A theory of locally convex Hopf algebras

arXiv - MATH - Quantum Algebra Pub Date : 2024-08-07 DOI:arxiv-2408.03805

Hua Wang

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Abstract

Using the completed inductive, projective and injective tensor products of Grothendieck for locally convex topological vector spaces, we develop a systematic theory of locally convex Hopf algebras with an emphasis on Pontryagin-type dualities. We describe how classical Hopf algebras, real and complex Lie groups, as well as compact and discrete quantum groups, can all give rise to natural examples of this theory in a variety of different ways. We also show that the space of all continuous functions on a topological group $ G $ whose topological structures are compactly generated has an $ \varepsilon $-Hopf algebra structure, and we can recover $ G $ fully as a topological group from this locally convex Hopf algebra. The latter is done via a generalization of Gelfand duality, which is of its own interest. Certain projective and inductive limits are also considered in this framework, and it is shown that how this can lead to examples seemingly outside of the framework of locally compact quantum groups in the sense of Kustermans-Vaes. As an illustration, we propose a version of the infinite quantum permutation group $ S^{+}_{\infty} $, the free orthogonal group $ O^{+}_{\infty} $, and the free unitary group $ U^{+}_{\infty} $ as certain strict inductive limits, all of which still retain a nice duality. Combined with our duality theory, this may be seen as an alternative tentative approach to the Kac program of developing a Pontryagin-type duality to a wider class, while at the same time, we include many more interesting examples of classical and quantum groups.

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局部凸霍普夫布拉斯理论

利用格罗登第克（Grothendieck）针对局部凸拓扑向量空间所完成的归纳、投影和注入张量积，我们发展了局部凸霍普夫布拉斯的系统理论，重点是庞特里亚金型对偶性。我们描述了经典霍普夫布拉斯、实和复李群以及紧凑和离散量子群如何以各种不同的方式产生这一理论的自然实例。我们还证明了拓扑结构紧凑生成的拓扑群 $ G$ 上所有连续函数的空间具有 $ \varepsilon$-Hopf 代数结构，而且我们可以从这个局部凸 Hopf 代数中完全恢复作为拓扑群的 $ G$。后者是通过格尔方对偶性的广义化实现的，这本身就很有意义。在这个框架中还考虑了某些投影极限和归纳极限，并证明了这如何能引出库斯特曼-瓦斯意义上的局部紧密量子群框架之外的例子。作为说明，我们提出了无限量子置换群 $ S^{+}_{\infty} $、自由正交群 $ O^{+}_{\infty} $ 和自由单元群 $U^{+}_{\infty} $ 的一个版本，作为某些严格的归纳极限，它们都仍然保留了很好的对偶性。结合我们的对偶性理论，这可以看作是对 Kac 计划的另一种尝试性方法，即把庞特里亚金型对偶性发展到更广泛的类别，同时，我们还包括了经典和量子群中许多更有趣的例子。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - MATH - Quantum Algebra

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