|
|
Line 1: |
Line 1: |
| In [[mathematics]], the Fourier '''sine and cosine transforms''' are forms of the [[Fourier transform|Fourier integral transform]] that do not use [[complex number]]s. They are the forms originally used by [[Joseph Fourier]] and are still preferred in some applications, such as [[signal processing]] or [[statistics]].
| | [http://carnavalsite.com/demo-page-1/solid-advice-in-relation-to-yeast-infection/ http://carnavalsite.com] Let me first begin by introducing myself. My name is [http://Www.Uic.edu/classes/bios/bios104/mike/bacteria01.htm Boyd Butts] even though it is not the title on my beginning certificate. at home [http://www.Condomdepot.com/product/sex-lubes.cfm std test] Her spouse and her reside in Puerto Rico but she will have to transfer 1 working day or another. One of the issues he enjoys most is ice skating but he is struggling to discover time [http://wixothek.com/user/MBuckmast std home test] for it. For many years he's been working as a receptionist.<br><br>Also over the counter std test over the counter std test visit my website [http://rivoli.enaiponline.com/user/view.php?id=438251&course=1 enaiponline.com] |
| | |
| ==Definition==
| |
| | |
| The '''Fourier sine transform''' of <math> f (t) </math>, sometimes denoted by either <math> {\hat f}^s </math> or <math> {\mathcal F}_s (f) </math>, is
| |
| | |
| :<math> 2 \int\limits_{-\infty}^\infty f(t)\sin\,{2\pi \nu t} \,dt.</math>
| |
| | |
| If <math> t </math> means time, then <math> \nu</math> is frequency in cycles per unit time, but in the abstract, they can be any pair of variables which are dual to each other.
| |
| | |
| This transform is necessarily an [[odd function]] of frequency, i.e.,
| |
| :<math> {\hat f}^s(\nu) = - {\hat f}^s(-\nu) </math> for all <math>\nu</math>.
| |
| | |
| The numerical factors in the [[Fourier transform]]s are defined uniquely only by their product. Here, in order that the Fourier inversion formula not have any numerical factor, the factor of 2 appears because the sine function has <math> L^2 </math> norm of <math> \frac 1 {\sqrt2} </math>.
| |
| | |
| The '''Fourier cosine transform''' of <math> f (t) </math>, sometimes denoted by either <math> {\hat f}^c </math> or <math> {\mathcal F}_c (f) </math>, is
| |
| | |
| :<math> 2 \int\limits_{-\infty}^\infty f(t)\cos\,{2\pi \nu t} \,dt.</math> | |
| | |
| It is necessarily an [[even function]] of <math>\nu</math>, i.e.,
| |
| <math> {\hat f}^c(\nu) = {\hat f}^c(-\nu) </math> for all <math>\nu</math>.
| |
| | |
| Some authors<ref>[[Mary L. Boas]], ''[[Mathematical Methods in the Physical Sciences]]'', 2nd Ed, John Wiley & Sons Inc, 1983. ISBN 0-471-04409-1</ref> only define the cosine transform for [[even function]]s of <math>t </math>, in which case its sine transform is zero. Since cosine is also even, a simpler formula can be used, <math> 4 \int\limits_0^\infty f(t)\cos\,{2\pi \nu t} \,dt.</math> Similarly, if <math>f</math> is an [[odd function]], then the cosine transform is zero and the sine transform can be simplified to <math> 4 \int\limits_0^\infty f(t)\sin\,{2\pi \nu t} \,dt.</math>
| |
| | |
| ==Fourier inversion==
| |
| The original function <math> f(t) </math> can be recovered from its transforms under the usual hypotheses, that <math> f </math> and both of its transforms should be absolutely integrable. For more details on the different hypotheses, see [[Fourier inversion theorem]].
| |
| | |
| The inversion formula is<ref>{{cite book|last=[[Poincaré]]|first=Henri|title=Theorie analytique de la propagation de chaleur|year=1895|publisher=G. Carré|location=Paris|pages=pp. 108ff.|url=http://gallica.bnf.fr/ark:/12148/bpt6k5500702f/f115.image}}</ref>
| |
| | |
| :<math> f(t) = \int _0^\infty {\hat f}^c \cos (2\pi \nu t) d\nu + \int _0^\infty {\hat f}^s \sin (2\pi \nu t) d\nu,</math>
| |
| | |
| which has the advantage that all frequencies are positive and all quantities are real. If the numerical factor 2 is left out of the definitions of the transforms, then the inversion formula is usually written as an integral over both negative and positive frequencies.
| |
| | |
| Using the addition formula for [[cosine]], this is sometimes rewritten as
| |
| | |
| :<math> \frac\pi2 (f(x+0)+f(x-0)) = \int _0^\infty \int_{-\infty}^\infty \cos \omega (t-x) f(t) dt d\omega, </math> | |
| | |
| where <math> f(x+0) </math> denotes the one-sided [[limit]] of <math>f</math> as <math> x </math> approaches zero from above, and
| |
| <math> f(x-0) </math> denotes the one-sided limit of <math>f</math> as <math> x </math> approaches zero from below.
| |
| | |
| If the original function <math> f</math> is an [[even function]], then the sine transform is zero; if <math> f</math> is an [[odd function]], then the cosine transform is zero. In either case, the inversion formula simplifies.
| |
| | |
| ==Relation with complex exponentials==
| |
| | |
| The form of the [[Fourier transform]] used more often today is
| |
| | |
| :<math>
| |
| \hat f(\nu)
| |
| = \int\limits_{-\infty}^\infty f(t) e^{-2\pi i\nu t}\,dt.
| |
| </math> | |
| | |
| Expanding the [[integrand]] by means of [[Euler's formula]] results in
| |
| | |
| :<math> = \int\limits_{-\infty}^\infty f(t)(\cos\,{2\pi\nu t} - i\,\sin{2\pi\nu t})\,dt,</math> | |
| | |
| which may be written as the [[sum]] of two [[integral]]s
| |
| | |
| :<math> = \int\limits_{-\infty}^\infty f(t)\cos\,{2\pi \nu t} \,dt - i \int\limits_{-\infty}^\infty f(t)\sin\,{2\pi \nu t}\,dt,</math>
| |
| | |
| :<math> = \frac 12 {\hat f}^c (\nu) - \frac i2 {\hat f}^s (\nu). </math>
| |
| | |
| ==See also== | |
| *[[Discrete cosine transform]]
| |
| *[[Discrete sine transform]]
| |
| | |
| ==References==
| |
| | |
| * Whittaker, Edmund, and James Watson, ''A Course in Modern Analysis'', Fourth Edition, Cambridge Univ. Press, 1927, pp. 189, 211
| |
| | |
| <references />
| |
| | |
| [[Category:Integral transforms]]
| |
| [[Category:Fourier analysis]]
| |
http://carnavalsite.com Let me first begin by introducing myself. My name is Boyd Butts even though it is not the title on my beginning certificate. at home std test Her spouse and her reside in Puerto Rico but she will have to transfer 1 working day or another. One of the issues he enjoys most is ice skating but he is struggling to discover time std home test for it. For many years he's been working as a receptionist.
Also over the counter std test over the counter std test visit my website enaiponline.com