The microwave heating of a porous medium with a non-uniform porosity is numerically investigated, based on the proposed numerical model. A variation of porosity of the medium is considered. The generalized non-Darcian model developed takes into account of the presence of a solid drag and the inertial effect. The transient Maxwell’s equations are solved by using the finite difference time domain (FDTD) method to describe the electromagnetic field in the wave guide and medium. The temperature profile and velocity field within a medium are determined by the solution of the momentum, energy and Maxwell’s equations. The coupled non-linear set of these equations are solved using the SIMPLE algorithm. In this work, a detailed parametric study is conducted for a heat transport inside a rectangular enclosure filled with saturated porous medium of constant or variable porosity. The numerical results agree well with the experimental data. Variations in porosity significantly affect the microwave heating process as well as convective flow pattern.
Numerical Model of Microwave Heating in a Saturated Non-Uniform Porosity Medium Using a Rectangular Waveguide
1. International Transaction Journal of Engineering, Management, & Applied Sciences & Technologies
International Transaction Journal of Engineering, Management, & Applied Sciences & Technologies
http://www.TuEngr.com, http://go.to/Research
Numerical Model of Microwave Heating in a Saturated Non-Uniform Porosity
Medium Using a Rectangular Waveguide
a* a
Watit Pakdee , and Phadungsak Rattanadecho
a
Department of Mechanical Engineering, Faculty of Engineering, Thammasat University, THAILAND
ARTICLEINFO A B S T RA C T
Article history: The microwave heating of a porous medium with a non-
Received 23 August 2010
Received in revised form uniform porosity is numerically investigated, based on the proposed
23 September 2010 numerical model. A variation of porosity of the medium is
Accepted 26 September 2010 considered. The generalized non-Darcian model developed takes
Available online
26 September 2010 into account of the presence of a solid drag and the inertial effect.
Keywords: The transient Maxwell’s equations are solved by using the finite
Microwave heating difference time domain (FDTD) method to describe the
Non-uniform porosity
Saturated porous media
electromagnetic field in the wave guide and medium. The
Rectangular wave guide temperature profile and velocity field within a medium are
Maxwell’s equation determined by the solution of the momentum, energy and Maxwell’s
equations. The coupled non-linear set of these equations are solved
using the SIMPLE algorithm. In this work, a detailed parametric
study is conducted for a heat transport inside a rectangular enclosure
filled with saturated porous medium of constant or variable porosity.
The numerical results agree well with the experimental data.
Variations in porosity significantly affect the microwave heating
process as well as convective flow pattern.
2010 International Transaction Journal of Engineering, Management, & Applied
Sciences & Technologies. Some Rights Reserved.
*Corresponding author (W.Pakdee). Tel/Fax: +66-2-5643001-5 Ext.3143. E-mail addresses:
wpele95@yahoo.com. 2010. International Transaction Journal of Engineering, Management, & Applied
Sciences & Technologies. Volume 1 No. 1. eISSN: 1906-9642
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2. 1. Introduction
Microwave heating of a porous medium are widely implemented in industries such as
heating/drying food, ceramic, biomaterial, concrete etc. Since microwave energy has many
advantages such as short time process, high thermal efficiency, friendly with environment and
high product quality. Microwave radiation penetrates into a material and heats the material by a
dipolar polarization that occurs millions times of each second. The examples of previous studies
about microwave heating of porous medium are as follow. Chen et al. (1985) developed the
model for predicting local moisture content, density and pressure. Ni et al. (1999) developed a
multiphase porous media model to predict moisture transport during an intensive microwave
heating of biomaterials. Zhang et al. (2001) studied microwave sterilization of solid foods using
numerical modeling and experimental. Heating patterns changed qualitatively with geometry
(shape and size) and properties (composition) of the food material, but optimal heating was
possible by choosing suitable combinations of these factors. Ratanadecho et al. (2001, 2002)
studied the influence of moisture content on each mechanism (vapor diffusion and capillary flow)
during microwave drying process of unsaturated porous material including a multi-layer porous
medium. The packed bed of glass beads was used for their experiment. It was found that the
small bead size led to much higher capillary forces resulting in a faster drying time. Additionally,
location of the medium relative to location of the microwave source had a considerable impact on
the heating process (Cha-um et al., 2009).
