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1 results

  • CONFORMAL $\mathcal{s}$$\mathcal{l}$2 ENVELOPING ALGEBRAS AS AMBISKEW POLYNOMIAL RINGS

  • Martin O’Neill
  • Journal:
    Proceedings of the Edinburgh Mathematical Society / Volume 45 / Issue 1 / February 2002
    Published online by Cambridge University Press:
    05 February 2002, pp. 91-115
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  • We study a three parameter deformation $\mathcal{U}_{abc}$ of $\mathcal{U}(\mathfrak{sl}_2)$ introduced by Le Bruyn in 1995. Working over an arbitrary algebraically closed field of characteristic zero, we determine the centres, the finite-dimensional irreducible representations, and, when the parameter $a$ is not a non-trivial root of unity, the prime ideals of those $\mathcal{U}_{abc}$, with $ac\neq0$, which are conformal as ambiskew polynomial rings.

    AMS 2000 Mathematics subject classification: Primary 16W35; 17B37. Secondary 16S36; 16S80