关于 Drinfeld 共积

Pub Date : 2024-03-26 DOI:10.4310/pamq.2024.v20.n1.a6

Ilaria Damiani

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引用次数: 0

摘要

本文通过一些局部零potent 导数的指数，在仿射量子 Kac-Moody 代数或量子仿射 $\mathcal{U}$ 上构造了一个 Drinfeld 共乘积 $\Delta_v$，从而证明了这个 "共乘积 "的值在 $\mathcal{U} 的一个合适的完备中。\mathcal{U}$ 中的值的 "共积 "是定义明确的。对于仿射量子代数，$\Delta_v$ 也可以作为 Drinfeld-Jimbo 共乘积 $\Delta$ 的"$t$-常量极限 "而得到。

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On the Drinfeld coproduct

This paper provides a construction of the Drinfeld coproduct $\Delta_v$ on an affine quantum Kac–Moody algebra or on a quantum affinization $\mathcal{U}$ through the exponentials of some locally nilpotent derivations, thus proving that this “coproduct” with values in a suitable completion of $\mathcal{U} \oplus \mathcal{U}$ is well defined. For the affine quantum algebras, $\Delta_v$ is also obtained as “$t$-equivariant limit” of the Drinfeld–Jimbo coproduct $\Delta$.

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