Linear complex structure

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In mathematics, a complex structure on a real vector space is an automorphism of that squares to the minus identity, . Such a structure on allows one to define multiplication by complex scalars in a canonical fashion so as to regard as a complex vector space.

Every complex vector space can be equipped with a compatible complex structure in a canonical way; however, there is in general no canonical complex structure. Complex structures have applications in representation theory as well as in complex geometry where they play an essential role in the definition of almost complex manifolds, by contrast to complex manifolds. The term "complex structure" often refers to this structure on manifolds; when it refers instead to a structure on vector spaces, it may be called a linear complex structure.

Definition and properties

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A complex structure on a real vector space   is a real linear transformation   such that   Here   means   composed with itself and   is the identity map on  . That is, the effect of applying   twice is the same as multiplication by  . This is reminiscent of multiplication by the imaginary unit,  . A complex structure allows one to endow   with the structure of a complex vector space. Complex scalar multiplication can be defined by   for all real numbers   and all vectors   in V. One can check that this does, in fact, give   the structure of a complex vector space which we denote  .

Going in the other direction, if one starts with a complex vector space   then one can define a complex structure on the underlying real space by defining  .

More formally, a linear complex structure on a real vector space is an algebra representation of the complex numbers  , thought of as an associative algebra over the real numbers. This algebra is realized concretely as   which corresponds to  . Then a representation of   is a real vector space  , together with an action of   on   (a map  ). Concretely, this is just an action of  , as this generates the algebra, and the operator representing   (the image of   in  ) is exactly  .

If   has complex dimension  , then   must have real dimension  . That is, a finite-dimensional space   admits a complex structure only if it is even-dimensional. It is not hard to see that every even-dimensional vector space admits a complex structure. One can define   on pairs   of basis vectors by   and   and then extend by linearity to all of  . If   is a basis for the complex vector space   then   is a basis for the underlying real space  .

A real linear transformation   is a complex linear transformation of the corresponding complex space   if and only if   commutes with  , i.e. if and only if   Likewise, a real subspace   of   is a complex subspace of   if and only if   preserves  , i.e. if and only if  

Examples

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Elementary example

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The collection of   real matrices   over the real field is 4-dimensional. Any matrix

 

has square equal to the negative of the identity matrix. A complex structure may be formed in  : with identity matrix  , elements  , with matrix multiplication form complex numbers.

Complex n-dimensional space Cn

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The fundamental example of a linear complex structure is the structure on R2n coming from the complex structure on Cn. That is, the complex n-dimensional space Cn is also a real 2n-dimensional space – using the same vector addition and real scalar multiplication – while multiplication by the complex number i is not only a complex linear transform of the space, thought of as a complex vector space, but also a real linear transform of the space, thought of as a real vector space. Concretely, this is because scalar multiplication by i commutes with scalar multiplication by real numbers   – and distributes across vector addition. As a complex n×n matrix, this is simply the scalar matrix with i on the diagonal. The corresponding real 2n×2n matrix is denoted J.

Given a basis   for the complex space, this set, together with these vectors multiplied by i, namely   form a basis for the real space. There are two natural ways to order this basis, corresponding abstractly to whether one writes the tensor product as   or instead as  

If one orders the basis as   then the matrix for J takes the block diagonal form (subscripts added to indicate dimension):   This ordering has the advantage that it respects direct sums of complex vector spaces, meaning here that the basis for   is the same as that for  

On the other hand, if one orders the basis as  , then the matrix for J is block-antidiagonal:   This ordering is more natural if one thinks of the complex space as a direct sum of real spaces, as discussed below.

The data of the real vector space and the J matrix is exactly the same as the data of the complex vector space, as the J matrix allows one to define complex multiplication. At the level of Lie algebras and Lie groups, this corresponds to the inclusion of gl(n,C) in gl(2n,R) (Lie algebras – matrices, not necessarily invertible) and GL(n,C) in GL(2n,R):

gl(n,C) < gl(2n,R) and GL(n,C) < GL(2n,R).

The inclusion corresponds to forgetting the complex structure (and keeping only the real), while the subgroup GL(n,C) can be characterized (given in equations) as the matrices that commute with J:   The corresponding statement about Lie algebras is that the subalgebra gl(n,C) of complex matrices are those whose Lie bracket with J vanishes, meaning   in other words, as the kernel of the map of bracketing with J,  

Note that the defining equations for these statements are the same, as   is the same as   which is the same as   though the meaning of the Lie bracket vanishing is less immediate geometrically than the meaning of commuting.

