Commutativity of rings with polynomial constraints
Czechoslovak Mathematical Journal, Tome 52 (2002) no. 2, pp. 401-413
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Let $p$, $ q$ and $r$ be fixed non-negative integers. In this note, it is shown that if $R$ is left (right) $s$-unital ring satisfying $[f(x^py^q) - x^ry, x] = 0$ ($[f(x^py^q) - yx^r, x] = 0$, respectively) where $f(\lambda ) \in {\lambda }^2{\mathbb Z}[\lambda ]$, then $R$ is commutative. Moreover, commutativity of $R$ is also obtained under different sets of constraints on integral exponents. Also, we provide some counterexamples which show that the hypotheses are not altogether superfluous. Thus, many well-known commutativity theorems become corollaries of our results.
Classification :
16R50, 16U70, 16U80, 16U99
Keywords: automorphism; commutativity; local ring; polynomial identity; $s$-unital ring
Keywords: automorphism; commutativity; local ring; polynomial identity; $s$-unital ring
@article{CMJ_2002__52_2_a15,
author = {Khan, Moharram A.},
title = {Commutativity of rings with polynomial constraints},
journal = {Czechoslovak Mathematical Journal},
pages = {401--413},
publisher = {mathdoc},
volume = {52},
number = {2},
year = {2002},
mrnumber = {1905447},
zbl = {1014.16032},
language = {en},
url = {http://geodesic.mathdoc.fr/item/CMJ_2002__52_2_a15/}
}
Khan, Moharram A. Commutativity of rings with polynomial constraints. Czechoslovak Mathematical Journal, Tome 52 (2002) no. 2, pp. 401-413. http://geodesic.mathdoc.fr/item/CMJ_2002__52_2_a15/