%A Potapov, Denis
%A Sukochev, Fedor
%D 2019
%T Arens Algebras and Matricial Spaces
%K
%X Let M be a finite von Neumann algebra equipped with a finite faithful normal trace and let Lp(M; ) be the corresponding noncommutative Lp space of -measurable operators associated with the couple (M; ), 1 ≤ p < ∞. Let MN be the algebra of all complex N × N-matrices equipped with the standard trace Tr. In this note we study the properties of Arens “algebras” over finite dimensional matrix spaces, given by Trunov’s construction for noncommutative Lp-spaces. In this work we show that the Arens “algebras” built upon Trunov’s noncommutative Lp-spaces fails to form an algebra in general. We also show that the Arens space L!(; h), with 0 ≤ ≤ 1, fails to form an algebra in general, even in the setting of finite algebras associated to a trace, in contrast to L!(M; ): In particular, we provide an example of a finite von Neumann algebra, with an associated trace, such that L!(; h) is not an algebra, for any choice of ∈ [0; 1].
%U http://bm.kaznu.kz/index.php/kaznu/article/view/583
%J Journal of Mathematics, Mechanics and Computer Science
%0 Journal Article
%P 3-7%V 100
%N 4
%@ 1563-0277
%8 2019-01-22