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Journal of the Brazilian Society of Mechanical Sciences and Engineering
versão impressa ISSN 1678-5878
J. Braz. Soc. Mech. Sci. & Eng. vol.34 no.3 Rio de Janeiro jul./set. 2012
http://dx.doi.org/10.1590/S1678-58782012000300011
TECHNICAL PAPERS
BIOENGINEERING
The use of an axisymmetric formulation of the Finite Volume Method for the thermal analysis of the retina and ocular tissues following implantation of retinal prosthesis
G. M. L. L. da Silva^{I}; R. de C. F. de Lima^{II}; P. R. M. Lyra^{III}; D. K. E. de Carvalho^{IV}; A. Fernandes^{V}
^{I}Universidade Federal de Pernambuco, Departamento de Energia Nuclear, 50740-540 Recife, PE, Brazil, gisellemlls@terra.com.br
^{II}ritalima@ufpe.br
^{III}prmlyra@ufpe.br
^{IV}Universidade Federal de Pernambuco, Departamento de Engenharia Mecânica, 50740-530 Recife, PE, Brazil, dkarlo@uol.com.br
^{V}Emory Eye Center, 30322 Atlanta, GA, EUA, afilho@emory.edu
ABSTRACT
This study analyzes the heat transfer in human eyes following implantation of retinal prostheses using an axisymmetric formulation of the Finite Volume Method. The model used consisted of a vertex centered unstructured grid finite volume method in an edge-based data structure and an explicit time integration. The results of the finite volume thermal analysis in ocular tissues were determined in the presence of two types of retinal implants: subretinal and epiretinal. For the subretinal device, the maximum temperature reached in the retina was 36.78°C (309.78 K) and the irreversible thermal damage occurred at 200 days. In the case of the epiretinal implant, the maximum temperature reached at the retinal/chip interface was 36.92°C (309.92 K) and the irreversible thermal damage occurred at 180 days. Our results indicate that tin spite of its higher dissipation power, the epiretinal implant produces thermal damages similar to that caused by the subretinal implant. The computational tool which was developed was able to effectively calculate temperature profiles and thermal damage values to retinal implants and is also capable to calculate temperature profile in any other geometry of interest, for example with other types s of external thermal source like laser beans.
Keywords: finite volume method, axisymmetric models, hyperthermia, retina
Introduction
Some of the leading causes of blindness in the world include conditions such as retinitis pigmentosa (RP) and age-related macular degeneration (AMD). Both involve degeneration of the photoreceptor cells, rendering the visual system to become insensitive to light (Peachey and Chow, 1999). The development of retinal prosthesis is based on the premise that an application of external electrical stimulus can be an alternative approach to potentially restore the function of the visual system (Chow and Chow, 1997; Margalit et al., 2002).
The retinal prosthesis or implant consists in a small chip composed by electrodes that create an electrical current which stimulates adjacent areas in order to activate the visual system. The electrical stimulation of the retina through injection of currents dissipates power and heat. Under normal conditions, the choriocapillaris promotes heat dissipation. In patients with degenerative retinal disorders, the choriocapillaris is damaged. The heat generated by the electronic sensors can damage the adjacent neuronal tissue to the implant sites and also the implant. Furthermore, the increase in temperatures may foster an environment suitable to bacteria proliferation that could potentiate infections (Schwiebert et al., 2002). Energy dissipation and temperatures must be carefully controlled in order to avoid damage to the retina and adjacent tissues which in turn could disturb retinal capillary blood flow. Blood flow disturbance in the retina is a feature of many ocular diseases, including diabetic retinopathy, age related maculapathy and glaucoma (Guan et al., 2003).
Currently, two types s of implants have been developed in the United States, Germany and Japan: an epiretinal and a subretinal. These implants were designed to substitute different physiological functions. The subretinal substitutes the degenerated photoreceptors' cells while the epiretinal stimulates directly the ganglion cells (Margalit et al., 2002). Consequently, the two types of chips are implanted in different places. The subretinal is implanted under the retina's surface, between the pigment epithelium and the photoreceptors cells, while the epiretinal one is placed in contact with the inner surface of the retina (Margalit et al., 2002; Schwiebert et al., 2002; Zrenner, 2002).
