Difference between revisions of "Hypersurface"
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| + | A generalization of the concept of an ordinary surface in three-dimensional space to the case of an $ n $- | ||
| + | dimensional space. The dimension of a hypersurface is one less than that of its ambient space. | ||
| + | If $ M $ | ||
| + | and $ N $ | ||
| + | are differentiable manifolds, $ \mathop{\rm dim} N - \mathop{\rm dim} M = 1 $, | ||
| + | and if an immersion $ f: M \rightarrow N $ | ||
| + | has been defined, then $ f( M) $ | ||
| + | is a hypersurface in $ N $. | ||
| + | Here $ f $ | ||
| + | is a differentiable mapping whose differential $ df $ | ||
| + | at any point $ x \in M $ | ||
| + | is an injective mapping of the tangent space $ M _ {x} $ | ||
| + | to $ M $ | ||
| + | at $ x $ | ||
| + | into the tangent space $ N _ {f(} x) $ | ||
| + | to $ N $ | ||
| + | at $ f( x) $. | ||
====Comments==== | ====Comments==== | ||
| + | ====References==== | ||
| + | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> M. Spivak, "A comprehensive introduction to differential geometry" , '''1979''' , Publish or Perish (1975) pp. 1–5 {{MR|0394453}} {{MR|0394452}} {{MR|0372756}} {{ZBL|0306.53003}} {{ZBL|0306.53002}} {{ZBL|0306.53001}} </TD></TR></table> | ||
| − | + | An algebraic hypersurface is a subvariety of an algebraic variety that is locally defined by one equation. An algebraic hypersurface in the affine space $ A _ {k} ^ {n} $ | |
| − | + | over a field $ k $ | |
| + | is globally defined by one equation | ||
| − | + | $$ | |
| + | f ( x _ {1} \dots x _ {n} ) = 0. | ||
| + | $$ | ||
| − | + | An algebraic hypersurface $ W $ | |
| + | in a projective space $ P ^ {n} $ | ||
| + | is defined by an equation | ||
| − | + | $$ | |
| + | F ( x _ {0} \dots x _ {n} ) = 0, | ||
| + | $$ | ||
| − | + | where $ F $ | |
| + | is a homogeneous form in $ n + 1 $ | ||
| + | variables. The degree $ m $ | ||
| + | of this form is said to be the degree (order) of the hypersurface. A closed subscheme $ W $ | ||
| + | of a scheme $ V $ | ||
| + | is said to be a hypersurface if the corresponding sheaf of ideals $ I _ {W} \subset {\mathcal O} _ {V} $ | ||
| + | is a sheaf of principal ideals. For a connected non-singular algebraic variety this condition means that the codimension of $ W $ | ||
| + | in $ V $ | ||
| + | is one. For each non-singular algebraic hypersurface $ W \subset P _ {k} ^ {n} $ | ||
| + | of order $ m $( | ||
| + | often denoted by $ V _ {n} ^ {m} $) | ||
| + | the following holds: | ||
| − | + | a) the canonical class $ K _ {W} $ | |
| + | is equal to $ ( m - n - 1 ) H _ {W} $ | ||
| + | where $ H _ {W} $ | ||
| + | is the class of a hyperplane section of $ W $; | ||
| − | + | b) the cohomology groups $ H ^ {i} ( W, {\mathcal O} _ {W} ) = 0 $ | |
| + | for $ i \neq 0, n - 1 $, | ||
| + | and | ||
| − | + | $$ | |
| + | \mathop{\rm dim} _ {k} H ^ {n - 1 } ( W, {\mathcal O} _ {W} ) = \ | ||
| − | + | \frac{( m - 1) \dots ( m - n) }{n! } | |
| + | ; | ||
| + | $$ | ||
| − | c) if | + | c) if $ n \geq 3 $, |
| + | the fundamental group (algebraic or topological if $ k = \mathbf C $) | ||
| + | $ \pi _ {1} ( W) = 0 $; | ||
| − | d) if | + | d) if $ n \geq 4 $, |
| + | the Picard group $ \mathop{\rm Pic} ( W) \simeq \mathbf Z $ | ||
| + | and is generated by the class of a hyperplane section. | ||
''I.V. Dolgachev'' | ''I.V. Dolgachev'' | ||
| Line 37: | Line 94: | ||
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> | + | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> J. Carlson, P. Griffiths, "Infinitesimal variations of Hodge structure and the global Torelli problem" A. Beauville (ed.) , ''Algebraic geometry (Angers, 1979)'' , Sijthoff & Noordhoff (1980) pp. 51–76 {{MR|0605336}} {{ZBL|0479.14007}} </TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top"> R. Donagi, "Generic Torelli for projective hypersurfaces" ''Compos. Math.'' , '''50''' (1983) pp. 325–353 {{MR|0720291}} {{ZBL|0598.14007}} </TD></TR><TR><TD valign="top">[a3]</TD> <TD valign="top"> R. Hartshorne, "Algebraic geometry" , Springer (1977) pp. 13; 170; 316; 381 {{MR|0463157}} {{ZBL|0367.14001}} </TD></TR></table> |
