A morphism \(f\colon X\to Y\) of schemes is called smooth of relative dimension \(d\ge 0\) in \(x\in X\), if there exist affine open neighborhoods \(U \subseteq X\) of \(x\) and \(V=\operatorname{Spec}R\subseteq Y\) of \(f(x)\) such that \(f(U) \subseteq V\) and an open immersion \(j \colon U \to \operatorname{Spec}R[T_1, \dots , T_n](f_1, \dots , f_{n-d})\) such that the triangle

is commutative, and that the Jacobian matrix \(J_{f_1, \dots , f_{n-d}}(x)\) has rank \(n-d\).

We say that \(f\colon X\to Y\) is smooth of relative dimension \(d\) if \(f\) is smooth of relative dimension \(d\) at every point of \(X\). Instead of smooth of relative dimension \(0\), we also use the term étale.

Let \(X\) be an integral \(k\)-scheme of finite type. Assume that \(K(X)\cong k(T_1, \dots , T_d)[\alpha ]\) with \(\alpha \) separable algebraic over \(k(T_1, \dots , T_d)\). (This is always possible if \(k\) is perfect.) (Then \(\dim X=d\) by the above.)

Then there exists a dense open subset \(U\subseteq X\) and a separable irreducible polynomial \(g \in k(T_1,\dots , T_d)[T]\) with coefficients in \(k[T_1,\dots , T_d]\), such that \(U\) is isomorphic to a dense open subset of \(\operatorname{Spec}k[T_1,\dots T_d]/(g)\).

1. Every localization of a regular ring is regular.

2. If \(A\) is regular, then the polynomial ring \(A[T]\) is regular.

3. (Theorem of Auslander–Buchsbaum) Every regular local ring is factorial.

4. Let \(A\) be a regular local ring with maximal ideal \({\mathfrak m}\) and of dimension \(d\), and let \(f_1,\dots , f_r\in {\mathfrak m}\). Then \(A/(f_1, \dots , f_r)\) is regular of dimension \(d-r\) if and only if the images of the \(f_i\) in \({\mathfrak m}/{\mathfrak m}^2\) are linearly independent over \(A/{\mathfrak m}\).

1. The morphism \(X\to \operatorname{Spec}k\) is smooth of relative dimension \(d\) at \(x\).

2. For all points \(\overline{x}\in X_K\) lying over \(x\), \(X_K\) is smooth over \(K\) of relative dimension \(d\) at \(\overline{x}\).

3. There exists a point \(\overline{x}\in X_K\) lying over \(x\), such that \(X_K\) is smooth over \(K\) of relative dimension \(d\) at \(\overline{x}\).

4. For all points \(\overline{x}\in X_K\) lying over \(x\), the local ring \({\mathscr O}_{X_K,\overline{x}}\) is regular of dimension \(d\).

5. There exists a point \(\overline{x}\in X_K\) lying over \(x\), such that the local ring \({\mathscr O}_{X_K,\overline{x}}\) is regular of dimension \(d\).

Let \(X = V(g_1, \dots , g_s)\subseteq \mathbb {A}^n_k\) and let \(x\in X\) be a smooth closed point. Let \(d=\dim {\mathscr O}_{X,x}\). Then \(J_{g_1, \dots , g_s}(x)\) has rank \(n-d\). In particular, \(s\ge n-d\).

After renumbering the \(g_i\), if necessary, there exists an open neighborhood \(U\) of \(x\) and an open immersion \(U \subseteq V(g_1, \dots , g_{n-d})\), i.e., locally around \(x\), “\(X\) is cut out in affine space by the expected number of equations”.

1. \(X\) is smooth over \(k\).

2. \(X\otimes _kL\) is regular for every field extension \(L/k\).

3. There exists an algebraically closed extension field \(K\) of \(k\) such that \(X\otimes _kK\) is regular.

1. (Leibniz rule) \(D(bb') = bD(b') + b'D(b)\) for all \(b, b'\in B\),

2. \(d(a) = 0\) for all \(a\in A\).

Let \(B\) be an \(A\)-algebra. We call a \(B\)-module \(\Omega _{B/A}\) together with an \(A\)-derivation \(d_{B/A}\colon B\to \Omega _{B/A}\) a module of (relative, Kähler) differentials of \(B\) over \(A\) if it satisfies the following universal property:

For every \(B\)-module \(M\) and every \(A\)-derivation \(D\colon B\to M\), there exists a unique \(B\)-module homomorphism \(\psi \colon \Omega _{B/A}\to M\) such that \(D = \psi \circ d_{B/A}\).

In other words, the map \(\operatorname{Hom}_B(\Omega _{B/A}, M) \to \operatorname{Der}_A(B, M)\), \(\psi \mapsto \psi \circ d_{B/A}\) is a bijection.

Let \(I\) be a set, \(B= A[T_i, i\in I]\) the polynomial ring. Then \(\Omega _{B/A} := B^{(I)}\) with \(d_{B/A}(T_i) = e_i\), the “\(i\)-th standard basis vector” is a module of differentials of \(B/A\).

So we can write \(\Omega _{B/A} = \bigoplus _{i\in I} Bd_{B/A}(T_i)\).

1. We say that \(\varphi \) is formally unramified, if in every situation as above, there exists at most one homomorphism \(B\to C\) making the diagram commutative.

2. We say that \(\varphi \) is formally smooth, if in every situation as above, there exists at least one homomorphism \(B\to C\) making the diagram commutative.

3. We say that \(\varphi \) is formally étale, if in every situation as above, there exists a unique homomorphism \(B\to C\) making the diagram commutative.

Let \(f\colon A\to B\), \(g\colon B\to C\) be ring homomorphisms. Then we obtain a natural sequence of \(C\)-modules

which is exact.

