Abstract

This research aims to study the characteristics of thermal transport and analyse the entropy generation of electroosmotic flow of power-law fluids in a microtriangular prism in the presence of pressure gradient. Considering a fully developed flow subject to constant wall heat flux, the nonlinear electric potential, momentum, and linear heat transfer equations are solved numerically by developing an iterative finite difference method with a nonuniform grid. The thermal efficiency of the model is explored under the light of the second law of thermodynamics. Effect/impact of governing physical parameters on velocity, temperature, Nusselt number, and entropy distributions is studied, and the results are demonstrated graphically; we found that the Nusselt number decreases with the increase of power-law index, and average entropy generation increases with power-law index. We believe that the obtained result in the present study shall be useful for design of energy efficient microsystems which utilize the dual electrokinetic and centrifugal pumping effects.

1. Introduction

Discovery of microfluidic devices requires designing a suitable pumping system which is of considerable importance. Among various different techniques developed such as magnetohydrodynamics, piezoelectrics, and electrohydrodynamics [1–3], electroosmosis [4] has received special attention for lab-on-a-chip microfluidic devices because of the simple design and easier fabrication of electroosmotic pumping systems. The aforementioned techniques are generally conducted in micron-sized ducts with arbitrary cross section; therefore, the name microfluidics. There are several advantages to the use of microfluidic devices, such as low energy and material consumption, higher accuracy, easier control, and automation. These are the main reasons that made microfluidics one of the most attractive research fields in recent years.

Since the generation of fluid flow is crucially important at microscale, a classical pressure gradient-driven mechanism which contains moving components is extremely difficult to be designed and manufactured at microscales and is mostly prone to mechanical failure. In this respect, generation of the electroosmotic flow (EOF) system is the only unique alternative, indeed, establishing fluid flow called electroosmosis. Moreover, since electroosmotic pumping involves only application of the electric field on a duct with no moving components, electroosmotical design, and fabrication-actuated microfluidic devices, this process is much easier than their pressure-based counterparts. In 1809, Reuss [5] was first to report the study of EOF. He showed that by the application of suitable electric voltage, water can flow through a plug of clay. This work was followed by the theoretical study of Helmholtz in 1879 [6] on the electric double layer (EDL). In the early 1900s, Smoluchowski [7] investigated electrokinetically driven flows under the conditions where the EDL thickness is much smaller than the channel height.

Regarding to the research on hydrodynamics of electroosmotic flow, Burgreen and Nakatche [8] and Rice and Whitehead [9] considered the electrokinetic flow for slit and cylindrical capillaries, respectively, where they assumed low values of the zeta potential and used Debye–Hückel linearization. Later, Levine et al. [10] used analytical approximation solution of Poisson–Boltzmann equation with high zeta functions. When we have the situation that two cylindrical walls carry high zeta potentials, Kang et al. [11] analytically analysed the electroosmotic flow through an annulus. Yang [12] and Wang et al. [13] obtained analytical solutions for fully developed and pressure effects on electroosmotic flow in rectangular and semicircular microchannels. Recently, Azari et al. [14] considered Graetz problem analytically for the electroosmotic flow in microchannels and pressure-driven with distributed wall heat flux; their results indicate that the average Nusselt number is a decreasing function of pressure-driven velocity and the electric double layer thickness, regardless of the wall heat flux distribution.

Biofluids encountered in many lab-on-chip devices show non-Newtonian behavior; their rheological properties significantly differ from the Newtonian law of viscosity, and usually, their viscosities are dependent on the rate of shear. Hence, analysing such fluid under the action of the electroosmotic force is necessary for design the lab-on-chip devices. Literature reviews indicate that there is a growing interest in modelling of electroosmotic flow of non-Newtonian fluid. Under the sole influence of electrokinetic forces, in a rectangular microchannel, Das and Chakraborty [15] investigated the transport characteristics of a non-Newtonian fluid flow. They used Debye–Hückel linearization and obtained an analytical solution for velocity and temperature field. Their results reveal that significant reductions in species concentration levels characterized by more significant viscous effects may be achieved by higher hematocrit fraction on account of stronger dispersions in the velocity profiles. This work was followed by Zhao and coworkers [16], first in [17], and they found the analytical solution for power-law fluids in a slit channel and small zeta function; later in [18], this group obtained the expression for the general Smoluchowski velocity by solving the same problem without restriction on zeta function for electroosmosis of power-law fluids in a similar fashion to the classic Smoluchowski velocity for Newtonian fluids. The group later extended their study to the EOF of non-Newtonian power-law fluids in a cylindrical microchannel and found the exact solution for power-law index and approximate solutions obtained for arbitrary values of fluid behavior index. The steric effect induced alterations in streaming potential, and energy transfer efficiency of power-law fluid is investigated analytically by Bandopadhyay and Chakraborty [19], and they found that giant augmentations in the energy transfer efficiency may be caused by confluence of the steric interactions with the non-Newtonian transport characteristics for shear thickening fluids under appropriate conditions. In rectangular microchannels, Vakili et al. [20] analysed electrokinetically driven fluidic transport of power-law fluids, and their result indicates that Poiseuille number is an increasing function of the zeta potential, the flow behavior index, channel aspect ratio, and the dimensionless Debye–Hückel parameter. Regarding to triangular geometry, Chaves et al. [21] used generalized integral transform technique and employed the laminar forced convection (hydrodynamically fully developed and thermally developing laminar flow which was generated by pressure gradient) of power-law non-Newtonian fluids inside ducts with arbitrary-shaped cross sections. We have also more recent study of Mukherjee et al. [22]; they used COMSOL commercial package programme and employed the laminar forced convection in power-law and Bingham plastic fluids in ducts of semicircular and other cross-section problems where the flow is generated by the gradient of pressure. They show that their results reduce to the power-law fluid prediction for zero and infinite shear viscosities. Effects of homogeneous-heterogeneous reactions in MHD flow of Casson fluid flow over a stretched surface is considered by Khan et al. [23].