| − | An analytic hypersurface is a set | + | An analytic hypersurface is a set $ S $ |
| + | in a complex Euclidean space $ \mathbf C ^ {n} $ | ||
| + | that, in a neighbourhood of each of its points $ \zeta \in S $, | ||
| + | is defined by an equation $ f _ \zeta ( z, t) = 0 $, | ||
| + | where the function $ f _ \zeta ( z, t) $ | ||
| + | is continuous with respect to the parameter $ t \in ( - \epsilon , \epsilon ) $, | ||
| + | $ \epsilon > 0 $, | ||
| + | and, for each fixed $ t $, | ||
| + | is holomorphic in $ z $ | ||
| + | in a neighbourhood $ U _ \zeta \ni \zeta $ | ||
| + | which is independent of $ t $; | ||
| + | moreover, $ \sum | \partial f/ \partial z _ {j} | \neq 0 $ | ||
| + | for all $ ( z, t) \in U _ \zeta \times ( - \epsilon , \epsilon ) $. | ||
| + | In other words, an analytic hypersurface is a set in $ \mathbf C ^ {n} $ | ||
| + | that is locally the union of a continuous one-parameter family of complex-analytic surfaces of complex codimension one. For instance, if a function $ f $ | ||
| + | is holomorphic in a domain $ D \subset \mathbf C ^ {n} $ | ||
| + | and $ \mathop{\rm grad} f \neq 0 $ | ||
| + | in $ D $, | ||
| + | then the sets $ | f | = 1 $, | ||
| + | $ \mathop{\rm Re} f = 0 $, | ||
| + | etc., are analytic hypersurfaces. | ||
| − | A twice-differentiable hypersurface | + | A twice-differentiable hypersurface $ S $ |
| + | in $ \mathbf R ^ {2n} = \mathbf C ^ {n} $ | ||
| + | is an analytic hypersurface if and only if its Levi form vanishes identically on $ S $ | ||
| + | or if $ S $ | ||
| + | is locally pseudo-convex on both sides. | ||
''E.M. Chirka'' | ''E.M. Chirka'' | ||
====Comments==== | ====Comments==== | ||
| − | Sometimes the phrase | + | Sometimes the phrase "analytic hypersurface" is also used for an [[Analytic set|analytic set]] of complex codimension 1, analogously to 3) above, cf. [[#References|[a1]]]. An analytic hypersurface as in 4) is also called a foliation by analytic varieties of codimension 1. The result concerning a twice-differentiable $ S \subset \mathbf R ^ {2n} $, |
| + | mentioned above, can be found in [[#References|[a2]]]. | ||
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> | + | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> H. Grauert, R. Remmert, "Theory of Stein spaces" , Springer (1977) (Translated from German) {{MR|0513229}} {{ZBL|0379.32001}} </TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top"> V.S. Vladimirov, "Methods of the theory of functions of several complex variables" , M.I.T. (1966) (Translated from Russian)</TD></TR><TR><TD valign="top">[a3]</TD> <TD valign="top"> L. Kaup, B. Kaup, "Holomorphic functions of several variables" , de Gruyter (1983) (Translated from German) {{MR|0716497}} {{ZBL|0528.32001}} </TD></TR></table> |
Latest revision as of 22:11, 5 June 2020
A generalization of the concept of an ordinary surface in three-dimensional space to the case of an $ n $-
dimensional space. The dimension of a hypersurface is one less than that of its ambient space.
If $ M $ and $ N $ are differentiable manifolds, $ \mathop{\rm dim} N - \mathop{\rm dim} M = 1 $, and if an immersion $ f: M \rightarrow N $ has been defined, then $ f( M) $ is a hypersurface in $ N $. Here $ f $ is a differentiable mapping whose differential $ df $ at any point $ x \in M $ is an injective mapping of the tangent space $ M _ {x} $ to $ M $ at $ x $ into the tangent space $ N _ {f(} x) $ to $ N $ at $ f( x) $.
