This is a preview of subscription content, log in via an institution to check access.
References
E. Artin, The gamma function, Hold, Rinehart, and Winston (1964).
A. Erdelyi, et al., Higher transcendental functions I, McGraw-Hill (1953).
A. Erdelyi, Tables of integral transforms I, McGraw-Hill (1954).
D. T. Haimo, Functions with the Huygens property,Bull. Amer. Math. Soc.,71, No. 3 (1965), 528–532.
D. T. Haimo, Generalized temperature functions,Duke Math. J.,33, No. 2 (1966), 305–322.
D. T. Haimo, Expansions in terms of generalized heat polynomials and of their Appell transforms,J. Math. Mech.,15, No. 5 (1966), 735–358.
D. T. Haimo, The reduced Poisson-Hankel transform I,Bul. Inst. Polit. Iasi, XIII (XVII), (1967), 39–42.
D. T. Haimo, The reduced Poisson-Hankel transform II,Bul. Inst. Polit. Iasi, XIV (XVIII), (1968), 105–109.
D. T. Haimo, and F. M. Cholewinski, The Weierstrass-Hankel convolution transform,J. d'Analyse Math.,17 (1966), 1–58.
D. T. Haimo, and F. M. Cholewinski, Inversion of the Hankel potential transform,Pacific J. Math.,37, No. 2 (1971), 319–330.
I. I. Hirschman, Jr., and D. V. Widder, The convolution transform, Princeton (1955).
D. V. Widder, The Laplace transform, Princeton (1946).
D. V. Widder, Inversion of a heat transform by use of series,J. d'Analyse Math.,18 (1967), 389–413.
D. V. Widder, Inversion of a convolution transform by use of series,J. d'Analyse Math.,21 (1968), 293–312.
Author information
Authors and Affiliations
Additional information
The research was supported in part by the National Science Foundation for the first author under grant GP 20536 and for the second under grant GP 23118.
Rights and permissions
About this article
Cite this article
Haimo, D.T., Cholewinski, F.M. Inversion of the reduced Poisson-Hankel transform. J. Anal. Math. 25, 323–343 (1972). https://doi.org/10.1007/BF02790044
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF02790044