In the present work due to the geometrical and physical features of the problem, we have developed and used an unstructured axisymmetric edge-based Finite Volume Method (FVM) to analyze the heat transfer in human eyes in the presence of a retinal implant.
Following this introduction, in the "Physical-Mathematical Model" section, we present the governing equations of the bioheat transfer problem and the expression used to evaluate the damage associated to the burning of living tissues. In sequence, in the "Numerical Modeling" section, we describe the edge-based finite volume formulation used to numerically discretize the partial differential equations that model the bioheat transfer problem. Following, in the "Physical Problem" section, major hypotheses and strategies adopted during the modeling stage are detailed, including the "Thermal Properties and Eye Dimensions" and a description of "The Heat Generation Due to the Retinal Implants". In the "Results" section, we show a "Numerical analysis of the eye with a subretinal device" with the proper "Discussion" of the obtained results and, finally, we present our "Conclusions".
Nomenclature
A | = Henriques' constant, 3.1 x 1098 s-1 |
c | = tissue specific heat, J/kg.ºC |
cs | = blood specific heat, J/kg.ºC |
= axisymmetric weighing coefficient | |
= axisymmetric weighing coefficient | |
ΔEat | = activation energy, 6.27 x 105 J/mol |
h | = heat transfer coefficient, W/m2ºC |
k | = thermal conductivity, W/mºC |
nj | = outward normal directional cosines |
qj | = heat flux at xj direction |
= prescribed heat flux | |
= flux over the domain associated with edge IJ_{L} | |
= flux over the external boundary associated with edge IJ_{L} | |
= flux over the interfaces of different materials associated with edge IJ_{L} | |
Q | = heat source term |
Qs | = external thermal source term, W/m3 |
Q_{m} | = heat generation of the metabolic heat, W/m3 |
Q_{p} | = heat generation due to blood perfusion, W/m3 |
rc | = centroid radius of the control volume |
R | = Universal Constant of gases, 8.31 J/mol.K |
ti | = initial time |
t f | = final time |
T | = temperature, ºC |
= prescribed temperature | |
= temperature calculated by numerical methods | |
= initial temperature | |
Ta | = arterial blood temperature, ºC |
T_{∞} | = bulk fluid temperature |
Τ | = time interval of integration |
xj | = independent space variable |
z | = axial coordinate |
Greek Symbols | |
ρ | = specific mass, kg/m3 |
ρ_{s} | = blood specific mass, kg/m3 |
ω | = blood perfusion, s-1 |
Ω | = analyzed domain |
Ω_{D} | = damage function, dimensionless |
Γ_{C} | = boundary subjected to Cauchy or Robin conditions |
Γ_{D} | = boundary subjected to Dirichlet conditions |
Γ_{N} | = boundary subjected to Neumann conditions |
Subscripts | |
a | = relative to arterial blood |
c | = relative to centroid |
I | = relative to node I |
IJ_{L} | = relative to nodes I and J_{L} |
Superscripts | |
j | = relative to direction j |
Physical-Mathematical Model
The Bioheat Transfer Equation, Eq. (1), governs the physical process analyzed.
where ∇^{2} is the laplacian operator which can be written in any coordinate system; ρ is the mass density; c is the specific heat; T is the temperature; k_{t} is the thermal conductivity; Q_{e}, Q_{p} and Q_{m} represents the source (or sink) terms.
In Eq. (1), the source term Q_{e} represents the external thermal sources, such as lasers or heat dissipated by electronic devices (e.g. retinal implants). The generation term of the metabolic heat (Q_{m}) can be ignored because, in general, it is smaller than the external heat sources (Sturesson and Andersson-Engels, 1995). The term Q_{p} is a specific term for the heat generation due to blood perfusion and represents the convective heat removal from the live tissues by the blood vasculature. The referred term is given by Eq. (2) (Diller, 1982; Charny, 1992),
where ω is the volumetric rate of blood perfusion [m³ of blood/m³ of tissue s], ρ_{s} and c_{s} are, respectively, the mass density and specific heat from the blood, T_{a} is the arterial blood temperature and T is the tissue temperature.
The eye is an organ with a few blood vasculatures. However, there is a large blood flow in the sclera-choroid-retina complex and the retinal blood flow is mainly distributed within the inner retina (Scott, 1988; Guan et al., 2003). In the present work, only the blood perfusion of the retina was considered. The blood flow in the choroid was considered as a convective heat transfer boundary condition between the retina and the choroid, by the use of an adequate heat transfer coefficient (Scott, 1988; Amara, 1995).
