Lie algebras arising from Nichols algebras of diagonal type
Abstract
Let Bq be a finite-dimensional Nichols algebra of diagonal type with braiding matrix q, let Lq be the corresponding Lusztig algebra as in arXiv:1501.04518 and let Frq: Lq U(nq) be the corresponding quantum Frobenius map as in arXiv:1603.09387. We prove that the finite-dimensional Lie algebra nq is either 0 or else the positive part of a semisimple Lie algebra gq which is determined for each q in the list of arXiv:math/0605795.
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