Difference between revisions of "Almost-complex structure"
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− | + | A tensor field $ I $ | |
+ | of linear transformations of the tangent spaces on a manifold $ M $ | ||
+ | satisfying the condition | ||
− | + | $$ | |
+ | I ^ {2} = - \mathop{\rm id} , | ||
+ | $$ | ||
− | + | i.e. a field of complex structures in the tangent spaces $ T _ {p} M $, | |
+ | $ p \in M $. | ||
+ | An almost-complex structure $ I $ | ||
+ | determines a decomposition $ T ^ {\mathbf C } M = V _ {+} + V _ {-} $ | ||
+ | of the complexification $ T ^ {\mathbf C } M $ | ||
+ | of the tangent bundle in a direct sum of two complex mutually-conjugate subbundles $ V _ {+} $ | ||
+ | and $ V _ {-} $ | ||
+ | consisting of eigen vectors of the affinor $ I $( | ||
+ | extended by linearity on $ T ^ {\mathbf C } M $) | ||
+ | with eigen values $ i $ | ||
+ | and $ -i $, | ||
+ | respectively. Conversely, a decomposition of $ T ^ {\mathbf C } M $ | ||
+ | in a direct sum of mutually-conjugate vector subbundles $ S , \overline{S}\; $ | ||
+ | defines an almost-complex structure on $ M $ | ||
+ | for which $ V _ {+} = S $. | ||
− | + | An almost-complex structure $ I $ | |
+ | is called integrable if it is induced by a complex structure on $ M $, | ||
+ | i.e. if there exists an atlas of admissible charts of the manifold $ M $ | ||
+ | in which the field $ I $ | ||
+ | has constant coordinates $ I _ {k} ^ {j} $. | ||
+ | A necessary and sufficient condition for the integrability of an almost-complex structure is that the subbundle $ V _ {+} $ | ||
+ | is involutive, i.e. that the space of its sections is closed with respect to commutation of (complex) vector fields. The condition for the subbundle $ V _ {+} $ | ||
+ | to be involutive is equivalent to the vanishing of the vector-valued $ 2 $- | ||
+ | form $ N ( I , I ) $ | ||
+ | associated with $ I $ | ||
+ | and given by the formula | ||
− | + | $$ | |
+ | N ( I , I ) ( X , Y ) = [ I X , I Y ] - I | ||
+ | [ X , I Y ] - I [ I , X Y ] - [ X , Y ] , | ||
+ | $$ | ||
− | where | + | where $ X $ |
+ | and $ Y $ | ||
+ | vector fields. This form is called the torsion tensor, or the Nijenhuis tensor, of the almost-complex structure. The torsion tensor $ N ( I , I ) $ | ||
+ | can be considered as first-order differentiation on the algebra of differential forms on $ M $ | ||
+ | of the form | ||
− | + | $$ | |
+ | N ( I , I ) = [ I , [ I , d ] ] + d , | ||
+ | $$ | ||
− | + | where $ d $ | |
+ | is the exterior differential and $ I $ | ||
+ | is considered as a differentiation of order zero. | ||
+ | |||
+ | From the point of view of the theory of $ G $- | ||
+ | structures an almost-complex structure is a $ \mathop{\rm GL} ( m , \mathbf C ) $- | ||
+ | structure, where $ m = (1 / 2 ) \mathop{\rm dim} M $, | ||
+ | and the torsion tensor $ N ( I , I ) $ | ||
+ | is the tensor defined by the first structure function of this structure. A $ \mathop{\rm GL} ( m , \mathbf C ) $- | ||
+ | structure is a structure of elliptic type, therefore the Lie algebra of infinitesimal automorphisms of an almost-complex structure satisfies a second-order system of elliptic differential equations [[#References|[1]]]. In particular, the Lie algebra of infinitesimal automorphisms of an almost-complex structure on a compact manifold is finite-dimensional, and the group $ G $ | ||
+ | of all automorphisms of a compact manifold with an almost-complex structure is a Lie group. For non-compact manifolds this statement is, in general, not true. | ||
+ | |||
+ | If the automorphism group $ G $ | ||
+ | acts transitively on the manifold $ M $, | ||
+ | then the almost-complex structure $ I $ | ||
+ | is uniquely defined by its value $ I _ {p} $ | ||
+ | at a fixed point $ p \in M $. | ||
