References
- R. Hilfer (ed.), Applications of Fractional Calculus in Physics, World Scientific Publishing Company , Singapore, New Jersey, London and Hong Kong , (2000).
- A.A. Kilbas , Fractional calculus of generalized wright function, Fractional Calculus and Applied Analysis , 8.2, p.p. 113-126, (2005).
- S.G. Samko , A.A. Kilbas and O.I. Marichev , Fractional Integral and Derivatives, Theory and Applications, Gordon Breach, Yverdon (1993).
- V.B.L. Chaurasia and R.S. Dubey , Analytical solution for the differential equation containing generalized fractional derivative operators and Mittag-Leffler-type function, ISRN Applied Mathematics , 2011, (2011).
- R.S. Dubey , P. Goswami , F.B.M. Belgacem , Generalized time-fractional telegraph equation analytical solution by Sumudu and Fourier transforms, Jou. of Fra. Cal. & Appli , 5.2, p.p. 52-58, (2014).
- Ravi Shanker Dubey , B. S. T. Alkahtani , A. Atangana , Analytical solution of space-time fractional fokker plank equation by homotopy perturbation Sumudu transform method, Math. Probl. Eng ., (2014), doi./10.1155/2014 /780929.
- V. Gill and R. S. Dubey , New Analytical Method for Klein-Gordon Equations Arising in Quantum Field Theory, European Journal of Advances in Engineering and Technology , 5.8, p.p. 649-655 (2018).
- R. S. Dubey , Pranay Goswami , Analytical solution of the nonlinear diffusion equation, The European Physical Journal Plus , 5, 183, (2018). doi: 10.1140/epjp/i2018-12010-6
- Hari M Srivastava , Ravi Shanker Dubey , Monika Jain , A study of the fractional-order mathematical model of diabetes and its resulting complications, Mathematical Methods in the Applied Sciences , 42.13, p.p. 4570-4583, (2019). doi: 10.1002/mma.5681
- Ravi Shanker Dubey , B. S. T. Alkahtani and A. Atangana , Analytical solution of space-time fractional Fokker-Plank equation by homotopy perturbation Sumudu transform method, Mathematical Problems in Engineering , 2015, p.p 01-07, (2015), Article ID 780929.
- Ravi Shanker Dubey , F B M Belgacem , and Pranay Goswami , Homotopy perturbation approximate solutions for Bergman’s minimal blood glucose-insulin model, Fractal Geometry and Nonlinear Analysis in Medicine and Biology , 2.3, p.p. 1-6, (2016).
- V. B. L. Chaurasia and Ravi Shanker Dubey , Analytical solution for the generalized time fractional telegraph equation, Fractional Differential Calculus , 3, p.p 21-29, (2013). doi: 10.7153/fdc-03-02
- B. S. T. Alkahtani , J. O. Alkahtani , Ravi Shanker Dubey and Pranay Goswami , The solution of modified fractional Bergman’s minimal blood glucose-insulin model, Entropy , 19.5, p.p 1-11 (2017). doi: 10.3390/e19050114
- B. S. T. Alkahtani , J. O. Alkahtani , Ravi Shanker Dubey and P. Goswami , Solution of fractional oxygen diffusion problem having without singular kernel, Journal of Nonlinear Sciences and Applications , 11, p.p.1-9, (2016).
- Mohamed A. E. Herzallah and Ashraf H. A. Radwan , Existence and uniqueness of solutions to nonlocal-impulsive fractional Cauchy semilinear conformable differential equations, Journal of Interdisciplinary Mathematics , 22.8, pp. 1295-1310, (2020). doi: 10.1080/09720502.2019.1696921
- R Jain , K Arekar , R S. Dubey , Study of Bergman’s minimal blood glucose-insulin model by Adomian decomposition method, Journal of Information and Optimization Sciences , 38 .1, p.p. 133-149, (2017). doi: 10.1080/02522667.2016.1187919
- A. Atangana and D. Baleanu . New fractional derivatives with nonlocal and non-singular kernel, Theory and application to heat transfer model, Thermal Science , 20.2, pp. 763-769, (2016). doi: 10.2298/TSCI160111018A
- M. Shrahili , Ravi Shanker Dubey , and A. Shafay , Inclusion of fading memory to Banister model of changes in physical condition, Discrete and Continuous Dynamical Systems S , 12, p.p. 396-406, (2019).
- R. S. Dubey and P. Goswami , Mathematical Model of Diabetes and its Complication Involving Fractional Operator Without Singular Kernal, Discrete And Continuous Discrete and Continuous Dynamical Systems S , xx, p.p. x-x, (2019). doi:10.3934/dcdss.2020144
- Hammad, Mámon Abu , et al. “Fractional Gauss hypergeometric differential equation.” Journal of Interdisciplinary Mathematics 22.7 (2019): 1113-1121. doi: 10.1080/09720502.2019.1706838
- A.A. Kilbas , M. Saigo and J.J. Trujillo , On the generalized Wright function, Fractional Calculus and Applied Analysis , 5.4, p.p. 437-460, (2002).
- H.M. Srivastava , and Ž. Tomovski , Fractional calculus with an integral operator containing a generalized Mittag-Leffler function in the kernel, Applied Mathematics and Computation , 211, p.p.198–210, (2009). doi: 10.1016/j.amc.2009.01.055
- R. Diaz and E. Pariguan , On hypergeometric functions and Pochhammer k-symbol, Divulgaciones Mathematicas , 15, p.p. 179-192, (2007).
- E. M. Wright , The asymptotic expansion of the generalized hypergeometric function, Journal of the London Mathematical Society 10, p.p 287-293, (1935).
- E.M. Wright , The asymptotic expansion of integral functions defined by Taylor series, Philosophical Transactions of the Royal Society of London, Series A , 238, p.p. 423-451, (1940). doi: 10.1098/rsta.1940.0002
- R. S. Dubey , Anil Sharma , and Monika Jain , Study of Incomplete Elliptic Integrals Pertaining to Function, Journal of Applied Mathematics, Statistics and Informatics , 14.2, p.p 11-18, (2018). doi: 10.2478/jamsi-2018-0009