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Nilpotence of a class of commutative power-associative nilalgebras
Let A be a commutative algebra over a field F of characteristic ≠ 2 , 3 . In [M. Gerstenhaber, On nilalgebras and linear varieties of nilpotent matrices II, Duke Math. J. 27 (1960) 21–31], M. Gerstenhaber proved that if A is a nilalgebra of bounded index t and the characteristic of F is zero (or gre...
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| Published in: | Journal of algebra 2005-09, Vol.291 (2), p.492-504 |
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| Main Authors: | , , |
| Format: | Article |
| Language: | English |
| Citations: | Items that this one cites Items that cite this one |
| Online Access: | Get full text |
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| Summary: | Let
A be a commutative algebra over a field
F of characteristic
≠
2
,
3
. In [M. Gerstenhaber, On nilalgebras and linear varieties of nilpotent matrices II, Duke Math. J. 27 (1960) 21–31], M. Gerstenhaber proved that if
A is a nilalgebra of bounded index
t and the characteristic of
F is zero (or greater than
2
t
−
3
), then the right multiplication
R
x
is nilpotent and
R
x
2
t
−
3
=
0
for all
x
∈
A
. In this work, we prove that this result is also valid for commutative power-associative algebras of characteristic ⩾
t. In Section 3, we prove that when
A is a power-associative nilalgebra of dimension ⩽6, then
A is nilpotent or
(
A
2
)
2
=
0
. In Section 4, we prove that every power-associative nilalgebra
A of dimension
n and nilindex
t
⩾
n
−
1
is either nilpotent of index
t or isomorphic to the Suttles' example. |
|---|---|
| ISSN: | 0021-8693 1090-266X |
| DOI: | 10.1016/j.jalgebra.2005.06.019 |