Fourier series: Difference between revisions
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In [[mathematics]], the '''Fourier series''', named after [[Joseph Fourier]] (1768—1830), refers to an infinite series representation of a | In [[mathematics]], the '''Fourier series''', named after [[Joseph Fourier]] (1768—1830), refers to an infinite series representation of a [[periodic function]] ''ƒ'' of a [[real number|real]] variable ξ, of period ''P'': | ||
:<math>f(\xi+P)=f(\xi) \ . </math> | :<math>f(\xi+P)=f(\xi) \ . </math> | ||
''Fourier's theorem'' states that an [[infinite series]], known as a Fourier series, is equivalent (in some sense) to such a function: | In the case of a [[complex number|complex]]-valued function ''ƒ''(ξ), ''Fourier's theorem'' states that an [[infinite series]], known as a Fourier series, is equivalent (in some sense) to such a function: | ||
:<math>f(\xi) =\sum_{n=-\infty}^\infty c_n e^{2\pi in\xi/P}</math> | :<math>f(\xi) =\sum_{n=-\infty}^\infty c_n e^{2\pi in\xi/P}</math> |
Revision as of 10:57, 4 June 2012
In mathematics, the Fourier series, named after Joseph Fourier (1768—1830), refers to an infinite series representation of a periodic function ƒ of a real variable ξ, of period P:
In the case of a complex-valued function ƒ(ξ), Fourier's theorem states that an infinite series, known as a Fourier series, is equivalent (in some sense) to such a function:
where the coefficients {cn} are defined by
In what sense it may be said that this series converges to ƒ(ξ) is a complicated question.[1][2] However, physicists being less delicate than mathematicians in these matters, simply write
and usually do not worry too much about the conditions to be imposed on the arbitrary function ƒ(ξ) of period P in order that this expansion converge to the function.
References
- ↑ G. H. Hardy, Werner Rogosinski (1999). “Chapter IV: Convergence of Fourier series”, Fourier Series, Reprint of Cambridge University Press 1956 ed. Courier Dover Publications, pp. 37 ff. ISBN 0486406814.
- ↑ For an historical account, see Hans Niels Jahnke (2003). “§6.5 Convergence of Fourier series”, A History of Analysis. American Mathematical Society, pp. 178 ff. ISBN 0821826239.