The Flow Analysis of Fiuids in Fractal Reservoir with the Fractional Derivative

In this paper, fractional order derivative, fractal dimension and spectral dimension are introduced into the seepage flow mechanics to establish the flow models of fluids in fractal reservoirs with the fractional derivative. The flow characteristics of fluids through a fractal reservoir with the fractional order derivative are studied by using the finite integral transform, the discrete Laplace transform of sequential fractional derivatives and the generalized Mittag-Leffler function. Exact solutions are obtained for arbitrary fractional order derivative. The long-time and short-time asymptotic solutions for an infinite formation are also obtained. The pressure transient behavior of fluids flow through an infinite fractal reservoir is studied by using the Stehfest’ s inversion method of the numerical Laplace transform. It shows that the order of the fractional derivative affect the whole pressure behavior, particularly, the effect of pressure behavior of the early-time stage is larger The new type flow model of fluid in fractal reservoir with fractional derivative is provided a new mathematical model for studying the seepage mechanics of fluid in fractal porous media.

[1]  Feng Xian,et al.  An exact solution of unsteady Couette flow of generalized second grade fluid , 2002 .

[2]  Y. Yortsos,et al.  Pressure Transient Analysis of Fractal Reservoirs , 1990 .

[3]  S. Li-na The generalized flow analysis of non-Newtonian visco-elastic fluid flows in porous media , 2004 .

[4]  I. Podlubny Fractional differential equations , 1998 .

[5]  Analysis of general second-order fluid flow in double cylinder rheometer , 1997 .

[6]  Fractal analysis of pressure transients in the Geysers Geothermal Field , 1992 .

[7]  C. Friedrich Relaxation and retardation functions of the Maxwell model with fractional derivatives , 1991 .

[8]  Mingyu Xu,et al.  Theoretical analysis of the velocity field, stress field and vortex sheet of generalized second order fluid with fractional anomalous diffusion , 2001 .

[9]  Joe M. Kang,et al.  Pressure Behavior of Transport in Fractal Porous Media Using a Fractional Calculus Approach , 2000 .

[10]  D. Y. Song,et al.  Study on the constitutive equation with fractional derivative for the viscoelastic fluids – Modified Jeffreys model and its application , 1998 .

[11]  Y. Yortsos,et al.  Practical Application of Fractal Pressure Transient Analysis of Naturally Fractured Reservoirs , 1995 .

[12]  Tong Deng-ke,et al.  Generalized flow analysis of non-Newtonian visco-elastic fluid flow through fractal reservoir , 1999 .

[13]  M. Buès,et al.  Diffusion of macromolecular solutions in a turbulent boundary layer of a cylindrical pipe , 1988 .