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Mehler–Fock transform

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In mathematics, the Mehler–Fock transform is an integral transform introduced by Mehler (1881) and rediscovered by Fock (1943).

It is given by

F ( x ) = 0 P i t 1 / 2 ( x ) f ( t ) d t , ( 1 x ) , {\displaystyle F(x)=\int _{0}^{\infty }P_{it-1/2}(x)f(t)dt,\quad (1\leq x\leq \infty ),}

where P is a Legendre function of the first kind.

Under appropriate conditions, the following inversion formula holds:

f ( t ) = t tanh ( π t ) 1 P i t 1 / 2 ( x ) F ( x ) d x , ( 0 t ) . {\displaystyle f(t)=t\tanh(\pi t)\int _{1}^{\infty }P_{it-1/2}(x)F(x)dx,\quad (0\leq t\leq \infty ).}

References

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