If moreover \(g\) is formally smooth, then the sequence

is a split short exact sequence.

Let \(f\colon A\to B\), \(g\colon B\to C\) be ring homomorphisms. Assume that \(g\) is surjective with kernel \({\mathfrak b}\). Then we obtain a natural sequence of \(C\)-modules

where the homomorphism \({\mathfrak b}/{\mathfrak b}^2 \to \Omega _{B/A}\otimes _BC\) is given by \(x\mapsto d_{B/A}(x)\otimes 1\).

If moreover \(g\circ f\) is formally smooth, then the sequence

is a split short exact sequence.

1. We say that \(f\) is formally unramified, if for every ring \(C\), every ideal \(I\) with \(I^2=0\), and every morphism \(\operatorname{Spec}C\to Y\) (which we use to view \(\operatorname{Spec}C\) and \(\operatorname{Spec}C/I\) as \(Y\)-schemes), the composition with the natural closed embedding \(\operatorname{Spec}C/I\to \operatorname{Spec}C\) yields an injective map \(\operatorname{Hom}_Y(\operatorname{Spec}C, X) \to \operatorname{Hom}_Y(\operatorname{Spec}C/I, X)\).

2. We say that \(f\) is formally smooth, if for every ring \(C\), every ideal \(I\) with \(I^2=0\), and every morphism \(\operatorname{Spec}C\to Y\), the composition with the natural closed embedding \(\operatorname{Spec}C/I\to \operatorname{Spec}C\) yields a surjective map \(\operatorname{Hom}_Y(\operatorname{Spec}C, X) \to \operatorname{Hom}_Y(\operatorname{Spec}C/I, X)\).

3. We say that \(f\) is formally étale, if \(f\) is formally unramified and formally smooth.

1. Every monomorphism of schemes (in particular: every immersion) is formally unramified.

2. Let \(A\to B\to C\) be ring homomorphisms such that \(A\to B\) is formally unramified. Then we can naturally identify \(\Omega _{C/A} = \Omega _{C/B}\).

Let \(X\to Y\) be a morphism of schemes, and let \({\mathscr M}\) be an \({\mathscr O}_X\)-module. A derivation \(D\colon {\mathscr O}_X\to {\mathscr M}\) is a homomorphism of abelian sheaves such that for all open subsets \(U\subseteq X\), \(V\subseteq Y\) with \(f(U)\subseteq V\), the map \({\mathscr O}(U)\to {\mathscr M}(U)\) is an \({\mathscr O}_Y(V)\)-derivation.

Equivalently, \(D\colon {\mathscr O}_X\to {\mathscr M}\) is a homomorphism of \(f^{-1}({\mathscr O}_Y)\)-modules such that for every open \(U\subseteq X\), the Leibniz rule

holds.

We denote the set of all these derivations by \(\operatorname{Der}_Y({\mathscr O}_X, {\mathscr M})\); it is a \(\Gamma (X, {\mathscr O}_X)\)-module.

1. There exists a unique \({\mathscr O}_X\)-module \(\Omega _{X/Y}\) together with a derivation \(d_{X/Y}\colon {\mathscr O}_X\to \Omega _{X/Y}\) such that for all affine open subsets \(\operatorname{Spec}B = U\subseteq X\), \(\operatorname{Spec}A = V\subseteq Y\) with \(f(U)\subseteq V\), \(\Omega _{X/Y} = \widetilde{\Omega _{B/A}}\) and \(d_{X/Y|U}\) is induced by \(d_{B/A}\).

2. \(\Omega _{X/Y} = \Delta ^*({\mathscr J}/{\mathscr J}^2)\), where \(\Delta \colon X\to X\times _YX\) is the diagonal morphism, \(W\subseteq X\times _YX\) is open such that \(\mathop{\rm im}(\Delta )\subseteq W\) is closed (if \(f\) is separated we can take \(W=X\times _YX\)), and \({\mathscr J}\) is the quasi-coherent ideal defining the closed subscheme \(\Delta (X) \subseteq W\). The derivation \(d_{X/Y}\) is induced, on affine opens, by the map \(b\mapsto 1\otimes b-b\otimes 1\).

3. The quasi-coherent \({\mathscr O}_X\)-module \(\Omega _{X/Y}\) together with \(d_{X/Y}\) is characterized by the universal property that composition with \(d_{X/Y}\) induces bijections

   \[ \operatorname{Hom}_{{\mathscr O}_X}(\Omega _{X/Y}, {\mathscr M}) \overset {\sim }{\to }\operatorname{Der}_{Y}({\mathscr O}_X, {\mathscr M}) \]

   for every quasi-coherent \({\mathscr O}_X\)-module \({\mathscr M}\), functorially in \({\mathscr M}\).

A morphism \(f\colon X\to Y\) of schemes is called smooth of relative dimension \(d\ge 0\) in \(x\in X\), if there exist affine open neighborhoods \(U \subseteq X\) of \(x\) and \(V=\operatorname{Spec}R\subseteq Y\) of \(f(x)\) such that \(f(U) \subseteq V\) and an open immersion \(j \colon U \to \operatorname{Spec}R[T_1, \dots , T_n](f_1, \dots , f_{n-d})\) such that the triangle

is commutative, and that the images of \(df_1\), …, \(df_{n-d}\) in the fiber \(\Omega _{\mathbb {A}^n_R/R}^1\otimes \kappa (x)\) are linearly independent over \(\kappa (x)\). (We view \(x\) as a point of \(\mathbb {A}^n_R\) via the embedding \(U \to \operatorname{Spec}R[T_1, \dots , T_n](f_1, \dots , f_{n-d}) \to \operatorname{Spec}R[T_1, \dots , T_n] = \mathbb {A}^n_R\).)