The anomalous transport of a viscous fluid across a porous media with power-law scaling of the geometrical features of the pores is dealt with in the paper. It has been shown that, assuming a linear force-flux relation for the motion in a porous solid, then a generalized version of the Hagen-Poiseuille equation has been obtained with the aid of Riemann-Liouville fractional derivative. The order of the derivative is related to the scaling property of the considered media yielding an appropriate mechanical picture for the use of generalized fractional-order relations, as recently used in scientific literature.
Alaimo, G., Zingales, M. (2014). Laminar flow through fractal porous materials: The fractional-order transport equation. COMMUNICATIONS IN NONLINEAR SCIENCE & NUMERICAL SIMULATION, 22(1-3), 889-902 [10.1016/j.cnsns.2014.10.005].
Laminar flow through fractal porous materials: The fractional-order transport equation
ZINGALES, Massimiliano
2014-01-01
Abstract
The anomalous transport of a viscous fluid across a porous media with power-law scaling of the geometrical features of the pores is dealt with in the paper. It has been shown that, assuming a linear force-flux relation for the motion in a porous solid, then a generalized version of the Hagen-Poiseuille equation has been obtained with the aid of Riemann-Liouville fractional derivative. The order of the derivative is related to the scaling property of the considered media yielding an appropriate mechanical picture for the use of generalized fractional-order relations, as recently used in scientific literature.
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