The problem described by Eq. (1) was subjected to initial and boundary conditions. The boundary conditions may have been of three different kinds:
a) Dirichlet boundary condition: prescribed temperature over a part of the boundary ΓD.
where T = [t ^{i}, t^{ f}] represented the time interval of integration.
b) Neumann boundary condition: prescribed normal heat flux over Γ_{N}.
in which n_{j} were the outward normal directional cosines.
c) Cauchy or Robin boundary condition: mixed boundary condition, i.e., prescribed flux and convection heat transfer over Γ_{C}.
with h representing the film coefficient and T_{∞} the bulk fluid temperature.
The initial distribution of temperature is known for an initial time t^{i}, so the initial condition was expressed by
A detailed description of the mathematical model can be found in Lyra et al. (2005).
The exposure to high temperatures resulted in irreversible damage to tissue such as protein denaturation, loss of the biological function of molecules and either their evaporation. Denaturation may be seen as the common development that leads to cell necrosis. According to Henriques and Moritz (in: Diller, 1982), the denaturation process is generally described by a particular case of Arrhenius' Law, which is essential to the denaturation/coagulation phenomenon. The kinetics of the thermal denaturation, whose parameters are the activation energy and temperature, is represented by an integral damage, ΩD, that measures the produced physical damage. For a given damage, the denaturation is determined only by the temporal changes in tissue temperature (Rol et al., 2000).
Initially, Henriques (in: Diller, 1982) determined the values for the pre-exponential constant and the activation energy for tissue burning at low temperatures. These values have been used by several researchers for the analysis of the process of thermal damage.
According to Diller et al. (1991), the threshold burn injuries occur if Ω_{D} = 0.53, second-degree burn injuries if Ω_{D} = 1, and third-degree burn injuries if Ω_{D} = 10 000.
The damage caused by burning at a certain point of the tissue is given, empirically (Diller et al., 1991), by:
where A = 3.1 x 10^{98} s-1 , ΔEat = 6.27 x 10^{5} J/mol. The universal constant of gases (R) is known as 8.31 J/mol.K and T is the absolute temperature expressed in Kelvin.
Numerical Modeling
The temperature analysis in human eyes was done using an unstructured Finite Volume Method that was developed for solving two-dimensional model problems (Lyra et al., 2004) and later extended to deal with axisymmetric applications (Lyra et al., 2005). Both formulations used a vertex centered finite volume method implemented using an edge-based data structure.
For the axisymmetric formulation, it was convenient to re-write Eq. (1) using a cylindrical coordinates system, which can be expressed by
in which all the heat source terms are represented by Q.
By integrating Eq. (8) over a control volume and applying the Finite Volume Method described in Lyra et al. (2005), the semi-discrete equations obtained can be written as
where the terms and are the axisymmetric weighing coefficients, A_{I} is the cross-sectional area of the control volume associated to node I, and r_{c} is the centroid radius of the control volume.
The first term of the right hand side of Eq. (8) and Eq. (9) quantifies the flux over the interfaces of the control volume associated to node I. The second term quantifies the flux over the boundary faces, and the third one the flux over the interfaces of different materials. The terms , and represent, respectively, the fluxes over: the domain, the external boundary and over the interfaces of different materials, associated to edge IJ_{L}.
In order to compute the edges fluxes, it is required to know the nodal fluxes values and, consequently, the values of the nodal gradient of the temperature. The nodal approximation of the gradient is given by
in which b = 1, for radial direction (x_{j} = r) and b = 0 for the axial one (x_{j} = z), and and are, respectively, the temperature over the domain and over the external boundary associated to edge IJ_{L}.
The time discretization was done by a simple explicit formulation (Euler forward), where the nodes temperatures were calculated in terms of the adjacent nodal temperatures evaluated at the preview time level.
The time and domain discretization, using triangular meshes, were described in details by Lyra et al. (2005). The discretization included also the adopted approximation for the boundary conditions and the source terms, considering domains with multiple materials.
Physical Problem
Considering the cross section of the eye shown in Fig. 1, the following hypotheses have been adopted to simplify the model.