Combination of electroosmotic and pressure-driven force may be involved in many practical applications. However, there are significant differences between the hydrodynamic characteristics of combined pressure-driven and electroosmotic flow (PDEOF) from those of both conventional pressure gradient-driven flow (PDF) and pure electroosmotic flow (EOF). Literature is very rich also in this topic. But, in this study, we concern in power-law fluid; in this regard, we have the study of Vakili et al. [24] in which they consider pressure effects on electroosmotic flow of power-law fluids in rectangular microchannels, and they later studied thermal transport characteristic as well in [25]. Thermally fully developed case for electroosmotic flow of power-law nanofluid in a rectangular microchannel is investigated by Deng in [26]; their result indicates an increase in the Nusselt number with the flow behavior index and with electrokinetic width when considering the surface heating effect, which decreases with the Joule heating parameter.

Recently, there is a growing interest of scientist on the physical importance for the entropy generation analysis. This concept explored in the pioneering work of Bejan [27] where the author considered the thermodynamic second law features of heat transfer by forced convection on four different flow configurations: pipe flow, flow in a rectangular duct, boundary layer over flat plate, and cross-flow; then, he analysed the irreversibility due to heat transfer through finite temperature gradient and irreversibility due to the viscous effect. In a series of research studies, Khan and his co-authors investigated the entropy generation for a different flow and heat transfer problem. Khan et al. in [28] studied second order velocity slip flow of viscous fluid by a variable thickened stretchable surface of disk problem and obtained the numerical results for entropy generation. We also note following studies on entropy generation analysis for the flow and heat transfer problem in [29–31].

Microchannel has close to a rectangular shape cross section in most lab-on-chip systems [32, 33]; but due to the limitation of space in some cases, a microchannel of triangular cross-section must be used. Thus, the flow of fluids in a triangular microchannel has received special attention [34]. Literature reviews reveal that no study has yet explored the electroosmotic flow thermal features of power-law fluids in a microtriangular duct. This provides enough motivation for the current study. The numerical method is developed to explore the thermal characteristics and entropy generation of mixed electroosmotic and pressure-driven flow of power-law fluids in a microtriangular duct by considering the viscous dissipation effects. The triangular contour is chosen because it is the cross section representing the largest deviation from the circular in the family of axially symmetric tube contours.

The organization of this paper is as follows. Formulation of novel problem is given in Section 2. Governing equations for our novel flow and heat transfer problem are derived in Section 3. We studied the numerical method in Section 4, Section 5 devoted to the introduction of the numerical method, and entropy generation analysis is given Section 6. Grid independence of the numerical method is studied in Section 7, and numerical results are discussed in Section 8. New finding documented in the final conclusion section where we state new result that the Nusselt number decreases with increase of power-law index and average entropy generation increases with power-law index and discussion of the results.

2. Formulation of Problem

We consider the heat transfer associated with a mixed electroosmotic and pressure gradient-driven flow of a power-law fluid in a left triangular duct with the dimension given in Figure 1. The flow considered to be steady laminar, both hydrodynamically and thermally, developed. We assume that fluid has constant thermophysical properties, and it contains an ideal solution of fully dissociated salt. The EDL is assumed to have a constant zeta potential on the wall (Stern layer).

Figure 1 

Geometry of flow problem.

The triangular duct wall is a subject to zeta potential which uniformly distributed over the walls. We also assume that EDLs formed on the triangular wall do not overlap. Furthermore, when we calculate the potential field and the charge density, we assume that the temperature variations over the triangular cross section are negligible as compared to the absolute temperature. We calculate the charge density based on the velocity-weighted average (bulk) temperature. Therefore, Boltzmann equation can be used to describe the spatial distribution of the electric charge density.

