All rings considered will be commutative and unitary. Let $A$ be a ring, $S \subseteq A$ a multiplicatively closed subset. The localization $\lambda_S : A \longrightarrow A[S^{-1}]$ can be characterized as a ring homomorphism $\lambda : A \longrightarrow B$ with the following three properties:

• (LC1) $\lambda$ localizes $S$, i.e. $\lambda(s)$ is invertible in $B$ for all $s \in S$;

• (LC2) for every $b \in B$ there is $s \in S$ such that $s b \in \text{im $\lambda$}$;

• (LC3) $\ker \lambda = \{a \in A \,| \,\exists s \in S: sa = 0\}$.

One way to achieve this is to define the localization by means of generators and relations: take an indeterminate $T_s$ for each $s \in S$, form the polynomial ring over $A$ in these indeterminates and quotient out the ideal generated by the $sT_s - 1$ , $s \in S$, thus defining the localization $A[S^{-1}]$: \begin{equation*} A[S^{-1}] := A[T_s|s \in S]\,/\,(sT_s-1|s \in S). \end{equation*} The structure map $\lambda_S : A \longrightarrow A[S^{-1}]$ then comes along as the composite \begin{equation*} A \longrightarrow A[T_s|s \in S] \longrightarrow A[S^{-1}]. \end{equation*} See [1], pp. I-7-8. The question is how to verify properties(LC1-3) for this construction. In fact, (LC1-2) are straightforward, but (LC3) seems hard. It is known to be true, since it holds in the other widespread model of localization, given by $\mu_S : A \longrightarrow S^{-1}A$ with \begin{equation*} S^{-1}A := A \times S / \sim, \end{equation*} where $\sim$ denotes the equivalence relation \begin{equation*} (a,s) \sim (b,t) :\iff \exists u \in S:\, u(ta-sb) = 0, \end{equation*} and \begin{equation*} \mu_S(a) := a/1, \end{equation*} where, for $(a,s) \in A \times S$, $a/s$ denotes its equivalence class in $S^{-1}A$. Here, $(LC3)$ is trivial for $\mu_S$, holding by construction. Since both $\lambda_S$ and $\mu_S$ are universal among the ring homomorphisms localizing $S$, it holds for $\lambda_S$, too. But to show this directly for $\lambda_S$ using its definition, is surprisingly difficult: if $\lambda_S(a) = 0$, this means there are $s_1, \dots s_n \in S$ and polynomials $p_1(T), \dots, p_n(T) \in A[T]$ such that ($T_i:=T_{s_i}$) \begin{equation*} a = \sum_{i=1}^n p_i(T)(s_iT_i - 1). \end{equation*} From this I can conclude
\begin{equation*} a = -\sum_{i=1}^n a_i \quad,\quad a_i := p_i(0) \end{equation*} but this is, for the time being, the end of the flagpole. In the best of all possible worlds, I would have $p_i(T) = a_i$; this would give $a_is_i = 0$ for $i=1, \dots, n$, and so $sa = 0$ with $s := s_1 \cdots s_n$, but I see no reason for that.

So does somebody know what is needed to make progress towards (LC3)?

[1] Serre, J.-P., Algèbre locale - Multiplicités (Lecture Notes in Mathematics 11). Springer 1965

All rings considered will be commutative and unitary. Let $A$ be a ring, $S \subseteq A$ a multiplicatively closed subset. The localization $\lambda_S : A \longrightarrow A[S^{-1}]$ can be characterized as a ring homomorphism $\lambda : A \longrightarrow B$ with the following three properties:

• (LC1) $\lambda$ localizes $S$, i.e. $\lambda(s)$ is invertible in $B$ for all $s \in S$;

• (LC2) for every $b \in B$ there is $s \in S$ such that $s b \in \text{im $\lambda$}$;

• (LC3) $\ker \lambda = \{a \in A \,| \,\exists s \in S: sa = 0\}$.

One way to achieve this is to define the localization by means of generators and relations: take an indeterminate $T_s$ for each $s \in S$, form the polynomial ring $A[T] = A[T_s|s \in S]$ over $A$ in these indeterminates and quotient out the ideal generated by the $sT_s - 1$ , $s \in S$, thus defining the localization $A[S^{-1}]$: \begin{equation*} A[S^{-1}] := A[T_s|s \in S]\,/\,(sT_s-1|s \in S). \end{equation*} The structure map $\lambda_S : A \longrightarrow A[S^{-1}]$ then comes along as the composite \begin{equation*} A \longrightarrow A[T_s|s \in S] \longrightarrow A[S^{-1}]. \end{equation*} See [1], pp. I-7-8. The question is how to verify properties  (LC1-3) for this construction. In fact, (LC1-2) are straightforward, but (LC3) seems hard. It is known to be true, since it holds in the other widespread model of localization, given by $\mu_S : A \longrightarrow S^{-1}A$ with \begin{equation*} S^{-1}A := A \times S / \sim, \end{equation*} where $\sim$ denotes the equivalence relation \begin{equation*} (a,s) \sim (b,t) :\iff \exists u \in S:\, u(ta-sb) = 0, \end{equation*} and \begin{equation*} \mu_S(a) := a/1, \end{equation*} where, for $(a,s) \in A \times S$, $a/s$ denotes its equivalence class in $S^{-1}A$. Here, $(LC3)$ is trivial for $\mu_S$, holding by construction. Since both $\lambda_S$ and $\mu_S$ are universal among the ring homomorphisms localizing $S$, it holds for $\lambda_S$, too. But to show this directly for $\lambda_S$ using its definition, is surprisingly difficult: if $\lambda_S(a) = 0$, this means there are $s_1, \dots s_n \in S$ and polynomials $p_1(T), \dots, p_n(T) \in A[T]$ such that ($T_i:=T_{s_i}$) \begin{equation*} a = \sum_{i=1}^n p_i(T)(s_iT_i - 1). \end{equation*} From this I can conclude
\begin{equation*} a = -\sum_{i=1}^n a_i \quad,\quad a_i := p_i(0) \end{equation*} but this is, for the time being, the end of the flagpole. In the best of all possible worlds, I would have $p_i(T) = a_i$; this would give $a_is_i = 0$ for $i=1, \dots, n$, and so $sa = 0$ with $s := s_1 \cdots s_n$, but I see no reason for that.

So does somebody know what is needed to make progress towards (LC3)?

[1] Serre, J.-P., Algèbre locale - Multiplicités (Lecture Notes in Mathematics 11). Springer 1965