Generalized super-W1+∞-n-algebra and Landau Problem
Abstract
We investigate the R(p,q)-super n-bracket and study their properties such that the generalized super Jacobi identity (GJSI). Furthermore, from the R(p,q)-operators in a Supersymmetric Landau problem, we furnish the R(p,q)-super W1+∞ n-algebra which obey the generalized super Jacobi identity (GSJI) for n even. Also, we derive the R(p,q)-super W1+∞ sub-2n-algebra and deduce particular cases induced by quantum algebras existing in the literature.
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