3. Governing Equations

The following Poisson’s equation will be used to describe the electrical potential distribution within the microtriangular:where represents the fluid permittivity, and is the net electric charge. The potential is due to the combination of externally imposed field and EDL potential; therefore, equation (1) can be written as

The electric charge density for an ideal solution of fully dissociated salt is given by [24]where is the ion density, valence of ions, proton charge, absolute temperature, and Boltzmann constant, respectively. Since our flow problem hydrodynamically fully developed, EDL potential is reduced to , and the external potential gradient here is in the axial direction only which means , where stands for the axial coordinate. For a constant voltage gradient in the -direction, equation (1) becomes

The effect of temperature on the potential distributions is shown to be negligible [24]; hence, potential distribution can be calculated on the basis of average temperature over the triangular region. Now, we write the equation (4) in dimensionless form aswhere , and represents the dimensionless Debye–Hückel parameter given by with (we omit the star expression). It is apparent from the definition that a large value of denotes a relatively thin electric double layer and vice versa. In this study, we consider equation (1) with the following boundary conditions:

The governing equation of flow field for the power-law fluid is the continuity, and Cauchy momentum equations are given aswhere is the velocity vector, is the pressure, is the density, is the total stress tensor (Cauchy extrastress tensor), and is the body force. The total stress tensor can be related to the strain rate tensor (generalized Newtonian fluid) aswhere , and is the effective viscosity with as the magnitude of the strain tensor, which is defined as

The effective viscosity for power-law fluid is modelled aswhere is the flow consistency index, and is the flow behavior index. We note that power-law fluid is subdivided into three different types of fluids based on the flow behavior index that corresponds to shear thinning Newtonian and shear thickening fluids, respectively. Since we also assumed that the flow is fully developed, in this case, velocity vector becomes , then continuity equation is automatically satisfied, and momentum equation (8) is reduced to

The z-component of the electric body force, generated due to the interaction of the electric charge density in EDL and the electric field, equals with representing the electric field in the axial direction. By substituting from equation (3), the -component of the electric body force becomesMagnitude of rate of strain and effective viscosity is obtained as

Now, substituting (14) and (15) in (9), the shear stresses reduce to

Substituting (13), (16), and (17) into the momentum equation (12), we obtain

After performing the differentiation, we obtain

The Helmholtz–Smoluchowski electroosmotic velocity is considered here as the reference velocity, , and this for power-law fluids at small zeta potentials becomes [24]

After defining dimensionless velocity as , the dimensionless form of momentum equation is given by (again omitting star expression)where , and . This is the subject to the following boundary conditions:

Fundamental physical law of energy conservation will be used to obtain temperature distribution. Considering the effect of viscous dissipation and Joule heating, the energy equation is written aswhere is the thermal conductivity, is the specific heat, is the Joule heating term, and represents the volumetric heat generation caused by viscous dissipation. The term represents the Joule heating, where is the liquid electrical resistivity given bywhere is the neutral liquid electrical resistivity. The term representing viscous dissipation can be expressed as

Using (16) and (17) energy equations for steady fully developed flow of power-law fluid becomeswhere

Since the flow is assumed to be thermally fully developed, this giveswhere and are the bulk and wall temperatures, respectively. The convection rate equation could be written asrepresenting a constant wall heat flux boundary condition (invariant of axial coordinates), and then from (28), we have

Substituting the above equation into (26), we findwhere

The following relation represents the energy balance accounting for heat fluxes on walls of triangle, Joule heating on an elemental control volume, and viscous dissipation:where the angle bracket denotes an average taken over the cross section, and is the hydraulic diameter of the left angular duct.

For the fully developed flow, the dimensionless temperature is defined as

Substituting (33) in (31) and using dimensionless temperature function and dimensionless parameters which are defined before, we obtainwhere the dimensionless parameters are

The dimensionless boundary conditions for the energy equation are

Based on the hydraulic diameter of the trigonometric geometry, the Nusselt number Nu can be represented bywhere

4. Numerical Method

In this work, we studied the finite difference procedure with a nonuniform grid as described in [35] for our problem in (5), (21), and (35). We used following stretching functions to generate the nonuniform grid:

We now use finite difference approximation with a nonuniform grid for equations (5)–(21) and (35) as

Implementing boundary conditions (6), (22), and (36) easily and applying the predictor-corrector scheme as usual for nonlinear equations (41) and (42), we obtain following system of equations for each step:

First guest is taken for (45) from Newtonian case in which case exact analytical solution is possible; for (44), we can use Debye–Hückel linearization. We then apply the successive overrelaxation method to solve equations (44) and (45). In each iteration, the value of is used in one previous iteration and updated for each iteration for (44). We continue until we achieve the required overall relative error of . Similar logic is used to solve equation (45). One’s solutions are obtained for potential and velocity field. Energy equation in (43) was solved by the SOR method again, and results are given in the following section.

5. Entropy Generation Analysis

In Sections 2 and 3, we discussed thermodynamical behaviors of the system; it is well known that entropy generation plays an important role in this field. We now study analysis of entropy generation for our current flow problem along the same line as in Bejan [27]. The generation of total entropy is the sum of viscous dissipation, Joule heating, and thermal gradients, and this expression can be mathematically formulated aswhere, in the above right-hand side terms, is the entropy generation rate because of heat transfer, is the fluid friction, and represents the Joule heating irreversibilities, and these terms can be expressed by

The dimensionless form of the total entropy generation can be derived as , wherewhereaswhere .