Difference between revisions of "Differential calculus (on analytic spaces)"
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− | + | A generalization of the classical calculus of differential forms and differential operators to analytic spaces. For the calculus of differential forms on complex manifolds see [[Differential form|Differential form]]. Let $ ( X, {\mathcal O} _ {X} ) $ | |
+ | be an [[Analytic space|analytic space]] over a field $ k $, | ||
+ | let $ \Delta $ | ||
+ | be the diagonal in $ X \times X $, | ||
+ | let $ J $ | ||
+ | be the sheaf of ideals defining $ \Delta $ | ||
+ | and generated by all germs of the form $ \pi _ {1} ^ {*} f - \pi _ {2} ^ {*} f $, | ||
+ | where $ f $ | ||
+ | is an arbitrary germ from $ {\mathcal O} _ {X} $, | ||
+ | and let $ \pi _ {i} : X \times X \rightarrow X $ | ||
+ | be projection on the $ i $- | ||
+ | th factor. | ||
− | + | The analytic sheaf $ \pi _ {1} ( J / J ^ {2} ) = \Omega _ {X} ^ {1} $ | |
+ | is known as the sheaf of analytic differential forms of the first order on $ X $. | ||
+ | If $ f $ | ||
+ | is the germ of an analytic function on $ X $, | ||
+ | then the germ $ \pi _ {1} ^ {*} f - \pi _ {2} ^ {*} f $ | ||
+ | belongs to $ J $ | ||
+ | and defines the element $ df $ | ||
+ | of $ \Omega _ {X} ^ {1} $ | ||
+ | known as the differential of the germ $ f $. | ||
+ | This defines a sheaf homomorphism of vector spaces $ d : {\mathcal O} _ {X} \rightarrow \Omega _ {X} ^ {1} $. | ||
+ | If $ X = k ^ {n} $, | ||
+ | then $ \Omega _ {X} ^ {1} $ | ||
+ | is the free sheaf generated by $ dx _ {1} \dots dx _ {n} $, | ||
+ | where $ x _ {1} \dots x _ {n} $ | ||
+ | are the coordinates in $ k ^ {n} $. | ||
+ | If $ X $ | ||
+ | is an analytic subspace in $ k ^ {n} $, | ||
+ | defined by a sheaf of ideals $ J $, | ||
+ | then | ||
− | + | $$ | |
+ | \Omega _ {X} ^ {1} \cong \Omega _ {k ^ {n} } ^ {1} / ( J \Omega _ {k ^ {n} } ^ {1} + dJ) \mid _ {X} . | ||
+ | $$ | ||
− | + | Each analytic mapping $ f : X \rightarrow Y $ | |
+ | may be related to a sheaf of relative differentials $ \Omega _ {X/Y} ^ {1} $. | ||
+ | This is the analytic sheaf $ \Omega _ {X/Y} ^ {1} $ | ||
+ | inducing $ \Omega _ {X _ {s} } ^ {1} $ | ||
+ | on each fibre $ X _ {s} $( | ||
+ | $ s \in Y $) | ||
+ | of $ f $; | ||
+ | it is defined from the exact sequence | ||
− | + | $$ | |
+ | f ^ { * } \Omega _ {Y} ^ {1} \rightarrow \Omega _ {X} ^ {1} \rightarrow \Omega _ {X/Y} ^ {1} \rightarrow 0 . | ||
+ | $$ | ||
− | + | The sheaf $ \Theta _ {X} = \mathop{\rm Hom} _ { {\mathcal O} _ {X} } ( \Omega _ {X} ^ {1} , {\mathcal O} _ {X} ) $ | |
+ | is called the sheaf of germs of analytic vector fields on $ X $. | ||
+ | If $ X $ | ||
+ | is a manifold, $ \Omega _ {X} ^ {1} $ | ||
+ | and $ \Theta _ {X} $ | ||
+ | are locally free sheaves, which are naturally isomorphic to the sheaf of analytic sections of the cotangent and the tangent bundle over $ X $, | ||
+ | respectively. | ||
− | The | + | The analytic sheaves $ \Omega _ {X} ^ {p} = \wedge _ { {\mathcal O} _ {X} } ^ {p} \Omega _ {X} ^ {1} $ |
+ | are called sheaves of analytic exterior differential forms of degree $ p $ | ||
+ | on $ X $( | ||
+ | if $ k = \mathbf C $, | ||
+ | they are also called holomorphic forms). For any $ p\geq 0 $ | ||
+ | one may define a sheaf homomorphism of vector spaces $ d ^ {p} : \Omega _ {X} ^ {p} \rightarrow \Omega _ {X} ^ {p+} 1 $, | ||
+ | which for $ p= 0 $ | ||
+ | coincides with the one introduced above, and which satisfies the condition $ d ^ {p+} 1 d ^ {p} = 0 $. | ||
+ | The complex of sheaves $ ( \Omega _ {X} ^ {*} , d) $ | ||
+ | is called the de Rham complex of the space $ X $. | ||