- The use of an axisymmetric model;
- The thermal properties of iris and ciliary body assumed to be equal to those of the aqueous humor (Amara, 1995), so they were considered as a single region;
- Despite the foveae be anatomically different from the retina, it will be considered as a constituent part of the retina;
- Some structures, like nerves, blood vessels, etc., were neglected (Amara, 1995).
- The heat transfer between the external ocular surface and the environment at 293 K occurred by convection;
- The heat transfer in the eye occurred by conduction;
- The heat transfer between retina and choroid occurred by convection;
- The blood temperature was considered equal to 310 K;
- Most of the eye blood perfusion is concentrated at the retina/choroid/sclera complex. So, only the blood perfusion at the retina was considered.
Five regions of different thermal-physical properties were considered (see Fig. 2): the cornea, the aqueous humor, the crystalline lens, the vitreous humor, and the retina.
- The boundary conditions and initial condition were:
- Heat transfer by convection between the ocular external surface and the environment;
- Heat transfer by convection between the retina and the body;
The initial condition considered was the initial temperature distribution inside the eye, without heat sources.
Before starting the thermal analysis and because of the presence of an external thermal source, it was necessary to calculate the initial condition of the problem. This condition was found by solving Eq. (1) in the steady state case, neglecting the heat source term. It was done by Lima et al. (2005) for an axisymmetric case. Figure 3 shows this temperature profiles along the pupillary axis.
Thermal Properties and Eye Dimensions
The human eye's dimensions were taken from Amara (1995) and Duane (1987). The pupillary axial diameter of a normal eye was 25.4 mm. The cornea thickness varied from 0.4 mm (at the middle) to 0.7 mm (at the boundary) and the horizontal diameter was 11.8 mm. The lens, located between the aqueous and the vitreous humor, was 4 mm thick and 9 mm in diameter. The retina thickness was 0.2 mm t near the equator, 0.1 mm deep at the fovea and its maximum thickness 0.5 mm, near the optic nerve. Its minimum thickness (0.05 mm) was located at the "ora serrata" (vide Fig. 1). The humors are solutante with different NaCl concentrations, and their vertical lengths were 3 mm for anterior chamber depth and 15 mm for the length of the vitreous humor.
The values of thermal conductivity (k), mass density (r ) and specific heat (c) were assumed constant within each region of the ocular globe. The thermal properties of the analyzed tissues and of the silicon were presented in Table 1.
Lagendijk (in Scott, 1988) estimated the heat transfer coefficient from the cornea to the environment considering the tear film evaporation and also the heat transfer by radiation and convection to the environment. The value obtained was 20 W/m².K. Lagendijk (In: Scott, 1988) also estimated the heat transfer coefficient from the retina to the choroid as 65 W/m².K. This value includes the heat losses due to the blood perfusion in the choroid region.
The Heat Generation Rate Due to the Retinal Implants
The heat generation rate presented in the problem is caused by the implanted chip at the retina. Both types of retinal implants: the epiretinal and subretinal have their own specific heat generation rate.
The present simulation values used general data available in literature (Hämmerle et al., 2002; Clements et al., 1999).
The implants are based on a silicon chip with a passivation layer, made of silicon oxide, which encapsulates the chip. The chips carry hundreds to thousands of light-sensitive microphotodiodes equipped with microeletrodes of gold or titanium nitride. The devices are implanted near to the macula.
In vivo tests it was used chips in which duration between implantation and explantation ranged up to 18 months, although chips incurred considerable morphological damage when implanted for more than 3 months. After 6 months, the passivation layer becomes very thin due to chemical degradation and after 12 months a considerable damage to the silicon is observed, while the electrodes do not show any detectable sign of morphological damage (Hämmerle et al., 2002).
For the subretinal device, we used the values obtained by Hämmerle et al. (2002). The chip diameter was 3 mm and its thickness was 70 µm. The chips' resistance was 1000 Ω and had a current delivery of 0.05 mA. The power dissipation was equivalent to 2.5 x 10^{-6} W.
For the epiretinal one, we used the data from Clements et al. (1999). The implant's area was 4.6 x 4.7 mm² and 30 µm. The power dissipation to the retina was 60 mW.
The temperature profiles were analyzed for both cases during a period of time that varied from three to six months. All values were obtained assuming that the implants were fully charged during the period of the analyses.
