unity of subring

Theorem.

Let $S$ be a proper subring of the ring $R$ . If $S$ has a non-zero unity $u$ which is not unity of $R$ , then $u$ is a zero divisor of $R$ .

Proof. Because $u$ is not unity of $R$ , there exists an element $r$ of $R$ such that $ru\neq r$ . Then we have $(ru)u=r(uu)=ru$ , which implies that $0=(ru)u-ru=(ru-r)\cdot u$ . Since neither $ru-r$ nor $u$ is 0, the element $u$ is a zero divisor in $R$ .

Title	unity of subring
Canonical name	UnityOfSubring
Date of creation	2013-03-22 14:49:40
Last modified on	2013-03-22 14:49:40
Owner	pahio (2872)
Last modified by	pahio (2872)
Numerical id	7
Author	pahio (2872)
Entry type	Theorem
Classification	msc 20-00
Classification	msc 16-00
Classification	msc 13-00
Related topic	UnitiesOfRingAndSubring
Related topic	CornerOfARing