+ | If $ X $ | ||
+ | is a manifold and $ k = \mathbf C $ | ||
+ | or $ \mathbf R $, | ||
+ | the de Rham complex is an exact complex of sheaves. If $ X $ | ||
+ | is a Stein manifold or a real-analytic manifold, the cohomology groups of the complex of sections $ \Gamma ( \Omega _ {X} ^ {*} ) $, | ||
+ | which is also often referred to as the de Rham complex, are isomorphic to $ H ^ {p} ( X , k) $. | ||
− | + | If $ X $ | |
+ | has singular points, the de Rham complex need not be exact. If $ k = \mathbf C $, | ||
+ | a sufficient condition for the exactness of the de Rham complex at a point $ x \in X $ | ||
+ | is the presence of a complex-analytic contractible neighbourhood at $ x $. | ||
+ | The hyperhomology groups of the complex $ \Gamma ( \Omega _ {X} ^ {*} ) $ | ||
+ | contain, for $ k= \mathbf C $, | ||
+ | the cohomology groups of the space $ X $ | ||
+ | with coefficients in $ \mathbf C $ | ||
+ | as direct summands, and are identical with them if $ X $ | ||
+ | is smooth. The sections of the sheaf $ \Theta _ {X} $ | ||
+ | are called analytic (and if $ k= \mathbf C $, | ||
+ | also holomorphic) vector fields on $ X $. | ||
+ | For any open $ U \subset X $ | ||
+ | the field $ Z \in \Gamma ( X , \Theta _ {X} ) $ | ||
+ | defines a derivation in the algebra of analytic functions $ \Gamma ( U , {\mathcal O} _ {X} ) $, | ||
+ | acting according to the formula $ \phi \rightarrow Z _ \phi = Z ( d \phi ) $. | ||
+ | If $ k= \mathbf C $ | ||
+ | or $ \mathbf R $, | ||
+ | then $ Z $ | ||
+ | defines a local one-parameter group $ \mathop{\rm exp} Z $ | ||
+ | of automorphisms of the space $ X $. | ||
+ | If, in addition, $ X $ | ||
+ | is compact, the group $ \mathop{\rm exp} Z $ | ||
+ | is globally definable. | ||
− | The | + | The space $ \Gamma ( X, \Theta _ {X} ) $ |
+ | provided with the Lie bracket is a Lie algebra over $ k $. | ||
+ | If $ X $ | ||
+ | is a compact complex space, $ \Gamma ( X, \Theta _ {X} ) $ | ||
+ | is the Lie algebra of the group $ \mathop{\rm Aut} X $. | ||
− | + | Differential operators on an analytic space $ ( X, {\mathcal O} _ {X} ) $ | |
+ | are defined in analogy to the differential operators on a module (cf. [[Differential operator on a module|Differential operator on a module]]). If $ F, G $ | ||
+ | are analytic sheaves on $ X $, | ||
+ | then a linear differential operator of order $ \leq l $, | ||
+ | acting from $ F $ | ||
+ | into $ G $, | ||
+ | is a sheaf homomorphism of vector spaces $ F \rightarrow G $ | ||
+ | which extends to an analytic homomorphism $ F \otimes \pi _ {1} ( {\mathcal O} _ {X \times X } / I ^ {l+} 1 ) \rightarrow G $. | ||
+ | If $ X $ | ||
+ | is smooth and $ F $ | ||
+ | and $ G $ | ||
+ | are locally free, this definition gives the usual concept of a differential operator on a vector bundle , [[#References|[4]]]. | ||
− | + | The germs of the linear differential operators $ F \rightarrow G $ | |
+ | form an analytic sheaf $ \mathop{\rm Diff} ( F, G) $ | ||
+ | with filtration | ||
− | + | $$ | |
+ | \mathop{\rm Diff} ^ {0} ( F, G) \subset \dots \subset \mathop{\rm Diff} ^ {l} ( F, G) \subset \dots , | ||
+ | $$ | ||
− | < | + | where $ \mathop{\rm Diff} ^ {l} ( F, G) $ |
+ | is the sheaf of germs of operators of order $ < l $. | ||
+ | In particular, $ \mathop{\rm Diff} ( {\mathcal O} , {\mathcal O} ) $ | ||
+ | is a filtered sheaf of associative algebras over $ k $ | ||
+ | under composition of mappings. One has | ||
− | + | $$ | |
+ | \mathop{\rm Diff} ^ {0} ( F, G) \cong \mathop{\rm Hom} _ {\mathcal O} ( F, G) , | ||
+ | $$ | ||
+ | |||
+ | $$ | ||
