U(n)-structures and their induced minimal left ideals

Abstract

In previous work, we associated to SU(3), G2, and Spin(7)-structures minimal left ideals for the Clifford algebras R0,6,R0,7, and R0,8, respectively. In this paper, we continue to analyze the link between Berger's classification theorem and the structure theorem of minimal left ideals for Clifford algebras of signature (p,q) by identifying U(n)-structures with minimal left ideals for Clifford algebras of various signatures via the induced Kahler polynomial P(ω0) associated with the symplectic form ω0 that defines the U(n)-structure as a stabilizer subgroup of O(n).

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