In the present study, we propose the numerical model for the microwave heating of a porous
packed bed. The variation of the bed porosity is considered since it was proved that the porosity
decays away from the wall (Benenati, Brosilow, 1962; Vafai, 1984). Researchers found that the
porosity variation could affect characteristics of flow and heat transfer (Abdul-Rahim AK,
Chamkha AJ, 2001; Al-Amiri AM, Vafai, K, 1994). To the best knowledge of the authors, no
attention has been paid to the porosity variation within the packed bed that is heated by
microwave energy.
2. Experimental Setup
Figure 1 shows the experiment apparatus of microwave heating of saturated porous medium
using a rectangular wave guide. The microwave system is a monochromatic wave of TE10 mode
20 Watit Pakdee, and Phadungsak Rattanadecho
3. operating at a frequency of 2.45 GHz and 300 W of power. From figure 1(b), magnetron (no.1)
generates microwave and transmits along the z-direction of the rectangular wave guide (no.5)
with inside cross-sectional dimensions of 109.2 × 54.61 mm2 that refers to a testing area (circled)
and a water load (no. 8) that is situated at the end of the wave guide. On the upstream side of the
sample, an isolator is used to trap any microwave reflected from the sample to prevent damaging
to the magnetron. Fiberoptic (no. 7) (LUXTRON Fluroptic Thermometer., model 790, accurate to
± 0.5oC) is employed for temperature measurement.
Figure 1: The microwave heating system with a rectangular wave guide.
The fiberoptic probes are inserted into the sample, and situated on the x-z plane at y = 25
mm. Due to the symmetrical condition, temperatures are measured for only one side of plane.
The samples are saturated porous packed beds that compose of glass beads and water. A
container with a thickness of 0.75 mm is made of polypropylene which does not absorb
microwave energy.
In our present experiment, a glass bead 0.15 mm in diameter is examined. The averaged (free
stream) porosity of the packed bed corresponds to 0.385. The dielectric and thermal properties of
water, air and glass bead are listed in Table 1.
*Corresponding author (W.Pakdee). Tel/Fax: +66-2-5643001-5 Ext.3143. E-mail addresses:
wpele95@yahoo.com. 2010. International Transaction Journal of Engineering, Management, & Applied
Sciences & Technologies. Volume 1 No. 1. eISSN: 1906-9642
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4. Table 1: The electromagnetic and thermo physical properties used in the computations
(Ratanadecho et al., 2001).
Properties Air Water Glassbead
Heat capacity, 1007 4190 800
(
C p Jkg −1 K −1 )
Thermal conductivity, 0.0262 0.609 1.0
λ (Wm −1 K −1 )
(
Density, ρ kgm −3 ) 1.205 1000 2500
Dielectric constant, ε r' 1.0 88.15-0.414T+(0.131×10-2)T2-(0.046×10-4)T3 5.1
Loss tangent, tan δ 0.0 0.323-(9.499×10-3)T+(1.27×10-4)T2-(6.13×10-7)T3 0.01
3. Mathematical Formulation
3.1 Analysis of electromagnetic field
Since the electromagnetic field that is investigated is the microwave field in the TE10
mode, there is no variation of field in the direction between the broad faces of the rectangular
wave guide and is uniform in the y-direction. Consequently, it is assumed that two dimension
heat transfer model in x and z directions would be sufficient to identify the microwave heating
phenomena in a rectangular wave guide (Rattanadecho et al., 2002). The other assumptions are as
follows:
1) The absorption of microwave by air in a rectangular wave guide is negligible.
2) The walls of rectangular wave guide are perfect conductors.
