Several applications such as liquid-liquid extraction in micro-fluidic devices are concerned with the flow of two immiscible liquid phases. The commonly observed flow regimes in these systems are slug-flow and stratified flow. The latter regime in micro-channels has the inherent advantage that separation of the two liquids at the exit is efficient. Recently extraction in a stratified counter-current flow has been studied experimentally and it has been shown to be more efficient than co-current flow. An analytical as well as a numerical method to determine the steady-state solution of the corresponding convection-diffusion equation for the two flow-fields is presented. It is shown that the counter-current process is superior to the co-current process for the same set of parameters and operating conditions. A simplified model is proposed to analyse the process when diffusion in the transverse direction is not rate limiting. Different approaches to determining mass transfer coefficient are compared. The concept of log mean temperature difference used in design of heat exchangers is extended to describe mass transfer in the system.
The physical effects which govern the behavior of fluids flowing at the micro-scale and the macro-scale are different. Surface tension, viscous effects, energy dissipation and capillary action begin to dominate system behavior at the micro-scale. Micro-fluidics studies the behavior of the fluids at the micro-scale induced by these effects. It helps exploit the behavior at these scales for new applications by improving the efficiency of current processes.
Micro-fluidics results in Process Intensification through miniaturization. These systems are characterized by a dominance of viscous forces as compared to inertial forces; hence, typically low Reynolds numbers are encountered. Consequently, the flow regimes observed in these systems is laminar. Mixing in these micro-channels occurs primarily by molecular diffusion. The time needed for mixing by molecular diffusion is proportional to the square of the length of the diff usion path. The marked shortening of the diffusion path in a micro-channel results in relatively good mixing.
Multiphase liquid-liquid flows arise when two or more partially miscible or completely immiscible fluids are brought in contact and subjected to a pressure gradient. The resulting systems display different kinds of flow behavior, e.g. droplet, slug or stratified flow. These regimes depend on the relative flow rates of the fluid phases involved, the resulting interaction between interfacial and viscous forces and the wetting behavior of the channel walls. Different liquid-liquid two-phase flow patterns in micro-channels have been experimentally analysed, see Dessimoz et al. [
In the context of mass transfer across membranes Guo and Ho [
Recent studies have focused on liquid-liquid extraction in the stratified flow regime in the micro-channels. Here the two fluids flow side by side. This flow-pattern can be exploited to facilitate complete separation at the channel exit. The extraction of vanillin dissolved in water using toluene in micro-structured devices made of Poly Di Methyl Siloxane (PDMS) was studied experimentally by Fries et al. [
Three different fluid-flow patterns in a Y-shaped micro-channel, contact or stratified flow, segmented flow and emulsification were investigated in Okubo et al. [
The counter-current flow is known to be more efficient in the context of heat exchanger networks. In this work the performance of co-current and counter-current flows in extraction is being studied with focus on micro-channels. Recently it has been experimentally shown that counter-current operation is possible in micro-channels. The primary objective of this work is to establish conditions under which the counter-current operation is superior to the co-current operation. To the best of our knowledge a theoretical analysis of this system has not been carried out. The main motivation is to show that improvements in the extraction performance are possible when the flow is counter-current as opposed to co-current. The convective diffusion equation is solved analytically for the co-current operation. This is a one dimensional model with diffusion being considered only in the direction transverse to the flow direction. Here axial dispersion effects are neglected. The counter-current system is solved numerically. The algorithm proposed exploits the features of the system. A lumped model is analysed where the concentration dependency on the flow direction alone is considered. It is shown that the counter-current flow performs better than the co-current flow. Different methods to compute the mass transfer coefficient as proposed in the literature are compared.
We consider three different flow regimes for the analysis in this work: 1) co-current laminar flow, 2) co-current plug flow, and 3) counter-current plug flow. The stratified flow (fluids flow side by side as shown in
In the case of laminar or Poiseuille flow, the velocity profile is obtained assuming the flow to be steady, fully developed and the liquids to be incompressible. The velocity profiles of the system are governed by the equations
These equations are subject to the conditions of no slip at the walls and continuity of velocity and shear stress at
the interface which is located at hl. So
In the above the subscript 1 and 2 are used to denote the fluid in the first and second region respectively. The solutions to the above equation yield the velocity profiles of the two liquids as Equation (3).
