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Universal side divisor

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Definition

A nonzero element $x$ in an commutative unital ring $R$ is termed a universal side divisor if $x$ satisfies the following two conditions:

$x$ is not a unit.
For any $y\in R$ , there exists a unit $u\in R$ such that $x$ divides $y-u$ .

Facts

Euclidean domain that is not a field has a universal side divisor

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