Rota-Baxter operators of zero weight on simple Jordan algebra of Clifford type
Abstract
It is proved that any Rota---Baxter operator of zero weight on Jordan algebra of a nondegenerate bilinear symmetric form is nilpotent of index less or equal three. We state exact value of nilpotency index on simple Jordan algebra of Clifford type over fields R, C, and Zp. For Zp, we essentially use the results from number theory concerned quadratic residues and Chevalley---Warning theorem.
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