The Maximal Graded Left Quotient Algebra of a Graded Algebra1)

@inproceedings{Pino2006TheMG,
  title={The Maximal Graded Left Quotient Algebra of a Graded Algebra1)},
  author={Gonzalo Aranda Pino and Mercedes Siles Molina},
  year={2006}
}
  • Gonzalo Aranda Pino, Mercedes Siles Molina
  • Published 2006
  • Mathematics
  • We construct the maximal graded left quotient algebra of every graded algebra A without homogeneous total right zero divisors as the direct limit of graded homomorphisms (of left A–modules) from graded dense left ideals of A into a graded left quotient algebra of A. In the case of a superalgebra, and with some extra hypothesis, we prove that the component in the neutral element of the group of the maximal graded left quotient algebra coincides with the maximal left quotient algebra of the… CONTINUE READING

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