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Anyonic Lie algebra - Definition and Overview |
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An anyonic Lie algebra is a U(1) graded vector space L over C equipped with a bilinear operator [.,.] and linear maps ε:L->C and Δ:L->L⊗L satisfying
- ε([X,Y])=ε(X)ε(Y)
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for pure graded elements X, Y and Z.
See also
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Example Usage of Anyonic |
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dabacon: @cgranade I am a parafermion! Sometimes, when I'm feeling flat, I'm a non-Abelian anyon. And even when I'm not flat, I'm an Anyonic string. |
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