问题也在更一般的初等算子框架中被考虑过。一个映射Φ: A→A,其中A是一个Banach代数,如果Φ =∑m i=1 Mai,bi对于某些ai,bi∈A, i=1,…,则称为初等映射Φ: A→A。, m。Fong和Sourour证明了一个初等算子Φ: B(H)→B(H),其中B(H)是Hilbert空间H上有界线性算子的代数,当且仅当存在紧算子ci, di∈B(H), i = 1,…,m使得Φ =∑m i= 1mci,di[5]。这个结果由Mathieu在素数C*-代数[9]上推广,后来由Timoney在一般C*-代数[14]上推广。Akemann和Wright描述了B(H)上的弱紧乘法算子,其中H是Hilbert空间。Saksman and Tylli[12,13]和Johnson and Schechtman[10]研究了Banach空间下乘法算子的弱紧性。此外,Lindström、Saksman and Tylli[8]和Mathieu and Tradacete[10]研究了严格奇异乘法算子。Andreolas和Anoussis在[2]中研究了巢代数(一类非自伴算子代数)上乘法算子的紧性。在
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Compact multiplication operators on semicrossed products
Let A be a Banach algebra and a, b ∈ A. The map Ma,b : A → A given by Ma,b(x) = axb is called a multiplication operator. Properties of compact multiplication operators have been investigated since 1964 when Vala published his work “On compact sets of compact operators” [15]. Let X be a normed space and B(X ) the algebra of all bounded linear maps from X into X . Vala proved that a nonzero multiplication operator Ma,b : B(X ) → B(X ) is compact if and only if the operators a, b ∈ B(X ) are both compact. Also, in [16] Vala defines an element a of a normed algebra to be compact if the mapping x 7→ axa is compact. This concept enabled the study of compactness properties of elements of abstract normed algebras. Ylinen in [17] studied compact elements for abstract C*-algebras and showed that a is a compact element of a C-algebra A if and only if there exists an isometric ∗-representation π of A on a Hilbert space H such that the operator π(a) is compact. Compactness questions have also been considered in the more general framework of elementary operators. A map Φ : A → A, where A is a Banach algebra, is called elementary if Φ = ∑m i=1 Mai,bi for some ai, bi ∈ A, i = 1, . . . ,m. Fong and Sourour showed that an elementary operator Φ : B(H) → B(H), where B(H) is the algebra of bounded linear operators on a Hilbert space H, is compact if and only if there exist compact operators ci, di ∈ B(H), i = 1, . . . ,m such that Φ = ∑m i=1 Mci,di [5]. This result was expanded by Mathieu on prime C*-algebras [9] and later on general C*-algebras by Timoney [14]. Akemann and Wright [1] characterized the weakly compact multiplication operators on B(H), where H is a Hilbert space. Saksman and Tylli [12, 13] and Johnson and Schechtman [6] studied weak compactness of multiplication operators in a Banach space setting. Moreover, strictly singular multiplication operators are studied by Lindström, Saksman and Tylli [8] and Mathieu and Tradacete [10]. Compactness properties of multiplication operators on nest algebras, a class of non selfadjoint operator algebras, are studied by Andreolas and Anoussis in [2]. In
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