A finite number of defining relations and a UCE theorem of the elliptic Lie algebras and superalgebras with rank ≥ 2

Abstract

In this paper, we give a finite number of defining relations satisfied by a finite number of generators for the elliptic Lie algebras and superalgebras gR with rank ≥ 2. Here the R's denote the reduced and non-reduced elliptic root systems with rank ≥ 2. We also show that if L is an extended affine Lie algebra (EALA) whose non-isotropic roots form the R, then there exists a natural homomorphism F: gR L, which also give a universal central extension (UCE) surjective map from [ gR, gR] to the core of L. (More precisely, we take a gR instead of the gR.)

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