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In mathematics, the Fejér kernel is used to express the effect of Cesàro summation on Fourier series. It is a non-negative kernel, giving rise to an approximate identity.

The Fejér kernel is defined as

${\displaystyle F_n(x)=\frac{1}{n}{\displaystyle \sum _{k=0}^{n-1}}{D}_k(x),}$

where

${\displaystyle D_k(x)={\displaystyle \sum _{s=-k}^k}{\mathrm{e}}^{isx}}$

is the kth order Dirichlet kernel. It can also be written in a closed form as

${\displaystyle F_n(x)=\frac{1}{n}{\left(\frac{\sin \frac{nx}{2}}{\sin \frac{x}{2}}\right)}^2=\frac{1}{n}\frac{1-\cos (nx)}{1-\cos x}}$,

where this expression is defined.^[1] It is named after the Hungarian mathematician Lipót Fejér (1880–1959).

The important property of the Fejér kernel is ${\displaystyle F_n(x)\ge 0}$ with average value of ${\displaystyle 1}$. The convolution F_n is positive: for ${\displaystyle f\ge 0}$ of period ${\displaystyle 2\pi }$ it satisfies

${\displaystyle 0\le (f*F_n)(x)=\frac{1}{2\pi }{\displaystyle \underset{-\pi }{\overset{\pi }{\int }}}f(y)F_n(x-y)dy,}$

and, by Young's inequality,

${\displaystyle \Vert F_n*f{\Vert }_{L^p([-\pi ,\pi ])}\le \Vert f{\Vert }_{L^p([-\pi ,\pi ])}}$ for every ${\displaystyle 0\le p\le \mathrm{\infty }}$

for continuous function ${\displaystyle f}$; moreover,

${\displaystyle f*F_n\to f}$ for every ${\displaystyle f\in L^p([-\pi ,\pi ])}$ (${\displaystyle 1\le p<\mathrm{\infty }}$)

for continuous function ${\displaystyle f}$. Indeed, if ${\displaystyle f}$ is continuous, then the convergence is uniform.

See also

• Fejér's theorem
• Dirichlet kernel
• Gibbs phenomenon
• Charles Jean de la Vallée-Poussin

References