+ | \mathop{\rm Diff} ^ {1} ( {\mathcal O} , {\mathcal O} ) / | ||
+ | \mathop{\rm Diff} ^ {0} ( {\mathcal O} , {\mathcal O} ) \cong \Theta _ {X} . | ||
+ | $$ | ||
+ | |||
+ | The sheaf $ \mathop{\rm Diff} ( {\mathcal O} , {\mathcal O} ) $ | ||
+ | was studied (for the non-smooth case) only for certain special types of singular points. In particular, it was proved in the case of an irreducible one-dimensional [[Complex space|complex space]] $ X $ | ||
+ | that the sheaf of algebras $ \mathop{\rm Diff} ( {\mathcal O} , {\mathcal O} ) $ | ||
+ | and the corresponding sheaf of graded algebras have finite systems of generators [[#References|[5]]]. | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> B. Malgrange, "Analytic spaces" ''Enseign. Math. Ser. 2'' , '''14''' : 1 (1968) pp. 1–28</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> W. Kaup, "Infinitesimal Transformationsgruppen komplexer Räume" ''Math. Ann.'' , '''160''' : 1 (1965) pp. 72–92</TD></TR><TR><TD valign="top">[3a]</TD> <TD valign="top"> L. Schwartz, "Variedades analiticas complejas elipticas" , Univ. Nac. Colombia (1956)</TD></TR><TR><TD valign="top">[3b]</TD> <TD valign="top"> L. Schwartz, "Ecuaciones differenciales parciales" , Univ. Nac. Colombia (1956)</TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> R.O. Wells jr., "Differential analysis on complex manifolds" , Springer (1980)</TD></TR><TR><TD valign="top">[5]</TD> <TD valign="top"> Th. Bloom, "Differential operators on curves" ''Rice Univ. Stud.'' , '''59''' : 2 (1973) pp. 13–19</TD></TR><TR><TD valign="top">[6]</TD> <TD valign="top"> R. Berger, R. Kiehl, E. Kunz, H.-J. Nastold, "Differentialrechnung in der analytischen Geometrie" , Springer (1967)</TD></TR><TR><TD valign="top">[7]</TD> <TD valign="top"> G. Fischer, "Complex analytic geometry" , Springer (1976)</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> B. Malgrange, "Analytic spaces" ''Enseign. Math. Ser. 2'' , '''14''' : 1 (1968) pp. 1–28</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> W. Kaup, "Infinitesimal Transformationsgruppen komplexer Räume" ''Math. Ann.'' , '''160''' : 1 (1965) pp. 72–92</TD></TR><TR><TD valign="top">[3a]</TD> <TD valign="top"> L. Schwartz, "Variedades analiticas complejas elipticas" , Univ. Nac. Colombia (1956)</TD></TR><TR><TD valign="top">[3b]</TD> <TD valign="top"> L. Schwartz, "Ecuaciones differenciales parciales" , Univ. Nac. Colombia (1956)</TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> R.O. Wells jr., "Differential analysis on complex manifolds" , Springer (1980)</TD></TR><TR><TD valign="top">[5]</TD> <TD valign="top"> Th. Bloom, "Differential operators on curves" ''Rice Univ. Stud.'' , '''59''' : 2 (1973) pp. 13–19</TD></TR><TR><TD valign="top">[6]</TD> <TD valign="top"> R. Berger, R. Kiehl, E. Kunz, H.-J. Nastold, "Differentialrechnung in der analytischen Geometrie" , Springer (1967)</TD></TR><TR><TD valign="top">[7]</TD> <TD valign="top"> G. Fischer, "Complex analytic geometry" , Springer (1976)</TD></TR></table> |
Revision as of 17:33, 5 June 2020
A generalization of the classical calculus of differential forms and differential operators to analytic spaces. For the calculus of differential forms on complex manifolds see Differential form. Let $ ( X, {\mathcal O} _ {X} ) $
be an analytic space over a field $ k $,
let $ \Delta $
be the diagonal in $ X \times X $,
let $ J $
be the sheaf of ideals defining $ \Delta $
and generated by all germs of the form $ \pi _ {1} ^ {*} f - \pi _ {2} ^ {*} f $,
where $ f $
is an arbitrary germ from $ {\mathcal O} _ {X} $,
and let $ \pi _ {i} : X \times X \rightarrow X $
be projection on the $ i $-
th factor.
