The Laplace transform on a class of Boehmians

Dennis Nemzer

doi:10.1017/S0004972700011965

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

The one-sided Laplace transform is defined on a space of generalised functions called transformable Boehmians. The space of one-sided Laplace transformable distributions is shown to be a proper subspace of transformable Boehmians. Some basic properties of the Laplace transform are investigated. An inversion formula and an Abelian theorem of the final type are obtained.

References

[1]Boehme, T.K., ‘On power series in the differentiation operator’, Studia. Math. (1973), 309–317.Google Scholar

[2]Boehme, T.K., ‘The support of Mikusinski operators’, Trans. Amer. Math. Soc. 176 (1973), 319–334.Google Scholar

[3]Doetsch, G., Theorie der Laplace-transformation Band 1 (Verlag Birkhauser, Basel, 1950).Google Scholar

[4]Mikusinski, P., ‘Convergence of Boehmians’, Japan. J. Math. 9 (1983), 159–179.Google Scholar

[5]Mikusinski, P., ‘Boehmians as generalized functions’, Acta Math. Hungar. 51 (1988), 271–281.Google Scholar

[6]Mikusinski, P., ‘On harmonic Boehmians’, Proc. Amer. Math. Soc. 106 (1989), 447–449.CrossRef Google Scholar

[7]Mikusinski, P., ‘Boehmians on open sets’, Acta Math. Hungar. 55 (1990), 63–73.Google Scholar

[8]Nemzer, D., ‘Periodic Boehmians’, Internat. J. Math. Math. Sci. 12 (1989), 685–692.Google Scholar

[9]Nemzer, D., ‘Periodic Boehmians II’, Bull. Austral. Math. Soc. 44 (1991), 271–278.Google Scholar

[10]Sonavane, K.R., ‘A representation of one-sided Laplace transformable generalized functions’, Indian J. Pure Appl. Math. 7 (1976), 477–481.Google Scholar

[11]Zemanian, A.H., Distribution theory and transform analysis (Dover Publications, New York, 1987).Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Mikusiński, Piotr 1995. Tempered Boehmians and ultradistributions. Proceedings of the American Mathematical Society, Vol. 123, Issue. 3, p. 813.

Karunakaran, V. and Thilaga, V. Baby 1998. Plancherel Theorem for Vector Valued Functions and Boehmians. Rocky Mountain Journal of Mathematics, Vol. 28, Issue. 4,

Karunakaran, V. and Kalpakam, N.V. 2000. Boehmians and fourier transform. Integral Transforms and Special Functions, Vol. 9, Issue. 3, p. 197.

Karunakaran, V. and Kalpakam, N.V. 2000. Hilbert transform for boehmians. Integral Transforms and Special Functions, Vol. 9, Issue. 1, p. 19.

Roopkumar, R. and Negrin, E.R. 2010. Poisson transform on Boehmians. Applied Mathematics and Computation, Vol. 216, Issue. 9, p. 2740.

Roopkumar, R. 2011. EXTENDED RIDGELET TRANSFORM ON DISTRIBUTIONS AND BOEHMIANS. Asian-European Journal of Mathematics, Vol. 04, Issue. 03, p. 507.

Roopkumar, R. and Negrin, E. R. 2011. A unified extension of Stieltjes and Poisson transforms to Boehmians. Integral Transforms and Special Functions, Vol. 22, Issue. 3, p. 195.

Roopkumar, R. Negrin, E. R. and Ganesan, C. 2013. FOURIER SINE AND COSINE TRANSFORMS ON BOEHMIAN SPACES. Asian-European Journal of Mathematics, Vol. 06, Issue. 01, p. 1350005.

Roopkumar, R. 2013. Stockwell transform for Boehmians. Integral Transforms and Special Functions, Vol. 24, Issue. 4, p. 251.

Nemzer, Dennis 2014. Extending the Stieltjes transform II. Fractional Calculus and Applied Analysis, Vol. 17, Issue. 4, p. 1060.

AGARWAL, PRAVEEN AL-OMARI, S.K.Q. and CHOI, JUNESANG 2015. REAL COVERING OF THE GENERALIZED HANKEL-CLIFFORD TRANSFORM OF FOX KERNEL TYPE OF A CLASS OF BOEHMIANS. Bulletin of the Korean Mathematical Society, Vol. 52, Issue. 5, p. 1607.

Akila, L. and Roopkumar, R. 2016. Quaternionic Stockwell transform. Integral Transforms and Special Functions, Vol. 27, Issue. 6, p. 484.

Akila, Lakshmanan and Roopkumar, Rajakumar 2016. Multidimensional Quaternionic Gabor Transforms. Advances in Applied Clifford Algebras, Vol. 26, Issue. 3, p. 985.

Ganesan, Chinnaraman and Roopkumar, Rajakumar 2016. CONVOLUTION THEOREMS FOR FRACTIONAL FOURIER COSINE AND SINE TRANSFORMS AND THEIR EXTENSIONS TO BOEHMIANS. Communications of the Korean Mathematical Society, Vol. 31, Issue. 4, p. 791.

Nemzer, D. 2016. Boehmians ofLp- growth. Integral Transforms and Special Functions, Vol. 27, Issue. 8, p. 653.

Al-Omari, Shrideh K. Q. Jumah, Ghalib Al-Omari, Jafar and Saxena, Deepali 2018. A New Version of the Generalized Krätzel–Fox Integral Operators. Mathematics, Vol. 6, Issue. 11, p. 222.

Al‐Omari, Shrideh K. Q. 2019. Some remarks on short‐time Fourier integral operators and classes of rapidly decaying functions. Mathematical Methods in the Applied Sciences, Vol. 42, Issue. 16, p. 5354.

Al-Omari, Shrideh Khalaf 2019. A study on a class of modified Bessel-type integrals in a Fréchet space of Boehmians. Boletim da Sociedade Paranaense de Matemática, Vol. 38, Issue. 4, p. 145.

Al‐Omari, Shrideh K. Q. and Baleanu, Dumitru 2020. A quadratic‐phase integral operator for sets of generalized integrable functions. Mathematical Methods in the Applied Sciences,

Loualid, El Mehdi Berkak, Imane and Daher, Radouan 2021. The Watson Fourier transform on a certain class of generalized functions. Rendiconti del Circolo Matematico di Palermo Series 2, Vol. 70, Issue. 3, p. 1425.

Download full list

Article contents

The Laplace transform on a class of Boehmians

Abstract

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests