PROOF..
(1) Assume
is a local ring with the maximal ideal
.
Then for any element
,
an ideal
is an ideal of
.
By Zorn's lemma, we know that
is contained in a maximal ideal of
.
From the assumption, the maximal ideal should be
.
Therefore, we have
which shows that
The converse inclusion being obvious (why?), we have
(2) The ``only if'' part is an easy corollary of (1).
The ``if'' part is also easy.
DEFINITION 1.49
Let
be local rings
with maximal ideals
respectively.
A local homomorphism
is a homomorphism which
preserves maximal ideals. That means, a homomorphism
is said to be local
if