Namespaces
Variants
Actions

Euler transformation

From Encyclopedia of Mathematics
Revision as of 12:59, 6 January 2024 by Chapoton (talk | contribs)
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)
Jump to: navigation, search


The Euler transformation of series. Given a series

$$ \tag{1 } \sum_{n=0} ^ \infty (- 1) ^ {n} a _ {n} , $$

the series

$$ \tag{2 } \sum_{n=0} ^ \infty \frac{\Delta ^ {n} a _ {0} }{2 ^ {n+1} } $$

is said to be obtained from (1) by means of the Euler transformation. Here

$$ \Delta ^ {n} a _ {0} = \sum_{k=0} ^ { n } (- 1) ^ {k} \left ( \begin{array}{c} n \\ k \end{array} \right ) a _ {k} . $$

If the series (1) converges, then so does (2), and to the same sum as (1). If the series (2) converges (in this case (1) may diverge), then the series (1) is called Euler summable.

If (1) converges, if $ a _ {n} > 0 $, if the sequences

$$ \Delta ^ {k} a _ {n} = \sum_{l=0} ^ { k } ( - 1) ^ {l} \left ( \begin{array}{c} k \\ l \end{array} \right ) a _ {n+l} ,\ \ k = 0 , 1 \dots $$

are monotone, and if

$$ \frac{a _ {n+} 1 }{a _ {n} } \geq q > \frac{1}{2} , $$

then the series (2) converges more rapidly than (1) (see Convergence, types of).

L.D. Kudryavtsev

Euler's transformation is the integral transformation

$$ \tag{1 } w ( z) = \int\limits _ { C } ( z - t ) ^ \alpha v ( t) dt , $$

where $ C $ is a contour in the complex $ t $- plane. It was proposed by L. Euler (1769).

The Euler transformation is applied to linear ordinary differential equations of the form

$$ \tag{2 } L w = \sum_{j=0} ^ { n } (- 1) ^ {j} w ^ {(} j) \sum_{k=0} ^ { n- } j \left ( \begin{array}{c} n + \beta - j - 1 \\ n - k - j \end{array} \right ) Q _ {j} ^ {(} n- k- j) ( z) = 0 , $$

where $ Q _ {j} ( z) $ is a polynomial of degree $ \leq n - j $ and $ \beta $ is a constant. Any linear equation of the form

$$ P _ {n} ( z) w ^ {(} n) + P _ {n-} 1 ( z) w ^ {(} n- 1) + \dots + P _ {0} ( z) w = 0 , $$

where the $ P _ {j} ( z) $ are polynomials of degree $ \leq j $ and the degree of $ P _ {n} ( z) $ is $ n $, can be written in the form (2). The equation

$$ M v \equiv \sum_{j=0} ^ { n } (- 1) ^ {j} ( Q _ {n-} j ( z) v ) ^ {(} j) = 0 $$

is called the Euler transform of (2). If $ w ( z) $ is defined by (1) and $ \alpha = \beta + n - 1 $, then

$$ L w = \int\limits _ { C } ( z - t ) ^ \alpha M ( v) dt , $$

provided that the integrated term arising from integration by parts vanishes. From this it follows that if $ M ( v) = 0 $, then $ w ( z) $ is a solution of (2).

The Euler transformation makes it possible to reduce the order of (2) if $ Q _ {n-} j ( z) \equiv 0 $ for $ j > q $, $ q < n $. For $ q = 0 $ and $ q= 1 $ equation (2) can be integrated (see Pochhammer equation).

References

[1] E.L. Ince, "Ordinary differential equations" , Dover, reprint (1956)
[2] E. Kamke, "Differentialgleichungen: Lösungen und Lösungsmethoden" , 1. Gewöhnliche Differentialgleichungen , Teubner (1943)

M.V. Fedoryuk

The Euler transform of the first kind is the integral transform

$$ I ^ \mu f ( x) = \mathfrak K _ \mu \{ f ( t) ; x \} = \ \frac{1}{\Gamma ( \mu ) } \int\limits _ { 0 } ^ { x } f ( t) ( x - t ) ^ {\mu - 1 } dt , $$

where $ \mu $ and $ x $ are complex variables and the path of integration is the segment $ t = x \tau $, $ 0 < \tau < 1 $.