The analytic sheaf $ \pi _ {1} ( J / J ^ {2} ) = \Omega _ {X} ^ {1} $ is known as the sheaf of analytic differential forms of the first order on $ X $. If $ f $ is the germ of an analytic function on $ X $, then the germ $ \pi _ {1} ^ {*} f - \pi _ {2} ^ {*} f $ belongs to $ J $ and defines the element $ df $ of $ \Omega _ {X} ^ {1} $ known as the differential of the germ $ f $. This defines a sheaf homomorphism of vector spaces $ d : {\mathcal O} _ {X} \rightarrow \Omega _ {X} ^ {1} $. If $ X = k ^ {n} $, then $ \Omega _ {X} ^ {1} $ is the free sheaf generated by $ dx _ {1} \dots dx _ {n} $, where $ x _ {1} \dots x _ {n} $ are the coordinates in $ k ^ {n} $. If $ X $ is an analytic subspace in $ k ^ {n} $, defined by a sheaf of ideals $ J $, then
$$ \Omega _ {X} ^ {1} \cong \Omega _ {k ^ {n} } ^ {1} / ( J \Omega _ {k ^ {n} } ^ {1} + dJ) \mid _ {X} . $$
Each analytic mapping $ f : X \rightarrow Y $ may be related to a sheaf of relative differentials $ \Omega _ {X/Y} ^ {1} $. This is the analytic sheaf $ \Omega _ {X/Y} ^ {1} $ inducing $ \Omega _ {X _ {s} } ^ {1} $ on each fibre $ X _ {s} $( $ s \in Y $) of $ f $; it is defined from the exact sequence
$$ f ^ { * } \Omega _ {Y} ^ {1} \rightarrow \Omega _ {X} ^ {1} \rightarrow \Omega _ {X/Y} ^ {1} \rightarrow 0 . $$
The sheaf $ \Theta _ {X} = \mathop{\rm Hom} _ { {\mathcal O} _ {X} } ( \Omega _ {X} ^ {1} , {\mathcal O} _ {X} ) $ is called the sheaf of germs of analytic vector fields on $ X $. If $ X $ is a manifold, $ \Omega _ {X} ^ {1} $ and $ \Theta _ {X} $ are locally free sheaves, which are naturally isomorphic to the sheaf of analytic sections of the cotangent and the tangent bundle over $ X $, respectively.
The analytic sheaves $ \Omega _ {X} ^ {p} = \wedge _ { {\mathcal O} _ {X} } ^ {p} \Omega _ {X} ^ {1} $ are called sheaves of analytic exterior differential forms of degree $ p $ on $ X $( if $ k = \mathbf C $, they are also called holomorphic forms). For any $ p\geq 0 $ one may define a sheaf homomorphism of vector spaces $ d ^ {p} : \Omega _ {X} ^ {p} \rightarrow \Omega _ {X} ^ {p+} 1 $, which for $ p= 0 $ coincides with the one introduced above, and which satisfies the condition $ d ^ {p+} 1 d ^ {p} = 0 $. The complex of sheaves $ ( \Omega _ {X} ^ {*} , d) $ is called the de Rham complex of the space $ X $. If $ X $ is a manifold and $ k = \mathbf C $ or $ \mathbf R $, the de Rham complex is an exact complex of sheaves. If $ X $ is a Stein manifold or a real-analytic manifold, the cohomology groups of the complex of sections $ \Gamma ( \Omega _ {X} ^ {*} ) $, which is also often referred to as the de Rham complex, are isomorphic to $ H ^ {p} ( X , k) $.
