Irreducible cuspidal modules of simple n-Lie algebras

Abstract

This work devoted to the description of irreducible cuspidal modules over simple n-Lie algebras. Since the description of irreducible modules over n-Lie algebra On are already well understood, we focus here on the irreducible cuspidal modules over n-Lie algebras of Wronskians and Jacobians. First, for a given n-Lie algebra L, we analyze the possible Lie and Leibniz structures on n-1 L and n-1 L by thoroughly examining existing structures. Next, we classify the irreducible cuspidal modules over the n-Lie algebra of Wronskians defined on Laurent polynomials with degree-preserving derivations. Furthermore, we prove that these modules remain irreducible over the n-Lie algebra of Jacobians.