Antilinear map: Difference between revisions

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In mathematics, a mapping f : V → W from a complex vector space to another is said to be antilinear (or conjugate-linear or semilinear) if

f(ax+by)={\bar {a}}f(x)+{\bar {b}}f(y)

for all a, b in C and all x, y in V. The composition of two antilinear maps is complex-linear.

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

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 for all ''a'', ''b'' in '''C''' and all ''x'', ''y'' in ''V''. The [[composition (mathematics)|composition]] of two antilinear maps is complex-linear.
-An antilinear map <math>f:V\to W</math> may be equivalently described in terms of linear map  <math>\bar f:V\to\bar W</math> to the [[complex conjugate vector space]] <math>\bar W</math>.
+An antilinear map <math>f:V\to W</math> may be equivalently described in terms of the [[linear map]] <math>\bar f:V\to\bar W</math> to the [[complex conjugate vector space]] <math>\bar W</math>.
 == See also ==