Fourier transform: Difference between revisions

<div class="definition"><div class="short_definition">An analytical transformation of a function ''f''(''x'') obtained (if it exists) by multiplying  the function by ''e''^{&minus;''iux''} and integrating over all ''x'',  <div class="display-formula"><blockquote>[[File:ams2001glos-Fe14.gif|link=|center|ams2001glos-Fe14]]</blockquote></div> where ''u'' is the new [[variable]] of the transform ''F''(''u'') and ''i''² = &minus;1.</div><br/> <div class="paragraph">If the Fourier transform of a function is known, the function itself may be recovered by use of  the inversion formula:  <div class="display-formula"><blockquote>[[File:ams2001glos-Fe15.gif|link=|center|ams2001glos-Fe15]]</blockquote></div> The Fourier transform has the same uses as the [[Fourier series]]: For example, the integrand F(''u'')  exp (''iux'') is a solution of a given [[linear]] equation, so that the integral sum of these solutions is  the most general solution of the equation. When the variable ''u'' is complex, the Fourier transform  is equivalent to the [[Laplace transform]]. <br/>''See also'' [[Fourier integral]], [[spectral function]].</div><br/> </div>