Rigid Graph Products

Matthijs Borst, Martijn Caspers, Enli Chen
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Abstract

We prove rigidity properties for von Neumann algebraic graph products. We introduce the notion of rigid graphs and define a class of II$_1$-factors named $\mathcal{C}_{\rm Rigid}$. For von Neumann algebras in this class we show a unique rigid graph product decomposition. In particular, we obtain unique prime factorization results and unique free product decomposition results for new classes of von Neumann algebras. We also prove several technical results concerning relative amenability and embeddings of (quasi)-normalizers in graph products. Furthermore, we give sufficient conditions for a graph product to be nuclear and characterize strong solidity, primeness and free-indecomposability for graph products.
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硬质图形产品
我们证明了 von Neumann 代数图积的刚性属性。我们引入了刚性图的概念,并定义了一类名为$\mathcal{C}_{rm Rigid}$的 II$_1$ 因子。对于这一类中的冯-诺依曼代数,我们展示了独特的刚性图积分解。特别是,我们得到了新类冯-诺依曼代数的唯一素因子化结果和唯一自由积分解结果。我们还证明了与图积中的(准)归一化子的相对适配性和嵌入有关的几个技术结果。此外,我们还给出了图积成核的充分条件,并描述了图积的强实体性、原始性和自由不可分性。
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