Local ring

We say that a ring $R$ is local if it has a unique maximal ideal $m$ .
The elements of $R - m$ are all invertible. If $a \notin m$ were not invertible we could consider the ideal generated by $m \cup {a}$ ...

Example: ring of germs of functions

Consider continuous functions defined in a real interval containing 0. We can consider the ring $O_{0}$ formed by class of pairs $(U, f)$ with $0 \in U$ and $f : U \mapsto R$ a continuous function. We establish that two pairs are equivalents if their restricted functions coincide in the intersection. We call this ring the germs of real-valued continuous functions.
The maximal ideal of the ring $O_{0}$ is

m = {f \in O_{0} : f (0) = 0}

Proposition
A ring $R$ is local iff for every $x \in R$ then $x$ is a unity or $1 - x$ is a unity.
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A source of local ring is the localization of a ring.