3) The effect of sample container on the electromagnetic and temperature field can be
neglected
The proposed model is considered in TE10 mode so the Maxwell’s equations can be written
in term of the electric and magnetic intensities
22 Watit Pakdee, and Phadungsak Rattanadecho
5. ∂E y ∂H x ∂H z
ε = − − σE y (1)
∂t ∂z ∂x
∂H z ∂E y
μ =− (2)
∂t ∂x
∂H x ∂E y
μ = (3)
∂t ∂z
where E and H denote electric field intensity and magnetic field intensity, respectively.
Subscripts x, y and z represent x, y and z components of vectors, respectively. Further, ε is the
electrical permittivity, σ is the electrical conductivity and μ is the magnetic permeability. These
symbols are
ε = ε 0ε r (4)
μ = μ0 μr (5)
σ = 2πfε tan δ (6)
When the material is heated unilaterally, it is found that as the dielectric constant and loss
tangent coefficient vary, the penetration depth and the electric field within the dielectric material
varies as well.
The boundary conditions for TE10 mode can be formulated as follows:
1) Perfectly conducting boundary. Boundary conditions on the inner wall surface of wave
guide are given by Faraday’s law and Gauss’s theorem:
E = 0, H ⊥ = 0 (7)
where subscripts and ⊥ denote the components of tangential and normal
directions, respectively.
2) Continuity boundary condition. Boundary conditions along the interface between sample
and air are given by Ampere’s law and Gauss’s theorem:
E = E' , H = H ' (8)
3) Absorbing boundary condition. At both ends of rectangular wave guide, the first order
absorbing conditions are applied:
*Corresponding author (W.Pakdee). Tel/Fax: +66-2-5643001-5 Ext.3143. E-mail addresses:
wpele95@yahoo.com. 2010. International Transaction Journal of Engineering, Management, & Applied
Sciences & Technologies. Volume 1 No. 1. eISSN: 1906-9642
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6. ∂E y ∂E y
= ±υ (9)
∂t ∂z
where ± is represented forward and backward direction and υ is velocity of wave.
4) Oscillation of the electric and magnetic intensities by magnetron. For incident wave due
to magnetron is given by Ratanadecho et al., (2002)
⎛ πx ⎞
E y = E yin sin ⎜ ⎟ sin (2πft )
⎜L ⎟ (10)
⎝ x⎠
E yin ⎛ πx ⎞
Hx = sin ⎜ ⎟ sin (2πft )
⎜L ⎟ (11)
ZH ⎝ x⎠
where E yin is the input value of electric field intensity, L x is the length of the rectangular
wave guide in the x-direction, Z H is the wave impedance.
3.2 Analysis of temperature profile and flow field
The physical problem and coordinate system are depicted in Figure 2. The microwave is
coming to the x-y plane while the transport phenomena on the x-z plane are currently
investigated.
Figure 2. Schematic of the physical problem.
To reduce complexity of the problem, several assumptions have been offered into the flow
and energy equations.
1) Corresponding to electromagnetic field, considering flow and temperature field can be
assumed to be two-dimensional plane.
2) The effect of the phase change for liquid layer can be neglected.
3) Boussinesq approximation is used to account for the effect of density variation on the
buoyancy force.
4) The surroundings of the porous packed bed are insulated except at the upper surface
where energy exchanges with the ambient air.
24 Watit Pakdee, and Phadungsak Rattanadecho
7. 3.2.1 Flow field equation
The porous medium is assumed to be homogeneous and thermally isotropic. The saturated
fluid within the medium is in a local thermodynamic equilibrium (LTE) with the solid matrix (El-
Refaee et al., 1998; Nield, Bejan, 1999; Al-Amiri, 2002). The validity regime of local thermal
equilibrium assumption has been established (Marafie, Vafai, 2001). The fluid flow is unsteady,
laminar and incompressible. The pressure work and viscous dissipation are all assumed
negligible. The thermophysical properties of the porous medium are taken to be constant.
However, the Boussinesq approximation takes into account of the effect of density variation on
the buoyancy force. The Darcy-Forchheimer- Brinkman model was used to represent the fluid
transport within the porous medium (Nithiarasu et al., 1997; Marafie, Vafai, 2001). The
Brinkmann’s and the Forchheimer’s extensions treats the viscous stresses at the bounding walls
and the non-linear drag effect due to the solid matrix respectively (Nithiarasu et al., 1997).