Here the imposed pressure gradient is denoted as. Both the fluids are subject to the same pressure drop. The flow behavior is hence similar to the Hagen-Poiseuille flow (parabolic in shape). The velocity field is continuous at the interface hl but its derivatives are discontinuous. A schematic of the velocity profile in the channel is shown in
The experimentalist operates the system at fixed flowrates Q1 and Q2.
They are given by Equation (4).
These equations can be used to determine the pressure drop ∇P and the height h of the interface for a given combination of flow-rates and fluids. Alternatively, if the pressure drop and height of interface are specified, the velocity profiles in each liquid layer can be found and from this the flow rates can be determined.
In this case the velocities v1 and v2 have the same sign, and are constant within their phase. It is well established that plug flow behavior can be achieved in a micro channel using electro-osmosis [
In the case of plug flow, with equal velocity in both phases, we denote interface as h = hn. Here
When plug flow is assumed viscosity does not play any role in determining the interface position. If on the other hand we assume the flow to be laminar, then the interface position is determined by the viscosity of the two fluids.
In this case the velocities v1 and v2 have an opposite sign. We take and. Counter-current flow can be theoretically simulated using a combination of Poiseulle flow and a Couette flow. To generate a clear separation of the two phases the interface must be located at
the point where the velocity is zero. Alternatively combination of electro osmotic flow with Poiseulle flow can give a counter-current flow when there are two immiscible liquids as the electric field affects the flow of only one of the two fluids. The electric field can be manipulated to increase or decrease the velocity for a fixed flow rate. This can be used to control the interface position “h”. Experimentally counter-current flow has been achieved by surface modifications of the micro-channels [
The mass transfer behavior in stratified flow of a liquid-liquid extraction system in a micro-channel is now analysed. Here we consider the flow of a solute in the first fluid which is being extracted by the second fluid. The concentration in fluid 1, respectively 2 is represented by C1, respectively C2. Considering steady-state operation with convection in the y-direction and diffusion in the x-direction we obtain the equations which govern the behavior of the system as
Here the expressions of v1, v2 take on distinct values for laminar, co-current and counter-current flows. At the interface we have,
at the walls we have
and at the inlet y = 0 we have
The film interface conditions result in a discontinuous concentration profile, while keeping the mass flux continuous. If K > 1, C2 remains below the value of C1 at the interface. When K < 1 the reverse is true and the second fluid extracts the solute out of the first strongly. Here the concentration C1 is depleted at the interface and we obtain a larger C2 concentration. In our computations we use Cin = 1 mol/m3.
In the co-current flow (superscript co) the concentrations of the outlet streams both tend to an equlibrium and this limits the extraction. In the counter-current flow (superscript cc) this limitation does not exist and hence the performance is much better.
For co-current (laminar or plug flow), the conservation of mass states that
under steady-state conditions. This is valid for a long channel when the two exiting streams are in equilibrium. Hence
For counter-current flow the overall mass balance gives
This is used to check the numerical solution. The mixed cup average concentration at a particular “y” is given by.
The convection diffusion equation can be solved analytically and elegantly under the assumptions of 1) the co-current Plug Flow Regime (PFR) when the velocity in the two fluids is uniform (v1 and v2 are constant), and 2) a constant transverse diffusion coefficient (D1 and D2). We start with non dimensionalizing the equations with respect to their characteristic lengths and initial concentrations,
which gives the dimensionless form as
For simplicity, we drop the superscript * from now on. We seek the solution Ci (x, y) in the form gi(y) fi(x). Substituting this in (8) gives
Or
This results in an eigen value problem in the x direction whose solution is
The boundary conditions at x = 0, 1 yield a = c = 0. At x = h, the boundary condition C1 = KC2 implies
while implies
We seek b and d to be non-zero. This yields the characteristic equation which determines the eigen values λ as the solution to
where. The eigen functions corresponding to the nth eigen value is
It has been shown in [
The eigen functions are normalized with respect to this inner product and the constants bn, dn are obtained as
The solution for the y dependency is .
