symmetric monoidal (∞,1)-category of spectra
The localization of a commutative ring $R$ at a set $S$ of its elements is a new ring $R[S]^{-1}$ in which the elements of $S$ become invertible (units) and which is universal with this property.
When interpreting a ring under Isbell duality as the ring of functions on some space $X$ (its spectrum), then localizing it at $S$ corresponds to restricting to the subspace $Y \hookrightarrow X$ on which the elements in $S$ vanish.
See also commutative localization and localization of a ring (noncommutative).
Let $R$ be a commutative ring. Let $S \hookrightarrow U(R)$ be a multiplicative subset of the underlying set.
The following gives the universal property of the localization.
The localization $L_S \colon R \to R[S^{-1}]$ is a homomorphism to another commutative ring $R[S^{-1}]$ such that
for all elements $s \in S \hookrightarrow R$ the image $L_S(s) \in R[S^{-1}]$ is invertible (is a unit);
for every other homomorphism $R \to \tilde R$ with this property, there is a unique homomorphism $R[S^{-1}] \to \tilde R$ such that we have a commuting diagram
The following gives an explicit description of the localization
For $R$ a commutative ring and $s \in R$ an element, the localization of $R$ at $s$ is
The formal duals $Spec(R[S^{-1}]) \longrightarrow Spec(R)$ of the localization maps $R \longrightarrow R[S^{-1}]$ (under forming spectra) serve as the standard open immersions that define the Zariski topology on algebraic varieties.
The Stacks Project, 10.9. Localization
Yoshifumi Tsuchimoto, Review of commutative (usual) affine schemes. Localization of a commutative ring