Distributional Laplace Transform of t^kF(t^r)

Article Sidebar

PDF
Published: Aug 31, 2014

Main Article Content

Satish K Panchal
Department of Mathematics, Dr. Babasaheb Ambedkar Marathwada University, Aurangabad, M.S. India

Abstract

In this note distributional Laplace transform of the function t^k f (t^r) is obtained and the relation between the distributional one-sided Laplace trnsform of t^k f (t^r), r > 0, and the distributional Hankel transform of f (t^r) is established.

Downloads

Download data is not yet available.

Article Details

How to Cite
Panchal, S. K. (2014). Distributional Laplace Transform of t^kF(t^r). Journal of Global Research in Mathematical Archives(JGRMA), 2(2), 33–36. Retrieved from https://jgrma.com/index.php/jgrma/article/view/158
Issue
Vol. 2 No. 2 (2014): February-2014
Section
Research Paper
Download Copyright
Author Biography

Satish K Panchal, Department of Mathematics, Dr. Babasaheb Ambedkar Marathwada University, Aurangabad, M.S. India

Associate Professor,

Department of Mathematics,
Dr. Babasaheb Ambedkar Marathwada University, Aurangabad, M.S. India. PIN - 431004

References

Bhonsle, B.R., 1962. A Relation between Laplace and Hankel Transforms. Proc.

Glasgow Mathematical Association, Vol. 5, Part 3, pp. 114-115.

Bhonsle, B.R., 1965. The Laplace Transform of t^µ f (t^λ). J. of Maths., Univ. of

Jabalpur (M.P) India Vol. 1, pp. 13-16.

Erdelyi, A., 1954. Tables of Integral Transforms. Vol. 1 and 2, McGraw Hill, New

York.

Sonwane, K.R., and Bhonsle, B.R., 1976. A Relation between Distributional one

sided Laplace transformation and Distributional Hankel Transformation. J. of

Shivaji Univ. (Science), 16, pp.11-12.

Sneddon, I.N., 1951.Fourier Transform, McGraw Hill.

Zemanian, A.H., 1968. Generalized Integral Transformations. Interscience Publishers, New York.