If $ X $ has singular points, the de Rham complex need not be exact. If $ k = \mathbf C $, a sufficient condition for the exactness of the de Rham complex at a point $ x \in X $ is the presence of a complex-analytic contractible neighbourhood at $ x $. The hyperhomology groups of the complex $ \Gamma ( \Omega _ {X} ^ {*} ) $ contain, for $ k= \mathbf C $, the cohomology groups of the space $ X $ with coefficients in $ \mathbf C $ as direct summands, and are identical with them if $ X $ is smooth. The sections of the sheaf $ \Theta _ {X} $ are called analytic (and if $ k= \mathbf C $, also holomorphic) vector fields on $ X $. For any open $ U \subset X $ the field $ Z \in \Gamma ( X , \Theta _ {X} ) $ defines a derivation in the algebra of analytic functions $ \Gamma ( U , {\mathcal O} _ {X} ) $, acting according to the formula $ \phi \rightarrow Z _ \phi = Z ( d \phi ) $. If $ k= \mathbf C $ or $ \mathbf R $, then $ Z $ defines a local one-parameter group $ \mathop{\rm exp} Z $ of automorphisms of the space $ X $. If, in addition, $ X $ is compact, the group $ \mathop{\rm exp} Z $ is globally definable.
The space $ \Gamma ( X, \Theta _ {X} ) $ provided with the Lie bracket is a Lie algebra over $ k $. If $ X $ is a compact complex space, $ \Gamma ( X, \Theta _ {X} ) $ is the Lie algebra of the group $ \mathop{\rm Aut} X $.
Differential operators on an analytic space $ ( X, {\mathcal O} _ {X} ) $ are defined in analogy to the differential operators on a module (cf. Differential operator on a module). If $ F, G $ are analytic sheaves on $ X $, then a linear differential operator of order $ \leq l $, acting from $ F $ into $ G $, is a sheaf homomorphism of vector spaces $ F \rightarrow G $ which extends to an analytic homomorphism $ F \otimes \pi _ {1} ( {\mathcal O} _ {X \times X } / I ^ {l+} 1 ) \rightarrow G $. If $ X $ is smooth and $ F $ and $ G $ are locally free, this definition gives the usual concept of a differential operator on a vector bundle , [4].
The germs of the linear differential operators $ F \rightarrow G $ form an analytic sheaf $ \mathop{\rm Diff} ( F, G) $ with filtration
$$ \mathop{\rm Diff} ^ {0} ( F, G) \subset \dots \subset \mathop{\rm Diff} ^ {l} ( F, G) \subset \dots , $$
where $ \mathop{\rm Diff} ^ {l} ( F, G) $ is the sheaf of germs of operators of order $ < l $. In particular, $ \mathop{\rm Diff} ( {\mathcal O} , {\mathcal O} ) $ is a filtered sheaf of associative algebras over $ k $ under composition of mappings. One has
$$ \mathop{\rm Diff} ^ {0} ( F, G) \cong \mathop{\rm Hom} _ {\mathcal O} ( F, G) , $$
$$ \mathop{\rm Diff} ^ {1} ( {\mathcal O} , {\mathcal O} ) / \mathop{\rm Diff} ^ {0} ( {\mathcal O} , {\mathcal O} ) \cong \Theta _ {X} . $$
The sheaf $ \mathop{\rm Diff} ( {\mathcal O} , {\mathcal O} ) $ was studied (for the non-smooth case) only for certain special types of singular points. In particular, it was proved in the case of an irreducible one-dimensional complex space $ X $ that the sheaf of algebras $ \mathop{\rm Diff} ( {\mathcal O} , {\mathcal O} ) $ and the corresponding sheaf of graded algebras have finite systems of generators [5].
References
[1] | B. Malgrange, "Analytic spaces" Enseign. Math. Ser. 2 , 14 : 1 (1968) pp. 1–28 |
[2] | W. Kaup, "Infinitesimal Transformationsgruppen komplexer Räume" Math. Ann. , 160 : 1 (1965) pp. 72–92 |
[3a] | L. Schwartz, "Variedades analiticas complejas elipticas" , Univ. Nac. Colombia (1956) |
[3b] | L. Schwartz, "Ecuaciones differenciales parciales" , Univ. Nac. Colombia (1956) |
[4] | R.O. Wells jr., "Differential analysis on complex manifolds" , Springer (1980) |
[5] | Th. Bloom, "Differential operators on curves" Rice Univ. Stud. , 59 : 2 (1973) pp. 13–19 |
[6] | R. Berger, R. Kiehl, E. Kunz, H.-J. Nastold, "Differentialrechnung in der analytischen Geometrie" , Springer (1967) |
[7] | G. Fischer, "Complex analytic geometry" , Springer (1976) |
Differential calculus (on analytic spaces). Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Differential_calculus_(on_analytic_spaces)&oldid=46663