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Mathematics Subject Classification: 33D15, 44A10, 44A20The present paper deals with the evaluation of the q-Laplace transforms of a product of basic analogues of the Bessel functions. As applications, several useful special cases have been deduced.

On rational classical orthogonal polynomials and their application for explicit computation of inverse Laplace transforms.

Masjed-Jamei, Mohammad, Dehghan, Mehdi (2005)

Mathematical Problems in Engineering

On rational De Rham cohomology associated with the generalized airy function

Hironobu Kimura (1997)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

On recurrence relations for radial wave functions for the $N$ -th dimensional oscillators and hydrogenlike atoms: analytical and numerical study.

Álvarez-Nodarse, R., Cardoso, J.L., Quintero, N.R. (2006)

ETNA. Electronic Transactions on Numerical Analysis [electronic only]

On Reimer recurrences

Al-Salam, W.A., Chihara, T.S. (1979)

Portugaliae mathematica

On rules of derivation with complex order for analytic and branched functions

Campos, L.M.B.C. (1985/1986)

Portugaliae mathematica

On solutions of differential equations with ``common zero'' at infinity

Árpád Elbert, Jaromír Vosmanský (1997)

Archivum Mathematicum

The zeros $c_{k} (ν)$ of the solution $z (t, ν)$ of the differential equation $z^{''} + q (t, ν) z = 0$ are investigated when $lim_{t \to \infty} q (t, ν) = 1$ , $\int^{\infty} | q (t, ν) - 1 | d t < \infty$ and $q (t, ν)$ has some monotonicity properties as $t \to \infty$ . The notion $c_{κ} (ν)$ is introduced also for $κ$ real, too. We are particularly interested in solutions $z (t, ν)$ which are “close" to the functions $sin t$ , $cos t$ when $t$ is large. We derive a formula for $d c_{κ} (ν) / d ν$ and apply the result to Bessel differential equation, where we introduce new pair of linearly independent solutions replacing the usual pair $J_{ν} (t)$ , $Y_{ν} (t)$ . We show the concavity of $c_{κ} (ν)$ for $| ν | \geq \frac{1}{2}$ and also...

On Some Applications Related To Fox's H-Functions Of Two Variables

Manilal Shah (1973)

Publications de l'Institut Mathématique

On some applications related to Fox's H-functions of two variables.

M. Shah (1973)

Publications de l'Institut Mathématique [Elektronische Ressource]

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