Laguerre transform
In mathematics, Laguerre transform is an integral transform named after the mathematician Edmond Laguerre, which uses generalized Laguerre polynomials as kernels of the transform.[1][2][3][4]
The Laguerre transform of a function is
The inverse Laguerre transform is given by
Some Laguerre transform pairs
| [5] | |
| [6] |
![{\displaystyle {\frac {a^{n}}{(1+a^{2})^{\frac {n+1}{2}}}}\sin \left[n\tan ^{-1}{\frac {1}{a}}+\tan ^{-1}(-a)\right]}](../I/m/f0b1a2c2e2ce9f077689837d2b1a2af96e4e5119.svg)
![{\displaystyle {\frac {a^{n}}{(1+a^{2})^{\frac {n+1}{2}}}}\cos \left[n\tan ^{-1}{\frac {1}{a}}+\tan ^{-1}(-a)\right]}](../I/m/894d6148550bba58ea14b266d5d885cb8ea28843.svg)
![{\displaystyle (xz)^{-\alpha /2}e^{z}J_{\alpha }\left[2(xz)^{1/2}\right],\ |z|<1,\ \alpha \geq 0\,}](../I/m/894cd3f45c69785b9030cdf745e80a79ba06003a.svg)
![{\displaystyle e^{x}x^{-\alpha }{\frac {d}{dx}}\left[e^{-x}x^{\alpha +1}{\frac {d}{dx}}\right]f(x)\,}](../I/m/872d378ed00d66ba0db16eb410150afb19aa88eb.svg)
![{\displaystyle \left\{e^{x}x^{-\alpha }{\frac {d}{dx}}\left[e^{-x}x^{\alpha +1}{\frac {d}{dx}}\right]\right\}^{k}f(x)\,}](../I/m/bfbae6a8e321b1b5e7c3fb685045f144a09a4c90.svg)
![{\displaystyle {\frac {\Gamma (n+\alpha +1)}{{\sqrt {\pi }}\Gamma (n+1)}}\int _{0}^{\infty }e^{-t}t^{\alpha }f(t)dt\int _{0}^{\pi }e^{-{\sqrt {xt}}\cos \theta }\sin ^{2\alpha }\theta g(x+t+2{\sqrt {xt}}\cos \theta ){\frac {J_{\alpha -1/2}({\sqrt {xt}}\sin \theta )}{[({\sqrt {xt}}\sin \theta )/2]^{\alpha -1/2}}}d\theta \,}](../I/m/f112e6d709418634355b3d14a5a2b45aa5f671ea.svg)
References
- ↑ Debnath, Lokenath, and Dambaru Bhatta. Integral transforms and their applications. CRC press, 2014.
- ↑ Debnath, L. "On Laguerre transform." Bull. Calcutta Math. Soc 52 (1960): 69-77.
- ↑ Debnath, L. "Application of Laguerre Transform on heat conduction problem." Annali dell’Università di Ferrara 10.1 (1961): 17-19.
- ↑ McCully, Joseph. "The Laguerre transform." SIAM Review 2.3 (1960): 185-191.
- ↑ Howell, W. T. "CI. A definite integral for legendre functions." The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science 25.172 (1938): 1113-1115.
- ↑ Debnath, L. "On Faltung theorem of Laguerre transform." Studia Univ. Babes-Bolyai, Ser. Phys 2 (1969): 41-45.
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