absolutely flat

A ring $A$ is absolutely flat if every module over $A$ is flat.

For commutative rings with unity, a ring is absolutely flat if and only if every principal ideal is idempotent.

Some properties:

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  Boolean rings are flat.

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  Homomorphic images of absolutely flat rings are flat.

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  Absolutely flat local rings are fields.

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  In absolutely flat rings, non-units are zero divisors.