Matrix realizations of exceptional superconformal algebras
classification
🧮 math-ph
math.MP
keywords
superconformalalgebraalgebrasexceptionalrealizationsconstructioncontactgeneral
read the original abstract
We give a general construction of realizations of the contact superconformal algebras $K(2)$ and $\hat{K}'(4)$, and the exceptional superconformal algebra $CK_6$ as subsuperalgebras of matrices over a Weyl algebra of size $2^N\times 2^N$, where $N = 1, 2$ and $3$. We show that there is no such a realization for $K(2N)$, if $N\geq 4$.
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