The Euler transform of the first kind is also called the fractional Riemann–Liouville integral of order $ \mu $. (Sometimes the name of Riemann–Liouville integral is given to

$$ \frac{1}{\Gamma ( \mu ) } \int\limits _ { x } ^ { a } f ( t) ( t - x ) ^ {\mu - 1 } dt = \mathfrak K _ \mu \{ f ( a - t ) ; \ a - x \} , $$

where $ a $ is a complex number.)

If $ f $ and $ g $ satisfy certain conditions, then

$$ I ^ {0} f ( x) = f ( x) , $$

$$ I ^ \mu [ \alpha f ( x) + \beta g ( x) ] = \alpha I ^ \mu f ( x) + \beta I ^ \mu g ( x) , $$

where $ \alpha $ and $ \beta $ are complex constants and

$$ I ^ \mu [ I ^ \nu f ( x) ] = I ^ {\mu + \nu } f ( x) , $$

$$ I ^ {n} f ( x) = \int\limits _ { 0 } ^ { x } dt _ {1} \dots \int\limits _ { 0 } ^ { {t _ n-} 2 } d t _ {n-} 1 \int\limits _ { 0 } ^ { {t } _ {n-} 1 } f ( t _ {n} ) d t _ {n} , $$

$$ I ^ {-} n f ( x) = \frac{d ^ {n} }{d x ^ {n} } f ( x) ,\ n = 1 , 2 ,\dots . $$

The Euler transform of the second kind is the integral transform

$$ K ^ \mu f ( x) = \mathfrak M _ \mu \{ f ( t) ; x \} = \ \frac{1}{\Gamma ( \mu ) } \int\limits _ { x } ^ \infty f ( t) ( t - x ) ^ {\mu - 1 } d t , $$

where $ \mu $ and $ x $ are complex variables and the path of integration is the ray $ t = x \tau $, $ \tau > 1 $, or $ t = x + \tau $, $ \tau > 0 $. Under certain conditions,

$$ K ^ {0} f ( x) = f ( x) , $$

$$ K ^ \mu [ \alpha f ( x) + \beta g ( x) ] = \alpha K ^ \mu f ( x) + \beta K ^ \mu ( x) , $$

where $ \alpha $ and $ \beta $ are complex constants and

$$ K ^ \mu [ K ^ \nu f ( x) ] = K ^ {\mu + \nu } f ( x) , $$

$$ K ^ {n} f ( x) = \int\limits _ { x } ^ \infty d t _ {1} \dots \int\limits _ {t _ {n-} 2 } ^ \infty d t _ {n-} 1 \int\limits _ {t _ {n-} 1 } ^ \infty f ( t _ {n} ) d t _ {n} , $$

$$ K ^ {-} n f ( x) = \frac{d ^ {n} }{d x ^ {n} } f ( x) ,\ n = 1 , 2 ,\dots . $$

The Euler transform of the second kind is sometimes called the fractional Weyl integral of order $ \mu $.

The above transforms have also been introduced for generalized functions.

References

[1] Y.A. Brychkov, A.P. Prudnikov, "Integral transformations of generalized functions" , Gordon & Breach (1988) (Translated from Russian)

Yu.A. BrychkovA.P. Prudnikov

Comments

See also Fractional integration and differentiation.

References

[a1] A. Erdélyi, W. Magnus, F. Oberhetinger, F.G. Tricomi, "Tables of integral transforms" , II , McGraw-Hill (1954) pp. Chapt. 13
[a2] A.C. McBride, "Fractional calculus and integral transforms of generalized functions" , Pitman (1979)
How to Cite This Entry:
Euler transformation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Euler_transformation&oldid=54881
This article was adapted from an original article by L.D. Kudryavtsev, M.V. Fedoryuk, Yu.A. Brychkov, A.P. Prudnikov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article