For co-current extraction the initial condition is C1 = 1 for 0 < x < h and C2 = 0 for h < x < 1. The coefficient kn can be obtained from the initial condition as
Since the boundary conditions are homogeneous Neumann in the x-direction, λ = 0 is also an eigen value, which corresponds to n = 1. The eigen-function corresponding to this is the equilibrium solution and is given by
The complete solution to the convection diffusion equation is hence
It was found that it was sufficient to take the first fifty terms in the summation in the above solution to obtain convergence. This implies that the eigen-value problem (14) is solved for the first 50 roots. Care must be taken to ensure that no roots are missed and no roots are calculated more than once. This analytical solution is used to validate the numerical code based on the method of lines with a second order finite difference scheme in the transverse direction (x). The numerical method was used to determine the concentration profiles in the laminar flow regime.
In
The numerical code was then used to simulate the behavior for the laminar flow profile in co-current mode. Here the velocity profile obtained in Equation (3) is used to simulate the laminar behavior. The comparison of the cup-averaged concentration profiles obtained using the laminar flow and the plug flow behavior in a microchannel is shown in
For the counter-current plug flow the convective-diffusion equations are solved numerically. Two challenges arise in this and need to be addressed. These are, 1) the jump discontinuity in concentrations at the interface and 2) the inlet of the two fluid streams being at the two end points. The latter renders the system a boundary value problem.
The numerical algorithm we use for solving the steady-state convection diffusion equation for extraction under counter-current flow is now described:
1) The channel length is divided into Ny grids in the “y” direction. The values of the solute concentrations at the interface on the fluid1 side are assumed.
2) The values of the concentrations at the interface on the fluid 2 side are obtained using the equilibrium condition.
3) Now the convection diffusion equation in each fluid is solved using the method of lines. This is possible as we have a Dirichlet boundary condition at one end (the interface) and a Neuman condition at the other end (wall) with known inlet conditions. Here a second order scheme is used to discretise the equations in the transverse direction and the equations are integrated along the axial direction.
4) After the solutions are obtained the fluxes at the Ny grid points are calculated in each fluid. The difference in the fluxes at the interface has to be zero. This condition is used to iterate on the concentrations at the interface on fluid 1 till convergence is achieved using a NewtonRaphson technique.
The above algorithm is implemented in Matlab. The cup-mixed average concentration profile along the axis obtained using the above algorithm is shown in
To obtain a quick physical insight into the behavior obtained in the two flow-regimes of co-current and countercurrent flow, a simplified model is proposed in this Section. It is valid under the assumptions of a very small height H of the channel (as prevailing in micro-channels),
and large diffusion coefficients Di. Under these conditions the concentration variation in the direction transverse to the flow can be neglected and the evolution of the average concentration along the axial direction is governed by ordinary differential equations. For simplicity we assume the velocity profile to follow plug flow.
The simplified equations of mass balance are now given by
with and initial condition
Here represents an overall mass transfer coefficient (between the two phases). We now define
The solution to the above two equations is given by
The simplified equations are now given by
with initial condition
Introducing and as before, the solution is given by
We now describe how the mass transfer coefficient kl can be estimated for a system experimentally.
For Co-current flow, the simplified equations (18a) and (18b) can be rearranged to yield
The rate at which mass is transferred when the concentration drops to c1 or c2 in the system is
Using these equations, we obtain
Rearranging and eliminating the terms containing the interface position “h” using (22b) we obtain
At y = L, the exit
The logarithmic mean concentration difference is defined as
In a similar manner, kl can be calculated for countercurrent flow, using the simplified equations (20a) and (20b). Following the procedure for co-current flow it can be seen that
The mass transfer coefficient kl can also be defined using the driving force for extraction to be the deviation from equilibrium value, see Dessimoz [
In order to compare the results of our simulations and to be consistent with the literature, and evaluate the performance of a specific micro-channel set-up, we introduce some characteristic quantities. These are now defined.
Characteristic QuantitiesThe first is the efficiency E, defined in terms of the mixed cup concentrations as
where is the concentration of the solute in the second region after equilibrium is attained, and typically. “E” is a measure of how close the exiting stream is to equilibrium. The overall residence time tres for co-current flow is defined as
For a given length L, a unique residence time and an extraction efficiency E(L) is obtained. E = 1 corresponds to the situation when the exiting streams are in equilibrium and no further separation can take place.
The second characteristic which can describe the system is the extraction ratio Er. It represents the fraction of the amount of solute that has been fed to the system which is removed by the second fluid. This is defined as
Note that for co-current flow