conjugate linear

In mathematics, a function $f : V \to W$ between two complex vector spaces is said to be antilinear or conjugate-linear if
$\begin f(x + y) &= f(x) + f(y) && \qquad \text \\ f(s x) &= \overline f(x) && \qquad \text \\ \end$
hold for all vectors $x, y \in V$ and every complex number $s,$ where $\overline$ denotes the complex conjugate of $s.$

Antilinear maps stand in contrast to linear maps, which are additive maps that are homogeneous rather than conjugate homogeneous. If the vector spaces are real then antilinearity is the same as linearity.

Antilinear maps occur in quantum mechanics in the study of time reversal and in spinor calculus, where it is customary to replace the bars over the basis vectors and the components of geometric objects by dots put above the indices. Scalar-valued antilinear maps often arise when dealing with complex inner products and Hilbert spaces.

Definitions and characterizations

A function is called or if it is additive and conjugate homogeneous.
An on a vector space $V$ is a scalar-valued antilinear map.

A function $f$ is called if
$f(x + y) = f(x) + f(y) \quad \text x, y$
while it is called if
$f(ax) = \overline f(x) \quad \text x \text a.$
In contrast, a linear map is a function that is additive and homogeneous, where $f$ is called if
$f(ax) = a f(x) \quad \text x \text a.$

An antilinear map $f : V \to W$ may be equivalently described in terms of the linear map $\overline : V \to \overline$ from $V$ to the complex conjugate vector space $\overline.$

Examples

Anti-linear dual map

Given a complex vector space $V$ of rank 1, we can construct an anti-linear dual map which is an anti-linear map $l:V \to \Complex$ sending an element $x_1 + iy_1$ for $x_1,y_1 \in \R$ to $x_1 + iy_1 \mapsto a_1 x_1 - i b_1 y_1$ for some fixed real numbers $a_1,b_1.$ We can extend this to any finite dimensional complex vector space, where if we write out the standard basis $e_1, \ldots, e_n$ and each standard basis element as $e_k = x_k + iy_k$ then an anti-linear complex map to $\Complex$will be of the form $\sum_k x_k + iy_k \mapsto \sum_k a_k x_k - i b_k y_k$ for $a_k,b_k \in \R.$

Isomorphism of anti-linear dual with real dual

The anti-linear dual^{pg 36} of a complex vector space $V$ $\operatorname_(V,\Complex)$ is a special example because it is isomorphic to the real dual of the underlying real vector space of $V,$ $\text_\R(V,\R).$ This is given by the map sending an anti-linear map $\ell: V \to \Complex$to $\operatorname(\ell) : V \to \R$ In the other direction, there is the inverse map sending a real dual vector $\lambda : V \to \R$ to $\ell(v) = -\lambda(iv) + i\lambda(v)$ giving the desired map.

Properties

The composite of two antilinear maps is a linear map. The class of semilinear maps generalizes the class of antilinear maps.

Anti-dual space

The vector space of all antilinear forms on a vector space $X$ is called the of $X.$ If $X$ is a topological vector space, then the vector space of all antilinear functionals on $X,$ denoted by $\overline^,$ is called the or simply the of $X$ if no confusion can arise.

When $H$ is a normed space then the canonical norm on the (continuous) anti-dual space $\overline^,$ denoted by $\, f\, _,$ is defined by using this same equation:
$\, f\, _ ~:=~ \sup_ , f(x), \quad \text f \in \overline^.$

This formula is identical to the formula for the on the continuous dual space $X^$ of $X,$ which is defined by
$\, f\, _ ~:=~ \sup_ , f(x), \quad \text f \in X^.$

Canonical isometry between the dual and anti-dual

The complex conjugate $\overline$ of a functional $f$ is defined by sending $x \in \operatorname f$ to $\overline.$ It satisfies
$\, f\, _ ~=~ \left\, \overline\right\, _ \quad \text \quad \left\, \overline\right\, _ ~=~ \, g\, _$
for every $f \in X^$ and every $g \in \overline^.$
This says exactly that the canonical antilinear bijection defined by
$\operatorname ~:~ X^ \to \overline^ \quad \text \quad \operatorname(f) := \overline$
as well as its inverse $\operatorname^ ~:~ \overline^ \to X^$ are antilinear isometries and consequently also homeomorphisms.

If $\mathbb = \R$ then $X^ = \overline^$ and this canonical map $\operatorname : X^ \to \overline^$ reduces down to the identity map.

Inner product spaces

If $X$ is an inner product space then both the canonical norm on $X^$ and on $\overline^$ satisfies the parallelogram law, which means that the polarization identity can be used to define a and also on $\overline^,$ which this article will denote by the notations
$\langle f, g \rangle_ := \langle g \mid f \rangle_ \quad \text \quad \langle f, g \rangle_ := \langle g \mid f \rangle_$
where this inner product makes $X^$ and $\overline^$ into Hilbert spaces.
The inner products $\langle f, g \rangle_$ and $\langle f, g \rangle_$ are antilinear in their second arguments. Moreover, the canonical norm induced by this inner product (that is, the norm defined by $f \mapsto \sqrt$) is consistent with the dual norm (that is, as defined above by the supremum over the unit ball); explicitly, this means that the following holds for every $f \in X^:$
$\sup_ , f(x), = \, f\, _ ~=~ \sqrt ~=~ \sqrt.$

If $X$ is an inner product space then the inner products on the dual space $X^$ and the anti-dual space $\overline^,$ denoted respectively by $\langle \,\cdot\,, \,\cdot\, \rangle_$ and $\langle \,\cdot\,, \,\cdot\, \rangle_,$ are related by
$\langle \,\overline\, , \,\overline\, \rangle_ = \overline = \langle \,g\, , \,f\, \rangle_ \qquad \text f, g \in X^$
and
$\langle \,\overline\, , \,\overline\, \rangle_ = \overline = \langle \,g\, , \,f\, \rangle_ \qquad \text f, g \in \overline^.$

See also

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Citations

References

* Budinich, P. and Trautman, A. ''The Spinorial Chessboard''. Springer-Verlag, 1988. . (antilinear maps are discussed in section 3.3).
* Horn and Johnson, ''Matrix Analysis,'' Cambridge University Press, 1985. . (antilinear maps are discussed in section 4.6).
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Functions and mappings
Linear algebra

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