Abstract
In this paper, we obtain a integral involving the general class of polynomials (Srivastava polynomials) and Special functions which are the adequately general in nature and are capable of yielding a large number of simpler and useful results merely by specializing the parameters. For the sake of illustration, some corollaries are also recorded here as special case of our main result.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Ayant, F.Y.: An integral associated with the Aleph-functions of several variables. Int. J. Math. Trends Technol. 31(3), 142–154 (2016)
Ayant, F.Y., Kumar, D.: A unified study of Fourier series involving the Aleph-function and the Kampé de Fériet’s function. Int. J. Math. Trends Technol. 35(1), 40–48 (2016)
Ayant, F.Y., Kumar, D.: Certain finite double integrals involving the hypergeometric function and Aleph-function. Int. J. Math. Trends Technol. 35(1), 49–55 (2016)
Baleanu, D., Kumar, D., Purohit, S.D.: Generalized fractional integrals of product of two \(H\)-functions and a general class of polynomials. Int. J. Comput. Math. 93(8), 1320–1329 (2016)
Bansal, M.K., Kumar, D., Harjule, P., Singh, J.: Fractional Kinetic equations associated with incomplete \(I\)-functions. Fractal Fract. 4, 19 (2020)
Bansal, M.K., Kumar, D., Khan, I., Singh, J., Nisar, K.S.: Certain unified integrals associated with product of \(M\)-series and incomplete \(H\)-functions. Mathematics 7, 1191 (2019)
Bansal, M.K., Kumar, D., Singh, J., Nisar, K.S.: On the solutions of a class of integral equations pertaining to incomplete \(H\)-function and incomplete \(\bar{H}\)-function. Mathematics 8, 819 (2020)
Bansal, M.K., Kumar, D., Singh, J., Tassaddiq, A., Nisar, K.S.: Some new results for the Srivastava–Luo–Raina \(\mathbb{M}\)-transform pertaining to the incomplete \(H\)-functions. AIMS Math. 5(1), 717–722 (2020)
Chaurasia, V.B.L., Singh, Y.: New generalization of integral equations of Fredholm type using Aleph-function. Int. J. Mod. Math. Sci. 9(3), 208–220 (2014)
Choi, J., Kumar, D.: Certain unified fractional integrals and derivatives for a product of Aleph function and a general class of multivariable polynomials. J. Inequal. Appl. 2014, 1–15 (2014)
Daiya, J., Ram, J., Kumar, D.: The multivariable \(H\)-function and the general class of Srivastava polynomials involving the generalized Mellin–Barnes contour integrals. FILOMAT 30(6), 1457–1464 (2016)
Gupta, R.K., Shaktawat, B.S., Kumar, D.: On generalized fractional differentials involving product of two \(H\)-functions and a general class of polynomials. J. Raj. Acad. Phys. Sci. 15(4), 327–344 (2016)
Kumar, D.: Fractional calculus formulas involving \(H\)-function and Srivastava polynomials. Commun. Korean Math. Soc. 31(4), 827–844 (2016)
Kumar, D.: Generalized fractional differintegral operators of the Aleph-function of two variables. J. Chem. Biol. Phys. Sci. Sect. C 6(3), 1116–1131 (2016)
Kumar, D., Agarwal, P., Purohit, S.D.: Generalized fractional integration of the \(H\)-function involving general class of polynomials. Walailak J. Sci. Technol. 11(12), 1019–1030 (2014)
Kumar, D., Purohit, S.D., Choi, J.: Generalized fractional integrals involving product of multivariable \(H\)-function and a general class of polynomials. J. Nonlinear Sci. Appl. 9, 8–21 (2016)
Kumari, S.K., Nambisan, V.T.M., Rathie, A.K.: A study of \(I\)-functions of two variables. Le Mat. LXIX(1), 285–305 (2014)
Ram, J., Kumar, D.: Generalized fractional integration of the \(\aleph \)-function. J. Raj. Acad. Phys. Sci. 10(4), 373–382 (2011)
Saxena, R.K., Kumar, D.: Generalized fractional calculus of the Aleph-function involving a general class of polynomials. Acta Math. Sci. 35(5), 1095–1110 (2015)
Saxena, R.K., Ram, J., Kumar, D.: Generalized fractional integral of the product of two Aleph-functions. Appl. Appl. Math. 8(2), 631–646 (2013)
Sharma, C.K., Ahmad, S.S.: On the multivariable \(I\)-function. Acta Ciencia Indica Math. 20(2), 113–116 (1994)
Sharma, C.K., Mishra, P.L.: On the \(I\)-function of two variables and its properties. Acta Ciencia Indica Math. 17, 667–672 (1991)
Sharma, K.: On the integral representation and applications of the generalized function of two variables. Int. J. Math. Eng. Sci. 3, 1–13 (2014)
Srivastava, H.M.: A multi-linear generating function for the Konhauser set of biorthogonal polynomials suggested by Laguerre polynomial. Pac. J. Math. 177, 183–191 (1985)
Südland, N., Baumann, B., Nonnenmacher, T.F.: Open problem: who knows about the Aleph-functions? Fract. Calc. Appl. Anal. 1(4), 401–402 (1998)
Acknowledgements
The authors would like to thank the anonymous reviewer for their valuable comments and suggestions to improve the quality of the paper.
Author information
Authors and Affiliations
Corresponding author
Additional information
Publisher's Note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
About this article
Cite this article
Kumar, D., Ayant, F. & Prakash, A. Certain integral involving the product of Srivastava polynomials and special functions. Afr. Mat. 32, 1111–1119 (2021). https://doi.org/10.1007/s13370-021-00885-7
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s13370-021-00885-7
Keywords
- Aleph-function of several variables
- General class of Srivastava polynomials
- Aleph-function of one and two variables
- I-function of two and several variables