Branching rules for superalgebras with $so(N,3N)$ even part and scalar odd part

Author: Daniel L. Miller

Abstract: Odd $N$ special orthogonal Lie algebra $so(N;3N)$ together with scalar supercharges $Q,Q^\ast$ give rise to a superalgebra where supermultiplets are made from conjugated representations of $so(N;3N)$. We report branching rules for this superalgebra and consistency with the theory of exchange rotations.

BranchingGradedAlgebra-2017ww25

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