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arxiv: 2111.07649 · v3 · pith:J76WH724new · submitted 2021-11-15 · 🧮 math.FA · math.OA

Towards a Classification of Multi-Faced Independence: A Representation-Theoretic Approach

classification 🧮 math.FA math.OA
keywords independencesfacedclassificationmulti-facedproductuniversalclassexamples
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We attack the classification problem of multi-faced independences, the first non-trivial example being Voiculescu's bi-freeness. While the present paper does not achieve a complete classification, it formalizes the idea of lifting an operator on a pre-Hilbert space in a "universal" way to a larger product space, which is key for the construction of (old and new) examples. It will be shown how universal lifts can be used to construct very well-behaved (multi-faced) independences in general. Furthermore, we entirely classify universal lifts to the tensor product and to the free product of pre-Hilbert spaces. Our work brings to light surprising new examples of 2-faced independences. Most noteworthy, for many known 2-faced independences, we find that they admit continuous deformations within the class of 2-faced independences, showing in particular that, in contrast with the single faced case, this class is infinite (and even uncountable).

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