Results
The computational domain of interest is obtained from Fig. 1 using a CAD program. The geometry simplifications discussed in the previous section were used. Due to the "quasi-axisymmetric" nature of the problem, an axisymmetric model was adopted, so only a half of a 2-D cross section of the domain needed to be analyzed. Figure 2 shows the referred domain and the regions of interest.
In order to discretize arbitrary two-dimensional domains, we used a computational system developed by Lyra and Carvalho (2000), which can generate triangular, quadrilateral and mixed consistent meshes. In the present work, we used triangular unstructured meshes. The adopted mesh generator, as any conventional unstructured mesh generator, provided the mesh data in an element-based data structure. The implementation of the finite volume solver required a pre-processing stage in order to convert the element-based data structure into an edge-based one. After the pre-processor stage finished, the element-based data structure could be discarded. After this stage, the edge-based data structure and the physical properties were fed to a FVM computational solver. The temperature profile and the damage function historic values were then obtained from the FVM computational tool.
Numerical Analysis of the Eye with a Subretinal Device
The maximum calculated temperature in the retina was 36.78°C (309.78 K). The new steady-state was reached at 70 s and the corresponding damage function value was 4.7 x 10^{-7}. The thermal damage reached the value of 0.53 at 107 days. The thermal damage reached the value of 1 (irreversible damage) at 200 days. Figure 4(a) shows the temperatures contours of the eye with the subretinal device after the new steady-state was reached.
Numerical Analysis of the Eye with an Epiretinal Device
The maximum temperature at the retinal/chip interface was 36.92°C (309.92 K). The new steady-state was reached after 8.2 s and the corresponding damage function value was 5 x 10^{-7}. The thermal damage reached the value of 0.53 at 94 days. The thermal damage reached the value of 1 (irreversible damage) at 180 days. Figure 4(b) shows the temperature contours of the eye with the epiretinal device after the new steady-state was reached.
Figure 5 shows the behavior of the damage function for both kinds of implants during a period of approximately 3 months after the implantation.
Discussion
In spite of the fact that the electrical power density for the epiretinal implant was approximately 2700 times higher than that of the subretinal, the difference in temperatures at each stationary stage of the process was not different (less than 0.2%). Irreversible thermal damage to cells occurred within a short difference of time between the two implants.
These results were expected due to the relationship of the epiretinal implant with the vitreous humor, which has a greater capacity to dissipate the heat generated by this implant (Margalit et al., 2002).
After the chip implantation, a new steady state was quickly reached in both cases. Then, the increase of the thermal damage was calculated for the new constant temperatures, by the exponential expression shown in Eq. (7).
A brief sensitivity analysis of the damage variation with temperature was performed and is shown in Tables 2 and 3, for the subretinal and the epiretinal implants, respectively.
As it is well known, the temperature profiles obtained by any numerical simulation are approximations of real cases. Moreover, the values of the thermo-physical parameters of live tissues are also not very precise. As it can be seen on Tables 2 and 3, even small variations (approximately 0.5%) of the calculated temperatures can cause a large variation on the time to reach the irreversible damage, as expected. More reliability could be achieved by the numerical simulation if real values for the implants were available.
As soon as more information regarding the electrical power of the implants become available, the developed computational tool can be used to investigate deeply these features.
Conclusions
The new technology of retinal implants has motivated the present study. Although basic investigations in animals are underway presently, the implants are being used simultaneously in blind people and in animals and further investigations of possible long term side effects are paramount.
The results obtained in the present work indicate that the epiretinal device, despite having higher power dissipation, produces thermal damages similar to that caused by the subretinal implant. This fact demonstrates the higher capacity of the epiretinal device in heat dissipation, which may be explained by its relationship to the vitreous humor.
As expected, the computational tool developed was capable to effectively calculate the temperature profiles and thermal damage values in ocular tissues with retinal implants. This tool is also capable to calculate temperature profile in any other geometry of interest and with other kind of external thermal source like laser sources (Lima et al., 2006).
Acknowledgements
The authors would like to acknowledge the Brazilian Research Council (CNPq), the National Petroleum Agency (ANP) and (CAPES) for the financial support provided during the development of this research.
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Paper received 27 July 2010
Paper accepted 2 September 2011
Technical Editor: Fernando Rochinha