References
- P. Agarwal, M. Chand, D. Baleanu, D. Ó Regan and S. Jain, On the solutions of certain fractional kinetic equations involving k-Mittag-Leffler function, Advances in Difference Equations, (2018), 2018:249, doi.org/10.1186/s13662-018-1694-8.
- M.A. Asiru, Sumudu transform and the solution of integral equations of convolution type, Int. J. Math. Edu. Sci. Technol. 32 (2001) 906-910.
- Á. Baricz, Generalized Bessel function of first kind, Lecture Notes in Mathematics, Springer, Berlin, 2010.
- F.B.M. Belgacem, A.A. Karaballi, Sumudu transform fundamental properties investigations and applications. Int. J.Appl. Math. Stoch. Anal. (2006) . article ID 91083, 1-23.
- F.B.M. Belgacem, A.A. Karaballi, S.L. Kalla, Analytical investigations of the Sumudu transform and applications to integral production equations, Math. Probl. Eng. 3 (2003) 103-118.
- S. Bhatter, A. Mathur, D. Kumar, K. S. Nisar, J. Singh, Fractional modified Kawahara equation with Mittag Leffler law, Chaos, Solitons & Fractals, 2019, 109508.
- K.N. Bhowmick, Some relations between generalized Struve function and Hypergeometric function, Vijnana Parishad Anusandhan Patrika, 5 (1962), 93-99.
- K.N. Bhowmick, A generalized Struve function and recurrence formula, Vijnana Parishad Anusandhan Patrika, 6 (1963), 01-11.
- V.B.L. Chaurasia and S.C. Pandey, On the new computable solutions of the generalized fractional kinetic equations involving the generalized function for the fractional calculus and related functions, Astrophysics and Space Science, 317(2008), 213-219.
- D. Kumar, J. Singh and D. Baleanu, On the analysis of vibration equation involving a fractional derivative with Mittag-Leffler law, Mathematical Methods in the Applied Sciences (2019), DOI: 10.1002/mma.5903
- D. Kumar, J. Singh, M. Al Qurashi and D. Baleanu, A new fractional SIRS-SI malaria disease model with application of vaccines, anti-malarial drugs, and spraying, Advances in Difference Equations, 2019 (2019), 278.
- D. Kumar, J. Singh and D. Baleanu, A new analysis of Fornberg-Whitham equation pertaining to a fractional derivative with Mittag-Leffler type kernel, European Journal of Physical Plus, 133 (2) (2018), 70
- A. Erdélyi, W. Magnus, F. Oberhettinger and F. G. Tricomi, Tables of Integral Transforms, Vol. I, McGraw-Hill Book Company, Inc., New York-Toronto-London, 1954.
- G. Agarwal and K.S. Nisar, Certain fractional kinetic equations involving generalized K-functions, Analysis, 32(2019), 65–70
- A. Gupta and C.L. Parihar, On solutions of generalized kinetic equations of fractional order, Boletim da Sociedade Paranaense de Matemática, 32 (2014), 181-189.
- V.G. Gupta, B. Sharma and F.B.M. Belgacem, On the solutions of generalized fractional kinetic equations, Applied Mathematical Sciences, 19(2011), 899–910.
- H. Habenom, D.L. Suthar and M. Gbeyehu, Application of Laplace transform on fractional kinetic equation pertaining to the generalized Galué type Struve function. Advances in Mathematical Physics, Art ID. 5074039.
- H.J. Haubold and A.M. Mathai, The fractional Kinetic equation and thermonuclear functions, Astrophysics and Space Science, 327(2000), 53-63.
- B.N. Kanth, Integrals involving generalized Struve function, The Nepali Mathematical Sciences Report, 6(1991), 61-64.
- O. Khan, N.U. Khan, D. Baleanu and K.S. Nisar, Computable solution of fractional kinetic equations using Mathieu-type series, Advances in Difference Equations, 2019(2019), 234
- D. Kumar, S.D. Purohit, A. Secer and A. Atangana, On generalized fractional kinetic equations involving generalized Bessel function of the first kind, Mathematical Problems in Engineering, (2015), 7 Article ID289387.
- K.S. Miller and B. Ross, An Introduction to the fractional calculus and fractional differential equations, John Wiley and Sons, New York, 1993.
