具有次加性有界半径的拓扑代数

IF 0.5 Q3 MATHEMATICS

Cubo Pub Date : 2020-12-01 DOI:10.4067/s0719-06462020000300289

M. Sabet, R. Sanati

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引用次数: 0

摘要

设\(A\)为拓扑代数，\(\beta\)为\(A\)上的次加性有界半径。本文证明了\(\beta\)在一定条件下是自动子乘法的。然后应用这一事实证明了\(A\)中任意元素的谱都是非空的。最后，在\(A\)是赋范代数的情况下，我们将初始赋范拓扑与由\(A\)上的\(\beta\)导出的赋范拓扑\(\tau_{\beta}\)进行比较，其中\(\beta^{-1} (0)=0\)。

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Topological algebras with subadditive boundedness radius

Let \(A\) be a topological algebra and \(\beta\) a subadditive boundedness radius on \(A\). In this paper we show that \(\beta\) is, under certain conditions, automatically submultiplicative. Then we apply this fact to prove that the spectrum of any element of \(A\) is non-empty. Finally, in the case when \(A\) is a normed algebra, we compare the initial normed topology with the normed topology \(\tau_{\beta}\), induced by \(\beta\) on \(A\), where \(\beta^{-1} (0)=0\).

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来源期刊

Cubo Mathematics-Logic

CiteScore

1.20

自引率

0.00%

发文量

审稿时长

20 weeks