Difference between revisions of "Bernstein polynomials"

Algebraic polynomials defined by the formula

$$ B _ {n} (f; x ) = \ B _ {n} (x ) = $$

$$ = \ \sum _ { k=0 } ^ { n } f \left ( { \frac{k}{n} } \right ) \left ( \begin{array}{c} n \\ k \end{array} \right ) x ^ {k} (1-x) ^ {n-k} ,\ n = 1, 2 ,\dots . $$

Introduced by S.N. Bernshtein in 1912 (cf. ). The sequence of Bernstein polynomials converges uniformly to a function $ f $ on the segment $ 0 \leq x \leq 1 $ if $ f $ is continuous on this segment. For a function which is bounded by $ C $, $ 0 < C < 1 $, with a discontinuity of the first kind,

$$ B _ {n} (f; C) \rightarrow \ { \frac{f (C _ {-} ) + f (C _ {+} ) }{2} } . $$

The equation

$$ B _ {n} (f; c) - f (c) = \ \frac{f ^ { \prime\prime } (c)c(1-c) }{2n} + o \left ( \frac{1}{n} \right ) $$

is valid if $ f $ is twice differentiable at the point $ c $. If the $ k $- th derivative $ f ^ { (k) } $ of the function is continuous on the segment $ 0 \leq x \leq 1 $, the convergence

$$ B _ {n} ^ { (k) } (f; x) \rightarrow f ^ { (k) } (x) $$

is uniform on this segment. A study was made ([1b], [5]) of the convergence of Bernstein polynomials in the complex plane if $ f $ is analytic on the segment $ 0 \leq x \leq 1 $.

References

Comments

There is also a multi-variable generalization: generalized Bernstein polynomials defined by the completely analogous formula

$$ B _ {\mathbf n } (f, x _ {1} \dots x _ {k} ) = $$

$$ = \ \sum _ { i _ {1} = 0 } ^ { {n _ 1 } } \dots \sum _ {i _ {k} = 0 } ^ { {n _ k} } f \left ( \frac{i _ {1} }{n _ {1} } \dots \frac{i _ {k} }{n _ {k} } \right ) \ \left ( \begin{array}{c} n _ {1} \\ i _ {1} \end{array} \right ) \dots \left ( \begin{array}{c} n _ {k} \\ i _ {k} \end{array} \right ) \times $$

$$ \times x _ {1} ^ {i _ {1} } (1 - x _ {1} ) ^ {n _ {1} - i _ {1} } \dots x _ {k} ^ {i _ {k} } (1 - x _ {k} ) ^ {n _ {k} - i _ {k} } . $$

Here $ \mathbf n $ stands for the multi-index $ \mathbf n = ( n _ {1} \dots n _ {k} ) $.

As in the one variable case these provide explicit polynomial approximants for the more-variable Weierstrass approximation and Stone–Weierstrass theorems. For the behaviour of Bernstein polynomials in the complex plane and applications to movement problems, cf. also [a3].

References