Difference between revisions of "Trigonometric polynomial"
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$$ | $$ | ||
− | 2c _ {k} = \left \{ | + | 2c _ {k} = \left \{ |
+ | \begin{array}{ll} | ||
+ | a _ {k} - ib _ {k} , &k \geq 0 \ ( \textrm{ with } b _ {0} = 0), \\ | ||
+ | a _ {-k} + ib _ {-k} , &k < 0 . \\ | ||
+ | \end{array} | ||
+ | |||
+ | \right .$$ | ||
Trigonometric polynomials are an important tool in the [[Approximation of functions|approximation of functions]]. | Trigonometric polynomials are an important tool in the [[Approximation of functions|approximation of functions]]. |
Latest revision as of 14:03, 28 June 2020
finite trigonometric sum
An expression of the form
$$ T ( x) = { \frac{a _ {0} }{2} } + \sum _ {k = 1 } ^ { n } ( a _ {k} \cos kx + b _ {k} \sin kx) $$
with real coefficients $ a _ {0} , a _ {k} , b _ {k} $, $ k = 1 \dots n $; the number $ n $ is called the order of the trigonometric polynomial (provided $ | a _ {n} | + | b _ {n} | > 0 $). A trigonometric polynomial can be written in complex form:
$$ T ( x) = \sum _ {k = - n } ^ { n } c _ {k} e ^ {ikx} , $$
where
$$ 2c _ {k} = \left \{ \begin{array}{ll} a _ {k} - ib _ {k} , &k \geq 0 \ ( \textrm{ with } b _ {0} = 0), \\ a _ {-k} + ib _ {-k} , &k < 0 . \\ \end{array} \right .$$
Trigonometric polynomials are an important tool in the approximation of functions.
Comments
Cf. also Trigonometric series.
Trigonometric polynomial. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Trigonometric_polynomial&oldid=49036