Subalgebras of gcN and Jacobi Polynomials
2002 ◽
Vol 45
(4)
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pp. 567-605
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AbstractWe classify the subalgebras of the general Lie conformal algebra gcN that act irreducibly on [∂]N and that are normalized by the sl2-part of a Virasoro element. The problem turns out to be closely related to classical Jacobi polynomials , σ ∈ . The connection goes both ways—we use in our classification some classical properties of Jacobi polynomials, and we derive from the theory of conformal algebras some apparently new properties of Jacobi polynomials.
2012 ◽
Vol 27
(09)
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pp. 1250044
Keyword(s):
2019 ◽
Vol 18
(09)
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pp. 1950175
2020 ◽
Vol 30
(05)
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pp. 1015-1034
Keyword(s):
2017 ◽
Vol 16
(05)
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pp. 1750094
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1989 ◽
Vol 04
(16)
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pp. 4083-4095
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