Pi Algebras Propriedade Da Base Finita
Mostrando 1-2 de 2 artigos, teses e dissertações.
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1. Identidades polinomiais graduadas de algumas àlgebras matriciais
Let K be an associative and commutative ring with 1 and let A be an associative Kalgebra with or without 1. We say that the polynomial identities of A have the Specht property if each K-algebra B satisfying all the polynomial identities of A has a finite basis for its identities. Let M2(K) be the algebra of 2 × 2 matrices over a field K. If K is a field of
Publicado em: 2010
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2. Sistema de identidades polinomiais sem base finita
Let F be a field and let A be the free associative F-algebra (without 1) on free generators x1; x2; Let f = (x1;; xn) A and let G be an associative algebra over F. We say that f = 0 is a polynomial identity (or an identity) in G if f(g1; ; gn) = 0 for all g1; ; gn G. Two systems of polynomial identities {ui = 0}| i I} and {vj = 0} | j J} are equivalent if ev
Publicado em: 2009