Furthermore, the solid matrix is made of spherical particles, while the porosity and permeability
of the medium are varied depending on the distant from a wall. Using standard symbols, the
governing equations describing the heat transfer phenomenon are given by
Continuity equation:
∂u ∂w
+ =0 (12)
∂x ∂z
Momentum equations:
1 ∂u u ∂u w ∂u 1 ∂p υ ⎛ ∂ 2u ∂ 2u ⎞ μu
+ 2 + 2 =− + ⎜ + ⎟−
ε ∂t ε ∂x ε ∂z ρ f ∂x ε ⎝ ∂x 2 ∂z 2 ⎠ ρ f κ (13)
− F (u2 + w )
2 1/ 2
1 ∂w u ∂w w ∂w 1 ∂p υ ⎛ ∂ 2 w ∂ 2 w ⎞ wμ
+ 2 + 2 =− + ⎜ + ⎟−
ε ∂t ε ∂x ε ∂z ρ f ∂z ε ⎝ ∂x 2 ∂z 2 ⎠ ρ f κ (14)
− F (u 2 + w2 )1/ 2 + g β (T − T0 )
where ε, ν and β are porosity, kinematics viscosity and coefficient of thermal expansion of
*Corresponding author (W.Pakdee). Tel/Fax: +66-2-5643001-5 Ext.3143. E-mail addresses:
wpele95@yahoo.com. 2010. International Transaction Journal of Engineering, Management, & Applied
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8. the water layer, respectively. The permeability κ and geometric F function are (Abdul-Rahim et.
al. 2001; Chamkha et. al. 2002)
d pε 3
2
κ= (15)
175(1 − ε ) 2
1.75(1 − ε )
F= (16)
d pε 3
The porosity is assumed to vary exponentially with a distance of wall (Benenati, Brosilow
1962; Amiri, Vafai 1994; Poulikakos, Renken 1987). Based on these previous studies, we
proposed the variation of porosity within three confined walls of the bed; a bottom wall and two
lateral walls. The expression that considers the variation of porosity in two directions in the x-z
plane is given by
⎡ ⎧ ⎛ bx ⎞ ⎛ b(W − x) ⎞ ⎛ bz ⎞ ⎫⎤
ε = ε s ⎢1 + b ⎨exp ⎜ − ⎟ + exp ⎜ − ⎟ + exp ⎜ − ⎟ ⎬⎥ (17)
⎢
⎣ ⎩ ⎝ dp ⎠ ⎝ dp ⎠ ⎝ dp ⎠ ⎭⎥
⎦
where dp is the diameter of glass bead, εs known as a free-stream porosity is the porosity far
away from walls, W is the width of packed bed and b and c are empirical constants. The
dependencies of b and c to the ratio of the bed to bead diameter is small (Vafai, 1984). Vafai
(1984) suggested 0.98 and 1.0 for the values of b and c.
3.2.2 Heat transfer equation
The temperature of liquid layer exposed to incident wave is obtained by solving the
conventional heat transport equation with the microwave power absorbed included as a local
electromagnetic heat generation term:
∂T ∂T ∂T ⎛ ∂ 2T ∂ 2T ⎞
σ +u +w =α ⎜ 2 + 2 ⎟+Q (18)
∂t ∂x ∂z ⎝ ∂x ∂z ⎠
[ε ( ρ c p ) f + (1 − ε )( ρ c p ) s ]
where specific heat ratio σ = , α = ke/(ρcp)f is the thermal diffusivity.
(ρcp ) f
The local electromagnetic heat generation term that is a function of the electric field and
26 Watit Pakdee, and Phadungsak Rattanadecho
9. defined as
Q = 2πfε 0 ε r' tan δ (E y )
2
(19)
Boundary and initial conditions for these equations:
Since the walls of container are rigid, the velocities are zero. At the interface between liquid
layer and the walls of container, no-slip boundary conditions are used for the momentum
equations.
