Positive and negative sets: Difference between revisions

Latest revision as of 00:42, 15 March 2013

In mathematics, the Kontorovich–Lebedev transform is an integral transform which uses a Macdonald function (modified Bessel function of the second kind) with imaginary index as its kernel. Unlike other Bessel function transforms, such as the Hankel transform, this transform involves integrating over the index of the function rather than its argument.

The transform of a function ƒ(x) and its inverse (provided they exist) are given below:

g (y) = \int_{0}^{\infty} f (x) K_{i y} (x) d x

f (x) = \frac{2}{π^{2} x} \int_{0}^{\infty} g (y) K_{i y} (x) \sinh (π y) y d y .

Laguerre previously studied a similar transform regarding Laguerre function as:

g (y) = \int_{0}^{\infty} f (x) e^{- x} L_{y} (x) d x

f (x) = \int_{0}^{\infty} \frac{g (y)}{Γ (y)} L_{y} (x) d y .

Erdélyi et al., for instance, contains a short list of Kontorovich–Lebedev transforms as well references to the original work of Kontorovich and Lebedev in the late 1930s. This transform is mostly used in solving the Laplace equation in cylindrical coordinates for wedge shaped domains by the method of separation of variables.

References

Erdélyi et al. Table of Integral Transforms Vol. 2 (McGraw Hill 1954)
I.N. Sneddon, The use of integral Transforms, (McGraw Hill, New York 1972)
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+{{Orphan|date=February 2013}}
+In [[mathematics]], the '''Kontorovich–Lebedev transform''' is an [[integral transform]] which uses a Macdonald function (modified [[Bessel function]] of the second kind) with [[Imaginary number|imaginary]] index as its '''kernel'''. Unlike other Bessel function transforms, such as the [[Hankel transform]], this transform involves integrating over the '''index''' of the function rather than its argument.
+The transform of a function ''&fnof;''(''x'') and its inverse (provided they exist) are given below:
+:<math>g(y) = \int_0^\infty f(x) K_{iy}(x) \, dx  </math>
+:<math>f(x) = \frac{2}{\pi^2 x} \int_0^\infty g(y) K_{iy}(x) \sinh (\pi y) y \, dy . </math>
+Laguerre previously studied a similar transform regarding [[Laguerre function]] as:
+:<math>g(y) = \int_0^\infty f(x)e^{-x} L_{y}(x) \, dx  </math>
+:<math>f(x) = \int_0^\infty \frac{g(y)}{\Gamma (y)} L_y(x) \, dy.  </math>
+Erdélyi ''et al.'', for instance, contains a short list of Kontorovich–Lebedev transforms as well references to the original work of Kontorovich and Lebedev<!-- I don't see any writings of Kontorovish and Lebedev cited here. --> in the late 1930s.  This transform is mostly used in solving the Laplace equation in cylindrical coordinates for wedge shaped domains by the method of separation of variables.
+== References ==
+* Erdélyi ''et al.'' ''Table of Integral Transforms Vol. 2'' (McGraw Hill 1954)
+* I.N. Sneddon, ''The use of integral Transforms'', (McGraw Hill, New York 1972)
+*{{Springer|id=k/k120090|title=Kontorovich–Lebedev transform}}
+{{DEFAULTSORT:Kontorovich-Lebedev transform}}
+[[Category:Integral transforms]]
+[[Category:Special functions]]
+{{Mathanalysis-stub}}

Positive and negative sets: Difference between revisions

Latest revision as of 00:42, 15 March 2013

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