We focus on the first author’sprevious work addressing macroscopic balance equations developed for different
spatial and temporal scales. We elaborate on previous findings so as to orient
the reader to fundamental concepts with which the mathematical formulations are
developed. The macroscopic balance Partial Differential Equations (PDE’s) are
obtained from their microscopic counterparts by volume averaging over a
Representative Elementary Volume (REV), considering a non-Brownian motion. The
macroscopic quantity of phase/component intensive quantities product, is the
premise of two concurrent decomposed macroscopic balance PDE’s of the
corresponding extensive quantity. These are concurrently valid at the primary
REV order of length and at a significantly smaller secondary length. The
hydrodynamic characteristic at the smaller spatial scale was found to always be
described by pure hyperbolic PDE’s, the solution of which presents displacement
of sharp fronts. Reported field observations of condensed colloidal parcels
motion, validate the suggestion of hyperbolic PDE’s describing fluid momentum
and components mass balance at the smaller spatial scale. Controlled
experiments supplemented by numerical predication can yield the hydrodynamic
interrelation between the two adjacent spatial scales.
Further, we focus on the first author
past developments concerning dominant macroscopic balance PDE’s of a phase mass
and momentum and a component mass following an onset of abrupt pressure change.
These account for the primary REV order of length and for evolving temporal
scales. Numerical simulations were found to be consistent in excellent
agreement with experimental observations. During the second time increment and
in view of the aforementioned developments, we presently elaborate on new
findings addressing theoretically the efficiency of expansion wave for
extracting solute from a saturated matrix. Simulations comparing between
pumping using an approximate analytical form based on Darcy’s equation and
numerical prediction addressing the emitting of an expansion wave, suggest that
the latter extracts by far more solute mass for a spectrum of different porous
media.
Application of spatial averaging rules, referring
to a REV, leads to the formulation of the macroscopic balance equations
addressing phase interactions such as fluids carrying components and a
deformable porous matrix. Further elaborations by Sorek et al. Sorek and Ronen and Sorek et al. prove that the phases and components
macroscopic balance PDE’s can be decomposed into a primary part that refers to
the REV length scale and, concurrently, a secondary part valid at a length
scale smaller than that of the corresponding REV length.
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