1) At the upper surface, the velocity in normal direction (w) and shear stress in the horizontal
direction are assumed to be zero, where the influence of Marangoni flow (Ratanadecho et
al., 2002) can be applied:
∂u dξ ∂T
η =− (20)
∂z dT ∂x
2) The walls, except top wall, is insulated so no heat and mass exchanges:
∂T ∂T
= =0 (21)
∂x ∂z
3) Heat is lost from the surface via natural convection and radiation:
∂T
−λ = hc (T − T∞ ) + σ rad ε rad (T 4 − T∞ )
4
(22)
∂z
4) The initial condition of a medium is defined as:
T = T0 at t = 0 (23)
4. Numerical Procedure
The description of heat transport and flow pattern within a medium (equations (13)-(18))
requires specification of temperature (T), velocity component (u, w) and pressure (p). These
equations are coupled to the Maxwell’s equations (equation (1)-(3)) by equation (19). It
represents the heating effect of the microwaves in the liquid-container domain.
*Corresponding author (W.Pakdee). Tel/Fax: +66-2-5643001-5 Ext.3143. E-mail addresses:
wpele95@yahoo.com. 2010. International Transaction Journal of Engineering, Management, & Applied
Sciences & Technologies. Volume 1 No. 1. eISSN: 1906-9642
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10. 4.1 Electromagnetic equations and FDTD discretization
The electromagnetic equations are solved by using FDTD method. With this method the
electric field components (E) are stored halfway between the basic nodes while magnetic field
components (H) are stored at the center. So they are calculated at alternating half-time steps. E
and H field components are discretized by a central difference method (second-order accurate) in
both spatial and time domain.
4.2 Fluid flow and heat transport equations and finite control volume field
Equations (13)-(18) are solved numerically by using the finite control volume along with the
SIMPLE algorithm developed by Patankar. The reason to use this method is advantages of flux
conservation that avoids generation of parasitic source. The basic strategy of the finite control
volume discretization method is to divide the calculated domain into a number of control
volumes and then integrate the conservation equations over this control volume over an interval
of time [t , t + Δt ] . At the boundaries of the calculated domain, the conservation equations are
discretized by integrating over half the control volume and taking into account the boundary
conditions. The fully Euler implicit time discretization finite difference scheme is used to arrive
at the solution in time.
The calculation conditions are as follows:
1) Grid size: Δx = 1.0922 mm and Δz = 1.0000 mm
2) Time steps: Δt = 2 × 10−12 s and Δt = 0.01 s are used corresponding to electromagnetic field
and temperature field calculations, respectively.
3) Relative error in the iteration procedures of 10−6 was chosen.
5. Results and Discussion
To examine the validity of the mathematical model, the numerical results were compared
with the experimental data. The computed data, for both uniform and non-uniform, cases were
extracted at 30 and 50 seconds.
28 Watit Pakdee, and Phadungsak Rattanadecho
11. Figure 3. The temperature distributions taken at 30 seconds are shown as to compare the
numerical solutions with the experimental result.
Figure 4. The temperature distributions taken at 50 seconds are shown as to compare the
numerical solutions with the experimental result.
The comparisons of temperature distributions on the x-z plane at the horizontal line z = 21
mm are shown in Figure 3 and Figure 4 at 30 and 50 seconds respectively. The results show an
appreciably improved agreement when variation of porosity within the packed bed is considered.
In both of the figures, it is clear that temperature is highest at the middle location since the
density of the electric field in the TE10 mode is high around the center region in the wave guide.
Figure 5 displays temperature contours as a function of time of the two cases which exhibit a
*Corresponding author (W.Pakdee). Tel/Fax: +66-2-5643001-5 Ext.3143. E-mail addresses:
wpele95@yahoo.com. 2010. International Transaction Journal of Engineering, Management, & Applied
Sciences & Technologies. Volume 1 No. 1. eISSN: 1906-9642
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12. wavy behavior corresponding to the resonance of electric field. For the non-uniform porosity, the
heating rate is noticeably slower than that for the uniform porosity. The reason behind this is that
more water content exists near the bottom wall in the case of non-uniform porosity because there
is a higher water-filled pore density closer to the wall. Since water is very lossy, large amount of
energy can be absorbed as both the incoming waves and the reflected waves attenuate especially
at the bottom area. This occurrence results in a resonance of weaker standing wave with smaller
amplitude throughout the packed bed. The weaker standing wave dissipates less energy which is
in turn converted into less thermal energy, giving relatively slow heating rate.
