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The nilpotency of the prime radical of a Goldie module (2109.14043v2)

Published 28 Sep 2021 in math.RA

Abstract: With the notion of prime submodule defined by F. Raggi et.al. we prove that the intersection of all prime submodules of a Goldie module $M$, is a nilpotent submodule provided that $M$ is retractable and $M^{{(\Lambda)}$-projective} for every index set $\Lambda$. This extends the well known fact that in a left Goldie ring, the prime radical is nilpotent.