References
- O. P. Agrawal (2002). Solution for fractional diffusion wave equation defined in bounded domain. Nonlinear Dyn. 29:145–155.
- V. V. Anh and N. N. Leonenko (2001). Spectral analysis of fractional kinetic equations with random data. J. Stat. Phys. 104:1349–1387.
- R. L. Bagley (1983). Theorertical basis for the application of fractional calculus to viscoelasticity. J. Rheology 27(03):201–210.
- D. Bahuguna, S. Abbas, and J. Dabas (2008). Partial functional differential equation with an integral condition and applications to population dynamics. Nonlinear Anal. 69:2623–2635.
- D. Bahuguna and V. Raghavendra (1989). Rothe’s method to parabolic integrodiferential equation via abstact integrodifferential equation. Appl. Anal. 33:153–167.
- A. Chaoui and A. Guezane Lakoud (2012). Rothe-Galerkin’s method for a nonlinear integrodifferential equation. Boundary Value Problems 2012:10.
- A. Chaoui and A. Guezane Lakoud (2015). Solution to an integrodifferential equation with integral condition. Appl. Math. Comput. 266:903–908.
- M. EL-Borai (2002). Some probability densities and fundamental solutions of fractional evolution equations. Chaos Solitons Fractals 14:433–440.
- M. S. El-Azab (2007). Solution of nonlinear transport diffusion problem by linearisation. Appl. Math. Comput. 192:205–2015.
- N. Engeita (1996). On fractional calculus and fractional mulipoles in electromagnetism. IEEE Trans. 44(4):554–566.
- L. C. Evans (1990). Weak convergence methods for nonlinear partial differential equations. In: (CBMS) Conference Board of the Mathematical Sciences Regional Conference Series in Mathematics, Vol. 74. American Mathematical Society, Providence, RI.
- G. M. Mophou and G. M. N’Guérékata (2012). On class of fractional differential equations in Sobolev space. Appl. Anal. Int. J. 91(1):15–34.
- A. Guezane-Lakoud and D. Belakroum (2009). Rothe’s method for a telegraph equation with integral conditions. Nonlinear Anal. 70:3842–3853.
- A. Guezane-Lakoud, M. S. Jasmati, and A. Chaoui (2010). Rothe’s method for an integrodifferential equation with integral conditions. Nonlinear Anal. 72:1522–1530.
- R. Hilfer (2000). Application of Fractional Calculus in Physics. World Scientific, Singapore, 699–707.
- J. Kacur (1985). Method of Roth in evolution equations, In: Teubner Texte zur Mathematik, Vol. 80, B.G. Teubner; 1. Aufl edition (1985), Teubner, Leipzig.
- A. A. Kilbas, H. M. Srivastava, and J. J. Trujillo (2006). Theory and Applications of Fractional Differential Equations. Elsevier Science B. V., Amesterdam.
- K. Kuliev and L. -E. Petersson (2007). An extension of Rothe’s method to non-cylindrical domains. Appl. Math. 52(5):365–389.
- O. A. Ladyzenskaja (1956). On solution of nonstationary operator equations. Math. Sb. 39(4):491–524.
- O. A. Ladyzenskaja and N. N. Ural’ceva (1956). Boundary problems for linear and quasilinear parabolic equations. Am. Math. Soc. Transl. Ser. 2(47):217–299.
- F. Mainardi (1997). Fractal and Fractional Calculus in Cintinuum Mechanics. Springer, New York.
- F. Mainardi and P. Paradisi (1997). Model of diffusion waves in viscoelasticity based on fractal calculus. In Proceeding of IEEE Conference of Decision and Control, Vol. 5 (O. R. Gonzales, ed.), IEEE, New york, pp. 4961–4966.
- R. Magin (2004). Fractional calculus in bioengeenering. Crit. Rev. Biom. Eng 32(1):1–104.
- R. Metzler and Klafter (2000). The random walk’s guide to anoumalous diffusion:A fractional dynamics approach. Phys. Rep. 339:1–77.
- K. Nishimoto (1990). Fractional Calculus and its Applications. Nihon University, Koriyama.
- K. B. Oldham (2009). Fractional Differential equations in electrochemistry. Adv. Eng. Softw. 41(1):9–12.
- K. B. Oldham and J. Spanier (1974). The Fractional Calculus. Academic press, New york.
- I. Podlubny (1999). Fractional Differential Equations. Academic Press, San Diego.
- K. Rektorys (1971). On application of direct variational methods to the solution of parabolic boundary value problems of arbitrary order in space variables. Czech. Math. J. 21:318–339.
- K. Rektorys (1982). The Method of Discretization in Time and Partial Differential Equations. D. Reidel Publishing Company. Springer Netherlands.
- E. Rothe (1930). Zweidimensionale parabolische Randwertaufgaben als Grenz fall eindimonsionaler Randwertaufgaben. Math. Ann. 102:650–670.
- J. Sabatier, O. P. Agrawl, and J. A. T. Machado (2007). Advances in Fractional Calculus. Springer-Verlag, Springer Netherlands.