ON NILPOTENCY OF GRADED ASSOCIATIVE ALGEBRAS
引用次数: 1
Abstract
It is proved that an associative PI-algebra over a field of characteristic zero that is graded by an arbitrary semigroup and that satisfies the relation an = 0 for all homogeneous elements and is generated by a finite number of its homogeneous components is nilpotent. This generalizes a well-known theorem of M. Nagata.关于分级结合代数的幂零性
证明了在特征为0的域上,由任意半群分阶,满足所有齐次元素的an = 0关系,由有限个齐次分量生成的结合pi -代数是幂零的。这推广了Nagata的一个著名定理。
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