+ | This represents an invariant complex structure in the tangent space $ T _ {p} M $ | ||
+ | relative to the isotropic representation (see [[Invariant object|Invariant object]] on a homogeneous space). Methods of the theory of Lie groups allow one to construct a wide class of homogeneous spaces having an invariant almost-complex structure (both integrable and non-integrable) and to classify invariant almost-complex structures under different assumptions (see [[#References|[2]]]). For instance, any quotient space $ G / H $ | ||
+ | of a Lie group $ G $ | ||
+ | by the subgroup $ H $ | ||
+ | consisting of fixed points of an automorphism of even order of $ G $ | ||
+ | has an invariant almost-complex structure. An example is the $ 6 $- | ||
+ | dimensional sphere $ S ^ {6} $, | ||
+ | considered as the homogeneous space $ G _ {2} / \mathop{\rm SU} (3) $; | ||
+ | none of the invariant almost-complex structures on $ S ^ {6} $ | ||
+ | is integrable. | ||
The existence of an almost-complex structure on a manifold imposes certain restrictions on its topology — it must be of even dimension, oriented, and in the compact case all its odd-dimensional Stiefel–Whitney classes must vanish. Among the spheres only the spheres of dimensions 2 and 6 admit an almost-complex structure. | The existence of an almost-complex structure on a manifold imposes certain restrictions on its topology — it must be of even dimension, oriented, and in the compact case all its odd-dimensional Stiefel–Whitney classes must vanish. Among the spheres only the spheres of dimensions 2 and 6 admit an almost-complex structure. | ||
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====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> S. Kobayashi, "Transformation groups in differential geometry" , Springer (1972)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> B.P. Komrakov, "Structure on manifolds and homogeneous spaces" , Minsk (1978) (In Russian)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> A. Lichnerowicz, "Global theory of connections and holonomy groups" , Noordhoff (1976) (Translated from French)</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"> L. Hörmander, "An introduction to complex analysis in several variables" , North-Holland (1973)</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> S. Kobayashi, "Transformation groups in differential geometry" , Springer (1972)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> B.P. Komrakov, "Structure on manifolds and homogeneous spaces" , Minsk (1978) (In Russian)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> A. Lichnerowicz, "Global theory of connections and holonomy groups" , Noordhoff (1976) (Translated from French)</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"> L. Hörmander, "An introduction to complex analysis in several variables" , North-Holland (1973)</TD></TR></table> | ||
− | |||
− | |||
====Comments==== | ====Comments==== |
Latest revision as of 16:10, 1 April 2020
A tensor field $ I $
of linear transformations of the tangent spaces on a manifold $ M $
satisfying the condition
$$ I ^ {2} = - \mathop{\rm id} , $$
i.e. a field of complex structures in the tangent spaces $ T _ {p} M $, $ p \in M $. An almost-complex structure $ I $ determines a decomposition $ T ^ {\mathbf C } M = V _ {+} + V _ {-} $ of the complexification $ T ^ {\mathbf C } M $ of the tangent bundle in a direct sum of two complex mutually-conjugate subbundles $ V _ {+} $ and $ V _ {-} $ consisting of eigen vectors of the affinor $ I $( extended by linearity on $ T ^ {\mathbf C } M $) with eigen values $ i $ and $ -i $, respectively. Conversely, a decomposition of $ T ^ {\mathbf C } M $ in a direct sum of mutually-conjugate vector subbundles $ S , \overline{S}\; $ defines an almost-complex structure on $ M $ for which $ V _ {+} = S $.
