Associative n-Tuple algebras
In the paper,we study algebras having n bilinearmultiplication operations : A × A → A , s = 1, …, n , such that ( a b ) c = a ( b c ), s, r = 1,..., n, a, b, c ∈ A . The radical of such an algebra is defined as the intersection of the annihilators of irreducible A -modules, and it is proved that the...
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Veröffentlicht in: | Mathematical Notes 2014-07, Vol.96 (1-2), p.38-49 |
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Format: | Artikel |
Sprache: | eng |
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Zusammenfassung: | In the paper,we study algebras having
n
bilinearmultiplication operations
:
A
×
A
→
A
,
s
= 1, …,
n
, such that (
a
b
)
c
=
a
(
b
c
),
s, r
= 1,...,
n, a, b, c
∈
A
. The radical of such an algebra is defined as the intersection of the annihilators of irreducible
A
-modules, and it is proved that the radical coincides with the intersection of the maximal right ideals each of which is
s
-regular for some operation
. This implies that the quotient algebra by the radical is semisimple. If an
n
-tuple algebra is Artinian, then the radical is nilpotent, and the semisimple Artinian
n
-tuple algebra is the direct sum of two-sided ideals each of which is a simple algebra. Moreover, in terms of sandwich algebras, we describe a finite-dimensional
n
-tuple algebra
A
, over an algebraically closed field, which is a simple
A
-module. |
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ISSN: | 0001-4346 1573-8876 |
DOI: | 10.1134/S0001434614070049 |