Answer by Johannes Ebert for Norms on Clifford algebra (C^* norm)
There is the following description of the $C^{\ast}$-algebra structure on the CLifford algebra $Cl^{n,n}$. Since any vector space with inner product can be embedded into $R^{n,n}$, this answers your...
View ArticleNorms on Clifford algebra (C^* norm)
Basically I'm interested in operator algebras such as $C^*$ or von Neumann algebras. However I decided to learn a bit about noncommutative geometry (in particular spectral triples). Before doing this...
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