A variant of the primitive element theorem for separable extensions of a commutative ring

Dirceu Bagio, Antonio Paques

Abstract


In this article we show that any strongly separable extension of a commutative ring \(R\) can be embedded into another one having primitive element whenever every boolean localization of  \(R\) modulo its Jacobson radical is von Neumann regular and locally uniform.


Keywords


primitive element, separable extension, boolean localization

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