Comments
References
| [a1] | M. Spivak, "A comprehensive introduction to differential geometry" , 1979 , Publish or Perish (1975) pp. 1–5 MR0394453 MR0394452 MR0372756 Zbl 0306.53003 Zbl 0306.53002 Zbl 0306.53001 |
An algebraic hypersurface is a subvariety of an algebraic variety that is locally defined by one equation. An algebraic hypersurface in the affine space $ A _ {k} ^ {n} $ over a field $ k $ is globally defined by one equation
$$ f ( x _ {1} \dots x _ {n} ) = 0. $$
An algebraic hypersurface $ W $ in a projective space $ P ^ {n} $ is defined by an equation
$$ F ( x _ {0} \dots x _ {n} ) = 0, $$
where $ F $ is a homogeneous form in $ n + 1 $ variables. The degree $ m $ of this form is said to be the degree (order) of the hypersurface. A closed subscheme $ W $ of a scheme $ V $ is said to be a hypersurface if the corresponding sheaf of ideals $ I _ {W} \subset {\mathcal O} _ {V} $ is a sheaf of principal ideals. For a connected non-singular algebraic variety this condition means that the codimension of $ W $ in $ V $ is one. For each non-singular algebraic hypersurface $ W \subset P _ {k} ^ {n} $ of order $ m $( often denoted by $ V _ {n} ^ {m} $) the following holds:
a) the canonical class $ K _ {W} $ is equal to $ ( m - n - 1 ) H _ {W} $ where $ H _ {W} $ is the class of a hyperplane section of $ W $;
b) the cohomology groups $ H ^ {i} ( W, {\mathcal O} _ {W} ) = 0 $ for $ i \neq 0, n - 1 $, and
$$ \mathop{\rm dim} _ {k} H ^ {n - 1 } ( W, {\mathcal O} _ {W} ) = \ \frac{( m - 1) \dots ( m - n) }{n! } ; $$
c) if $ n \geq 3 $, the fundamental group (algebraic or topological if $ k = \mathbf C $) $ \pi _ {1} ( W) = 0 $;
d) if $ n \geq 4 $, the Picard group $ \mathop{\rm Pic} ( W) \simeq \mathbf Z $ and is generated by the class of a hyperplane section.
I.V. Dolgachev
Comments
The cohomology ring of a smooth complex projective hypersurface can be expressed completely in terms of rational differential forms on the ambient projective space, [a1]. In most cases, the period mapping for these hypersurfaces has been shown to be of degree one [a2].
References
| [a1] | J. Carlson, P. Griffiths, "Infinitesimal variations of Hodge structure and the global Torelli problem" A. Beauville (ed.) , Algebraic geometry (Angers, 1979) , Sijthoff & Noordhoff (1980) pp. 51–76 MR0605336 Zbl 0479.14007 |
| [a2] | R. Donagi, "Generic Torelli for projective hypersurfaces" Compos. Math. , 50 (1983) pp. 325–353 MR0720291 Zbl 0598.14007 |
| [a3] | R. Hartshorne, "Algebraic geometry" , Springer (1977) pp. 13; 170; 316; 381 MR0463157 Zbl 0367.14001 |
An analytic hypersurface is a set $ S $ in a complex Euclidean space $ \mathbf C ^ {n} $ that, in a neighbourhood of each of its points $ \zeta \in S $, is defined by an equation $ f _ \zeta ( z, t) = 0 $, where the function $ f _ \zeta ( z, t) $ is continuous with respect to the parameter $ t \in ( - \epsilon , \epsilon ) $, $ \epsilon > 0 $, and, for each fixed $ t $, is holomorphic in $ z $ in a neighbourhood $ U _ \zeta \ni \zeta $ which is independent of $ t $; moreover, $ \sum | \partial f/ \partial z _ {j} | \neq 0 $ for all $ ( z, t) \in U _ \zeta \times ( - \epsilon , \epsilon ) $. In other words, an analytic hypersurface is a set in $ \mathbf C ^ {n} $ that is locally the union of a continuous one-parameter family of complex-analytic surfaces of complex codimension one. For instance, if a function $ f $ is holomorphic in a domain $ D \subset \mathbf C ^ {n} $ and $ \mathop{\rm grad} f \neq 0 $ in $ D $, then the sets $ | f | = 1 $, $ \mathop{\rm Re} f = 0 $, etc., are analytic hypersurfaces.
A twice-differentiable hypersurface $ S $ in $ \mathbf R ^ {2n} = \mathbf C ^ {n} $ is an analytic hypersurface if and only if its Levi form vanishes identically on $ S $ or if $ S $ is locally pseudo-convex on both sides.
E.M. Chirka
Comments
Sometimes the phrase "analytic hypersurface" is also used for an analytic set of complex codimension 1, analogously to 3) above, cf. [a1]. An analytic hypersurface as in 4) is also called a foliation by analytic varieties of codimension 1. The result concerning a twice-differentiable $ S \subset \mathbf R ^ {2n} $, mentioned above, can be found in [a2].
References
| [a1] | H. Grauert, R. Remmert, "Theory of Stein spaces" , Springer (1977) (Translated from German) MR0513229 Zbl 0379.32001 |
| [a2] | V.S. Vladimirov, "Methods of the theory of functions of several complex variables" , M.I.T. (1966) (Translated from Russian) |
| [a3] | L. Kaup, B. Kaup, "Holomorphic functions of several variables" , de Gruyter (1983) (Translated from German) MR0716497 Zbl 0528.32001 |
How to Cite This Entry:
Hypersurface. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hypersurface&oldid=14567
Hypersurface. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hypersurface&oldid=14567
This article was adapted from an original article by V.T. Bazylev (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article