An almost-complex structure $ I $ is called integrable if it is induced by a complex structure on $ M $, i.e. if there exists an atlas of admissible charts of the manifold $ M $ in which the field $ I $ has constant coordinates $ I _ {k} ^ {j} $. A necessary and sufficient condition for the integrability of an almost-complex structure is that the subbundle $ V _ {+} $ is involutive, i.e. that the space of its sections is closed with respect to commutation of (complex) vector fields. The condition for the subbundle $ V _ {+} $ to be involutive is equivalent to the vanishing of the vector-valued $ 2 $- form $ N ( I , I ) $ associated with $ I $ and given by the formula
$$ N ( I , I ) ( X , Y ) = [ I X , I Y ] - I [ X , I Y ] - I [ I , X Y ] - [ X , Y ] , $$
where $ X $ and $ Y $ vector fields. This form is called the torsion tensor, or the Nijenhuis tensor, of the almost-complex structure. The torsion tensor $ N ( I , I ) $ can be considered as first-order differentiation on the algebra of differential forms on $ M $ of the form
$$ N ( I , I ) = [ I , [ I , d ] ] + d , $$
where $ d $ is the exterior differential and $ I $ is considered as a differentiation of order zero.
From the point of view of the theory of $ G $- structures an almost-complex structure is a $ \mathop{\rm GL} ( m , \mathbf C ) $- structure, where $ m = (1 / 2 ) \mathop{\rm dim} M $, and the torsion tensor $ N ( I , I ) $ is the tensor defined by the first structure function of this structure. A $ \mathop{\rm GL} ( m , \mathbf C ) $- structure is a structure of elliptic type, therefore the Lie algebra of infinitesimal automorphisms of an almost-complex structure satisfies a second-order system of elliptic differential equations [1]. In particular, the Lie algebra of infinitesimal automorphisms of an almost-complex structure on a compact manifold is finite-dimensional, and the group $ G $ of all automorphisms of a compact manifold with an almost-complex structure is a Lie group. For non-compact manifolds this statement is, in general, not true.
If the automorphism group $ G $ acts transitively on the manifold $ M $, then the almost-complex structure $ I $ is uniquely defined by its value $ I _ {p} $ at a fixed point $ p \in M $. This represents an invariant complex structure in the tangent space $ T _ {p} M $ relative to the isotropic representation (see Invariant object on a homogeneous space). Methods of the theory of Lie groups allow one to construct a wide class of homogeneous spaces having an invariant almost-complex structure (both integrable and non-integrable) and to classify invariant almost-complex structures under different assumptions (see [2]). For instance, any quotient space $ G / H $ of a Lie group $ G $ by the subgroup $ H $ consisting of fixed points of an automorphism of even order of $ G $ has an invariant almost-complex structure. An example is the $ 6 $- dimensional sphere $ S ^ {6} $, considered as the homogeneous space $ G _ {2} / \mathop{\rm SU} (3) $; none of the invariant almost-complex structures on $ S ^ {6} $ is integrable.
The existence of an almost-complex structure on a manifold imposes certain restrictions on its topology — it must be of even dimension, oriented, and in the compact case all its odd-dimensional Stiefel–Whitney classes must vanish. Among the spheres only the spheres of dimensions 2 and 6 admit an almost-complex structure.
References
[1] | S. Kobayashi, "Transformation groups in differential geometry" , Springer (1972) |
[2] | B.P. Komrakov, "Structure on manifolds and homogeneous spaces" , Minsk (1978) (In Russian) |
[3] | A. Lichnerowicz, "Global theory of connections and holonomy groups" , Noordhoff (1976) (Translated from French) |
[4] | R.O. Wells jr., "Differential analysis on complex manifolds" , Springer (1980) |
[5] | L. Hörmander, "An introduction to complex analysis in several variables" , North-Holland (1973) |
Comments
The theorem that an almost-complex structure is integrable, i.e. comes from a complex structure, if and only if its Nijenhuis tensor vanishes, is due to A. Newlander and L. Nirenberg [a1].
References
[a1] | A. Newlander, L. Nirenberg, "Complex analytic coordinates in almost complex manifolds" Ann. of Math. , 65 (1957) pp. 391–404 |
Almost-complex structure. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Almost-complex_structure&oldid=17647