Direct sum

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If V is any real vector space there is a canonical complex structure on the direct sum VV given by   The block matrix form of J is   where   is the identity map on V. This corresponds to the complex structure on the tensor product  

Compatibility with other structures

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If B is a bilinear form on V then we say that J preserves B if   for all u, vV. An equivalent characterization is that J is skew-adjoint with respect to B:  

If g is an inner product on V then J preserves g if and only if J is an orthogonal transformation. Likewise, J preserves a nondegenerate, skew-symmetric form ω if and only if J is a symplectic transformation (that is, if  ). For symplectic forms ω an interesting compatibility condition between J and ω is that   holds for all non-zero u in V. If this condition is satisfied, then we say that J tames ω (synonymously: that ω is tame with respect to J; that J is tame with respect to ω; or that the pair   is tame).

Given a symplectic form ω and a linear complex structure J on V, one may define an associated bilinear form gJ on V by   Because a symplectic form is nondegenerate, so is the associated bilinear form. The associated form is preserved by J if and only if the symplectic form is. Moreover, if the symplectic form is preserved by J, then the associated form is symmetric. If in addition ω is tamed by J, then the associated form is positive definite. Thus in this case V is an inner product space with respect to gJ.

If the symplectic form ω is preserved (but not necessarily tamed) by J, then gJ is the real part of the Hermitian form (by convention antilinear in the first argument)   defined by  

Relation to complexifications

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Given any real vector space V we may define its complexification by extension of scalars:

 

This is a complex vector space whose complex dimension is equal to the real dimension of V. It has a canonical complex conjugation defined by

 

If J is a complex structure on V, we may extend J by linearity to VC:

 

Since C is algebraically closed, J is guaranteed to have eigenvalues which satisfy λ2 = −1, namely λ = ±i. Thus we may write

 

where V and V are the eigenspaces of i and −i, respectively. Complex conjugation interchanges V and V. The projection maps onto the V± eigenspaces are given by

 

So that

 

There is a natural complex linear isomorphism between VJ and V , so these vector spaces can be considered the same, while V may be regarded as the complex conjugate of VJ.

Note that if VJ has complex dimension n then both V and V have complex dimension n while VC has complex dimension 2n.

Abstractly, if one starts with a complex vector space W and takes the complexification of the underlying real space, one obtains a space isomorphic to the direct sum of W and its conjugate:

 
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Let V be a real vector space with a complex structure J. The dual space V* has a natural complex structure J* given by the dual (or transpose) of J. The complexification of the dual space (V*)C therefore has a natural decomposition

 

into the ±i eigenspaces of J*. Under the natural identification of (V*)C with (VC)* one can characterize (V*) as those complex linear functionals which vanish on V. Likewise (V*) consists of those complex linear functionals which vanish on V .

The (complex) tensor, symmetric, and exterior algebras over VC also admit decompositions. The exterior algebra is perhaps the most important application of this decomposition. In general, if a vector space U admits a decomposition U = ST, then the exterior powers of U can be decomposed as follows:

 

A complex structure J on V therefore induces a decomposition

 

where

 

All exterior powers are taken over the complex numbers. So if VJ has complex dimension n (real dimension 2n) then

 

The dimensions add up correctly as a consequence of Vandermonde's identity.

The space of (p,q)-forms Λp,q VJ* is the space of (complex) multilinear forms on VC which vanish on homogeneous elements unless p are from V and q are from V. It is also possible to regard Λp,q VJ* as the space of real multilinear maps from VJ to C which are complex linear in p terms and conjugate-linear in q terms.

See complex differential form and almost complex manifold for applications of these ideas.

See also

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References

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  • Kobayashi S. and Nomizu K., Foundations of Differential Geometry, John Wiley & Sons, 1969. ISBN 0-470-49648-7. (complex structures are discussed in Volume II, Chapter IX, section 1).
  • Budinich, P. and Trautman, A. The Spinorial Chessboard, Springer-Verlag, 1988. ISBN 0-387-19078-3. (complex structures are discussed in section 3.1).
  • Goldberg S.I., Curvature and Homology, Dover Publications, 1982. ISBN 0-486-64314-X. (complex structures and almost complex manifolds are discussed in section 5.2).