Jordan [tau]-derivations of locally matrix rings

Chuang, Chen-Lian; Fošner, Ajda; Lee, Tsiu Kwen

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Title:	Jordan [tau]-derivations of locally matrix rings
Authors:	ID Chuang, Chen-Lian (Author) ID Fošner, Ajda (Author) ID Lee, Tsiu Kwen (Author)
Files:	http://dx.doi.org/10.1007/s10468-011-9329-8
Language:	English
Work type:	Not categorized
Typology:	1.01 - Original Scientific Article
Organization:	IAM - Andrej Marušič Institute
Abstract:	Let ▫$R$▫ be a prime, locally matrix ring of characteristic not 2 and let ▫$Q_{ms}(R)$▫ be the maximal symmetric ring of quotients of ▫$R$▫. Suppose that ▫$\delta \colon R \to Q_{ms}(R)$▫ is a Jordan ▫$\tau$▫-derivation, where ▫$\tau$▫ is an anti-automorphism of $R$. Then there exists ▫$a \in Q_{ms}(R)$▫ such that ▫$\delta(x) = xa - a\tau(x)$▫ for all ▫$x \in R$▫. Let ▫$X$▫ be a Banach space over the field ▫$\mathbb{F}$▫ of real or complex numbers and let ▫$\mathcal{B}(X)$▫ be the algebra of all bounded linear operators on ▫$X$▫. We prove that ▫$Q_{ms}(\mathcal{B}(X)) = \mathcal{B}(X)$▫, which provides the viewpoint of ring theory for some results concerning derivations on the algebra ▫$\mathcal{B}(X)$▫. In particular, all Jordan ▫$\tau$▫-derivations of ▫$\mathcal{B}(X)$▫ are inner if ▫$\dim_{\mathbb{F}} X>1$▫.
Keywords:	mathematics, algebra, anti-automorphism, locally matrix ring, prime ring, Jordan homomorphism, Jordan ▫$\tau$▫-derivation, Banach space
Year of publishing:	2013
Number of pages:	str. 755-763
Numbering:	Vol. 16, iss. 3
PID:	20.500.12556/RUP-2200
ISSN:	1386-923X
UDC:	512.552
COBISS.SI-ID:	16195673
Publication date in RUP:	15.10.2013
Views:	4924
Downloads:	85
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Secondary language

Language:	Slovenian
Abstract:	Naj bo ▫$R$▫ lokalno matrični prakolobar s karakteristiko različno od 2 in ▫$Q_{ms}(R)$▫ maksimalni simetrični kolobar kvocientov kolobarja ▫$R$▫. Naj bo ▫$\delta \colon R \to Q_{ms}(R)$▫ jordansko ▫$\tau$▫-odvajanje, kjer je ▫$\tau$▫ antiavtomorfizem kolobarja ▫$R$▫. Potem obstaja tak ▫$a \in Q_{ms}(R)$▫, da je ▫$\delta(x) = xa - a\tau(x)$▫ za vse ▫$x \in R$▫. Naj bo ▫$X$▫ Banachov prostor nad kompleksnim ali realnim poljem ▫$\mathbb{F}$▫ in ▫$\mathcal{B}(X)$▫ algebra omejenih linearnih operatorjev na ▫$X$▫. V članku je dokazano, da je ▫$Q_{ms}(\mathcal{B}(X)) = \mathcal{B}(X)$▫.
Keywords:	matematika, algebra, antiavtomorfizem, lokalno matrični kolobar, prakolobar, jordanski homomorfizem, jordansko ▫$\tau$▫-odvajanje, Banachov prostor

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