Abstract
We show that every finite Z -grading of a simple associative algebra A comes from a Peirce decomposition induced by a complete system of orthogonal idempotents lying in the maximal left quotient algebra of A (which coincides with the graded maximal left quotient algebra of A ). Moreover, a nontrivial 3-grading can be found. This grading provides 3-gradings in simple M -graded Lie algebras. Some consequences are obtained for left nonsingular algebras with a finite Z -grading.
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