- K.S. Nisar, On solutions of fractional kinetic equation Involving Galué type generalization of Struve function, Proceedings of the 15th Annual Conference SSFA, 15(2016), 81-94.
- K.S. Nisar, D. Baleanu, and M.M.A. Qurashi, Fractional calculus and application of generalized Struve function, Springerplus 29;5(1):910, (2016), DOI 10.1186/s40064-016-2560-3.
- K.S. Nisar, S.D. Purohit and S.R. Mondal, Generalized fractional kinetic equations involving generalized Struve function of the first kind, Journal of King Saud University-Science, 28 (2016), 167–171.
- K.S. Nisar, S.R. Mondaland F.B.M. Belgacem, On fractional kinetic equations k-Struve functions based solutions. Alexandria engineering journal, 57(4)(2018), 3249-3254
- K.S. Nisar and F.B.M. Belgacem, Dynamic k-Struve Sumudu Solutions for Fractional Kinetic Equations, Advances in Difference Equations, 2017 (2017), 340
- K.S. Nisar, F. Qi, On solutions of fractional kinetic equations involving the generalized k-Bessel function, Note di Matematica, 37 (2017), 1-10
- K.S. Nisar, D.L. Suthar, S. D. Purohit, M. Aldhaifallah, Some unified integral associated with the generalized Struve function, Proceedings of the Jangjeon Mathematical Society, 20(2017), 261–267.
- K.B. Oldhman and J. Spanier, The Fractional Calculus. Theory and Applications of Differentiation and Integration to Arbitrary Order. Academic Press, New York, 1974.
- H. Orhan and N. Yagmur, Starlike and convexity of generalized Struve function, Abstract and Applied Analysis, (2013), Art. ID 954516:6.
- R.S. Pathak, Certain convergence theorems and asymptotic properties of a generalization of Lommel and Maitlaind transformation, Proceedings of the National Academy of Sciences, India, 36(1996), 81-86.
- E.D. Rainville, Special functions, The Macmillan Company, New York, 2013.
- A.J. Saichev and G.M. Zaslavsky, Fractional kinetic equations: solutions and applications, Chaos. An Interdisciplinary Journal of Nonlinear Science, 7(1997), 753-784.
- R.K. Saxena and S.L. Kalla, On the solutions of certain fractional kinetic equations, Applied Mathematics and Computation, 199(2008), 504-511.
- R.K. Saxena, A.M. Mathai and H.J. Haubold, On fractional kinetic equations, Astrophysics and Space Science, 282(2002), 281-287.
- R.K. Saxena, A.M. Mathai and H.J. Haubold, On generalized fractional kinetic equations, Physica A. Statistical Mechanics and its Applications, 344(2004), 657-664.
- R.P. Singh, On definite integrals involving generalized Struve’s function, Math Ed (Siwan), 22(1998), 62-66.
- G. Singh, P. Agarwal, M. Chand and S. Jain, Certain fractional kinetic equations involving generalized k-Bessel function, Transactions of A. Razmadze Mathematical Institute, (In press)
- J. Singh, D. Kumar and D. Baleanu, On the analysis of fractional diabetes model with exponential law, Advances in Difference Equations, 2018 (2018), 231
- I.N. Sneddon, The Use of Integral Transform, Tata McGrawHill, New Delhi, India, 1979.
- H.M. Srivastava, R.K. Saxena, Operators of fractional integration and their applications, Applied Mathematics and Computation, 118 (2001), 1-52.
- D.L. Suthar, S.D. Purohit and K.S. Nisar, Integral transforms of the Galué type Struve function, TWMS Journal of Applied and Engineering Mathematics, 8(2018), 114-121.
- G.K. Watugala, Sumudu transform: a new integral transform to solve differential equations and control engineering problems, Int. J. Math. Educ. Sci. Technol. 24 (1993) 35-43.
- G.K. Watugala, The Sumudu transform for functions of two variables, Math. Eng. Ind., 8 (2001), 293-302.
- A. Wiman, Uber de fundamental theorie der funktionen Ea(x), Acta Mathematica, 29(1905), 191–201.
- G.M. Zaslavsky, Fractional kinetic equation for Hamiltonian Chaos, Physica D. Nonlinear Phenomena, 76(1994), 110-122.