Fig. 5. Time evolutions of temperature contour within the porous bed at 20, 40 and 60
seconds for uniform case (a-c) and non-uniform case (d-f).
30 Watit Pakdee, and Phadungsak Rattanadecho
13. Fig. 6. Velocity vectors from the two cases of porous medium (a) Non-uniform (b) Uniform.
In terms of flow characteristic, in is observed in Figure 6 that flow velocities in the variable-
porosity medium are lower than those in the uniform-porosity medium. This result is attributed to
higher porosities near walls in the non-uniform case. Higher porosity medium corresponds to
higher permeability which allows greater flow velocity due to smaller boundary and inertial
effects. The difference is clear in the vicinity of walls where high velocities carry energy from the
wall towards the inner area.
6. Conclusion
The microwave heating of a porous medium with a non-uniform porosity is carried out,
based on the proposed numerical model. A variation of porosity of the medium is considered to
be a function of the distant from the bed walls. The transient Maxwell’s equations are employed
to solve for the description of the electromagnetic field in the wave guide and medium. The
generalized non-Darcian model that takes into account of the presence of a solid drag and the
inertial effect is included. The numerical results are in a good agreement with the experimental
data. In addition to the effect on the fluid flow velocity that is larger in the non-uniform case, it is
found that the variation of porosity near the wall has an important influence on the dielectric
*Corresponding author (W.Pakdee). Tel/Fax: +66-2-5643001-5 Ext.3143. E-mail addresses:
wpele95@yahoo.com. 2010. International Transaction Journal of Engineering, Management, & Applied
Sciences & Technologies. Volume 1 No. 1. eISSN: 1906-9642
31
Online Available at http://tuengr.com/V01-01/01-01-019-033{Itjemast}_WPakdee.pdf
14. properties of the porous packed bed that affect the heating process markedly.
7. Acknowledgement
The authors are grateful for the financial support provided by the Thailand Research Fund
under Contract No. MGR5180238.
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W. Pakdee is an Assistant Professor of Department of Mechanical Engineering at Thammasat University. He
received his Ph.D. (Mechanical Engineering) from the University of Colorado at Boulder, USA. in 2003. Dr.
Pakdee has published 8 articles in notable international journals. He has been working in the area of numerical
thermal sciences focusing on heat transfer and fluid transport in porous media, turbulent combustion and
microwave heating.
P. Rattanadecho earned his Ph.D. in Mechanical Engineering from the Nagaoka University of Technology, Japan
in 2001. He is currently a Professor at Department of Mechanical Engineering, Thammasat University. He has
published more than 40 articles in professional journals and over 70 papers in conference proceedings. Professor
Rattanadecho’s research area includes Modern Computational Techniques, Computational Heat and Mass
Transfer in Unsaturated Porous Media, Computational Heat and Mass Transport in Phase Change Materials
(Moving Boundary Problems and etc.), Computational Heat and Multi-Phases Flow in Porous Media under
Electromagnetic Energy, Analysis of Transport Phenomena in Highly Complex System by Statistical Modeling(
LBM: Lattice Boltzmann Modeling, Random Walk and Monte-Carlo Technique), Computational Transport Phenomena in Human
Body and Tissue Membrane.
*Corresponding author (W.Pakdee). Tel/Fax: +66-2-5643001-5 Ext.3143. E-mail addresses:
wpele95@yahoo.com. 2010. International Transaction Journal of Engineering, Management, & Applied
Sciences & Technologies. Volume 1 No. 1. eISSN: 1906-9642
33
Online Available at http://tuengr.com/V01-01/01-01-019-033{Itjemast}_WPakdee.pdf