Difference between revisions of "Airy equation"
From Encyclopedia of Mathematics
(Importing text file) |
(TeX, Refs, MSC) |
||
| Line 1: | Line 1: | ||
| − | + | {{MSC|33C10}} | |
| + | {{TEX|done}} | ||
| − | + | The Airy equation is the second-order linear ordinary differential equation | |
| − | + | \[ | |
| − | It occurred first in G.B. Airy's research in optics | + | y'' - xy = 0. |
| − | + | \] | |
| − | + | It occurred first in G.B. Airy's research in optics {{Cite|Ai}}. Its general solution can be expressed in terms of [[Bessel functions|Bessel functions]] of order $\pm 1/3$: | |
| − | + | \[ | |
| − | Since the Airy equation plays an important role in various problems of physics, mechanics and asymptotic analysis, its solutions are regarded as forming a distinct class of special functions (see [[Airy functions|Airy functions]]). | + | y(x) = |
| − | + | c_1 \sqrt{x} J_{1/3}\left(\frac{2}{3}\mathrm{i}x^{3/2}\right) + | |
| − | + | c_2 \sqrt{x} J_{-1/3}\left(\frac{2}{3}\mathrm{i}x^{3/2}\right). | |
| − | + | \] | |
| − | + | Since the Airy equation plays an important role in various problems of physics, mechanics and asymptotic analysis, its solutions are regarded as forming a distinct class of special functions (see [[Airy functions|Airy functions]]). | |
| + | The solutions of the Airy equation in the complex plane $z$, | ||
| + | \[ | ||
| + | w'' - zw = 0, | ||
| + | \] | ||
have the following fundamental properties: | have the following fundamental properties: | ||
| − | 1) Every solution is an entire function of | + | 1) Every solution is an entire function of $z$ and can be expanded in a power series |
| − | + | \[ | |
| − | + | w(z) = | |
| − | + | w(0) | |
| − | + | \left( | |
| − | + | 1 + \frac{z^3}{2.3} + \frac{z^6}{(2.3).(5.6)} + \cdots | |
| − | which converges for all | + | \right) |
| − | + | + | |
| − | + | w'(0) | |
| + | \left( | ||
| + | z + \frac{z^4}{3.4} + \frac{z^7}{(3.4).(6.7)} + \cdots | ||
| + | \right), | ||
| + | \] | ||
| + | which converges for all $z$. | ||
| − | + | 2) If $w(z) \not\equiv 0$ is a solution of the Airy equation, then so are $w(\omega z)$ and $w(\omega^2 z)$, where $w=\mathrm{e}^{2\pi\mathrm{i}/3}$, and any two of these solutions are linearly independent. The following identity holds: | |
| + | \[ | ||
| + | w(z) + w(\omega z) + w(\omega^2 z) \equiv 0. | ||
| + | \] | ||
| − | ====References==== | + | ====References==== |
| − | + | {| | |
| + | |- | ||
| + | |valign="top"|{{Ref|AbSt}}||valign="top"| M. Abramowitz (ed.) I.A. Stegun (ed.), ''Handbook of mathematical functions'', ''Appl. Math. Series'', '''55''', Nat. Bureau of Standards,, U.S. Department Commerce (1964) | ||
| + | |- | ||
| + | |valign="top"|{{Ref|Ai}}||valign="top"| G.B. Airy, "On the intensity of light in the neighbourhood of a caustic" ''Trans. Cambridge Philos. Soc.'', '''6''' (1838) pp. 379–402 | ||
| + | |- | ||
| + | |valign="top"|{{Ref|BaBu}}||valign="top"| V.M. Babich, V.S. Buldyrev, "Asymptotic methods in the diffraction of short waves", Moscow (1972) (In Russian) (Translation: "Short-Wavelength Diffraction Theory. Asymptotic Methods", Springer, 1991) | ||
| + | |- | ||
| + | |} | ||
Revision as of 16:03, 26 July 2012
2020 Mathematics Subject Classification: Primary: 33C10 [MSN][ZBL]
The Airy equation is the second-order linear ordinary differential equation \[ y'' - xy = 0. \] It occurred first in G.B. Airy's research in optics [Ai]. Its general solution can be expressed in terms of Bessel functions of order $\pm 1/3$: \[ y(x) = c_1 \sqrt{x} J_{1/3}\left(\frac{2}{3}\mathrm{i}x^{3/2}\right) + c_2 \sqrt{x} J_{-1/3}\left(\frac{2}{3}\mathrm{i}x^{3/2}\right). \] Since the Airy equation plays an important role in various problems of physics, mechanics and asymptotic analysis, its solutions are regarded as forming a distinct class of special functions (see Airy functions).
The solutions of the Airy equation in the complex plane $z$, \[ w'' - zw = 0, \] have the following fundamental properties:
1) Every solution is an entire function of $z$ and can be expanded in a power series \[ w(z) = w(0) \left( 1 + \frac{z^3}{2.3} + \frac{z^6}{(2.3).(5.6)} + \cdots \right) + w'(0) \left( z + \frac{z^4}{3.4} + \frac{z^7}{(3.4).(6.7)} + \cdots \right), \] which converges for all $z$.
2) If $w(z) \not\equiv 0$ is a solution of the Airy equation, then so are $w(\omega z)$ and $w(\omega^2 z)$, where $w=\mathrm{e}^{2\pi\mathrm{i}/3}$, and any two of these solutions are linearly independent. The following identity holds: \[ w(z) + w(\omega z) + w(\omega^2 z) \equiv 0. \]
References
| [AbSt] | M. Abramowitz (ed.) I.A. Stegun (ed.), Handbook of mathematical functions, Appl. Math. Series, 55, Nat. Bureau of Standards,, U.S. Department Commerce (1964) |
| [Ai] | G.B. Airy, "On the intensity of light in the neighbourhood of a caustic" Trans. Cambridge Philos. Soc., 6 (1838) pp. 379–402 |
| [BaBu] | V.M. Babich, V.S. Buldyrev, "Asymptotic methods in the diffraction of short waves", Moscow (1972) (In Russian) (Translation: "Short-Wavelength Diffraction Theory. Asymptotic Methods", Springer, 1991) |
How to Cite This Entry:
Airy equation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Airy_equation&oldid=27208
Airy equation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Airy_equation&oldid=27208
This article was adapted from an original article by M.V. Fedoryuk (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article