| [1] Bavrin I I. Operators for harmonic functions and their applications. Differential Equations, 1985, 21(1):6-10
[2] Berdyshev A S, Nieto J J, Kadirkulov B J. Solvability of an elliptic partial differential equation with boundary condition involving fractional derivatives. Complex Variables and Elliptic Equations, 2014, 59(5):680-692
[3] Berdyshev A S, Turmetov B Kh, Kadirkulov B J. Some properties and applications of the integrodifferential operators of Hadamard-Marchaud type in the class of harmonic function. Siberian Mathematical J, 2012, 53(4):600-610
[4] Bitsadze A V. Equations of Mathematical Physics. Moscow:Mir Publishers, 1980
[5] Erdely A. On fractional integration and its applications to the theory of Hankel transforms. Quart J Math Oxford, 1940, 11(1):293-303
[6] Ferreira N M F, Duarte F B, Lima M F M, Marcos M G, Tenreiro Machado J A. Application of fractional calculus in the dynamical analysis and control of mechanical manipulations. Frac Calc Appl Anal, 2008, 11(1):91-113
[7] Gilbarg D, Trudinger N. Elliptical Partial Differential Equations of the Second Order. Berlin:Springer-Verlag, 1998
[8] Hilfer R. Fractional calculus and regular variation in thermodynamics//Hilfer R, ed. Applications of Fractional Calculus in Physics. Singapore:World Scientific, 2000
[9] Jesus I S, Tenreiro Machado J A, Cunha J B. Fractional impedance in botanical elements. J Vibration and Control, 2008, 14(9/10):1389-1402
[10] Jesus I S, Tenreiro Machado J A. Fractional control of heat diffusion systems. Nonlinear Dyn, 2008, 54:263-282
[11] Karachik V V, Turmetov B Kh, Torebek B T. On some integro-differential operators in the class of harmonic functions and their applications. Siberian Adv Math, 2012, 22(2):115-134
[12] Kilbas A A, Srivastava H M, Trujillo J J. Theory and Applications of Fractional Differential Equations. Amsterdam:Elsevier, 2006
[13] Kirane M, Tatar N E. Nonexistence for the Laplace equation with a dynamical boundary condition of fractional type. Siberian Math J, 2007, 48(5):849-856
[14] Kober H. On a fractional integral and derivative. Quart J Math Oxford, 1940, 11(1):193-211
[15] Koeller R C. Application of fractional calculus to the theory of viscoelasticity. J Appl Mech, 1984, 51:299-307
[16] Serbina L I. A model of substance transfer in fractal media. J Math Model, 2003, 15:17-28
[17] Sneddon I N. The use in mathematical analysis of the Erdelyi-Kober operators and some of their applications//Lect Notes Math 457. New York:SpringerVerlag, 1975:3779
[18] Tenreiro Machado J A. Theory of fractional integrals and derivatives:application to motion control//Proceedings of International Conference on recent advances in Mechatronics (ICRAM 95). Istanbul, Turkey, 14-16 August 1995
[19] Torebek B T, Turmetov B Kh. On Solvability of a Boundary Value Problem for the Poisson Equation with the Boundary operator of a fractional order. Boundary Value Problems, 2013, 93:1-18
[20] Umarov S R, Luchko Yu F, Gorenflo R. On boundary value problems for elliptic equations with boundary operators of fractional order. Frac Calc Appl Anal, 2000, 3(4):454-468
[21] Umarov S R. On certain boundary-value-problems for elliptic-equations with boundary operator of fractional order. Doklady Akademii Nauk, 1993, 333(6):708-710
[22] Turmetov B Kh. A boundary value problem for the harmonic equation. Differential Equations, 1996, 32(8):1093-1096
[23] Berdyshev A S, Cabada A, Turmetov B Kh. On solvability of a boundary value problem for a nonhomo-geneous biharmonic equation with a boundary operator of a fractional order. Acta Mathematica Scientia, 2014, 34B(6):1695-1706 |