In this paper, we focused on numerical solutions of carcinogenesis mutations models that are based on reaction-diffusion systems and Lotka-Volterra food chains. We consider the case with one and two-stages of mutations with appropriate initial conditions and the zero-flux boundary conditions. The main purpose is to construct a stable discretization scheme, which allows much accuracy than those of a standard approach. To this end, we use the spectral method to postprocess numerical solutions for the proposed model by using some classical methods for solving differential equations. The implementation of the algorithm is simple and it does not need to solve the linear or nonlinear system (in case the model is nonlinear). We simulate the one and two-stage carcinogenesis mutations model and compared the results with previously published ones.
The struggle for finding an effective and permanent cure for tumor continues to challenge scientists has been made by a lot of progresses in discovering new methodologies which are helpful in successful treatments to reduce and even clear tumors. Mathematical modeling is one of the tools to improve the cancer therapy. Carcinogenesis is a very complicated process and one need a comprehensive study to fully understand it. Tumors are derived from one or more normal cells that have undergone malignant transformation. The immune response to tumors depends on how antigenic the tumor is. A cell that has undergone significant mutation results in a tumor is easier to be recognized as foreign (i.e. more antigenic) than one that differs only slightly from a healthy cell [
In this paper, we study a simple model of carcinogenesis mutations of DNA, which originally comes from [
The current work provides the computational and implementational details needed to study the dynamics of these equations [
The paper is organized as follows. Section 2 and 3 is used for the description of models in detail. In Section 4 and 5 we describe in detail the spectral postprocessing approximation for the proposed models. Section 6 is used for the numerical simulations and discussions, followed by the concluding remarks in Section 7.
Let us consider as a density of mutant cells of the j-th stage at position where To develop a multistage model for mutant cells densities jY at stage, where will be the initial stage, the density of intermediate stages, and represents the density of the final stage. The system of equations for the density function is given by [
The final stage of mutation occurs when cancer cells become malignant and metastasize. We assume that for the malignant mutation in the final stage, the carrying capacity is unlimited; that is, thus Equation (1) becomes
The full blown developed malignant mutation can be described in the following system of the n-stage model, that is initial, benign, and malignant,
After rescaling Equation (3) it can be written in the following simplified form
where represents the density of normal cells at time and position stands for malignant cells, constant
are positive, delay is non-negative and
with the Neumann boundary and initial conditions
It is reasonable to consider interaction not only between cells on subsequent stages of mutations, and therefore we consider the following two-stage model
subject to
In this section, we will describe in detail the spectral methods for Equations (4) and (5). We first use a finite difference scheme in time and spectral methods in space.
Let with are are Legendre-Gauss-Lobatto points in and
Without losing any generality, we can choose
such that, where is an integer. Denote by
then the implicit difference scheme is given by enforcing Equation (4) at
where with is the differential ma trix associated with Legendre-Gauss-Lobatto nodes, see [
where means element-wise multiplication of two vectors. Here we should remark, considering the boundary conditions in Equation (4), that is the first and the last equation in the above equation, that is Equation (7) do not hold any more. Instead, we must replace those two equations by directly discretizing the boundary conditions respectively. Similarly the semi-implicit scheme for is given by
where we utilize the updated in Equation (7). Moreover, to replace the first and the last equations in Equation (8), we also need to enforce the boundary conditions of that
Applying the same implicit and semi-implicit finite difference scheme to the two-stage mutation model, we have the following system
where are assumed to be integer for simplicity.
In fact, we can deal with any by interpolation if there is no suitable such that be integers. Moreover, to satisfy the boundary conditions which is similar to one-stage mutation model, we can replace the first and the last equations in each matrix form by
for respectively.
It is well known that backward Euler finite difference scheme in time direction is of the first order accuracy, which is much worse than the spectral accuracy in spatial direction. Therefore, to achieve the balance between the errors in two directions, we use spectral postprocessing in [
To describe the time marching scheme clearly, we give some notations as follows. Split the time interval into several subintervals, i.e., for simplicity we can take Let
with given above as LegendreGauss-Lobatto points in.
Integrating Equation (4) from to we get
using the -point Legendre Gauss-Lobatto quadrature formula relative to the Legendre weights on the right hand side of Equation (10) gives
where In the above formula, to explicitly update, we need to evaluate by some approximations. Fortunately, we have the Euler scheme solution (7) as an initial approximation and then interpolation to the LegendreGauss-Lobatto points in. Denote by the n-th loop of post-processing solution, whereas for, it is the linear interpolation of the solution (7). The full numerical scheme for Equation (4) is given by
where is the e-th Lagrangian interpolation polynomials associated with Legendre-Gauss-Lobatto points. Here we remark that in Equation (12) the updated information of is immediately used to obtain. Similarly, we can get the spectral post processing scheme for in Equation (4):
where
For the sake of compactness, we shall not give the full spectral post processing scheme for the two stage Equation (5) here. However, the idea is same as the one stage model. Instead, we give an algorithm to implement the spectral post processing scheme in detail.
Algorithm 5.1 (Spectral Post-Processing)1) Initialize by interpolation from Equations (7) and (8)
2) For of subintervals
3) For to # of loops on post processing
4) For
5)
6) Compute by Equation (12)
7) Compute by Equation (13)
8) End
9) End
10) End
In the following, some numerical simulations were carried out. In our computations we use the Legendre-Gauss quadrature with weights
In case of one-stage model the initial functions for healthy and cancer cells respectively and the parameters value
and for the two-stage model, we use
with
We start our simulation for the one-stage model, which is system of Equation (4) with small delay in which the steady state is positive; we observe the oscillatory behavior of the system with different mode of frequencies. The oscillation is then smooth because of the steady state (Figures 1 and 2). Increasing the delay term and fixing the other parameters, one can observe a very strong oscillatory behavior of the system. For a very large value of delay term, the solution behaves like traveling waves (Figures 3 and 4). As the dynamics of the system is period, it suggests that traveling wave solutions appear for the system with delay and diffusion. The same was observed for the two-stage model, which is system Equation (5) (Figures 5-10). In conclusion, we can say that the stability switch is only because of the increasing in delay and the diffusion itself cannot destabilize the system.
7. Concluding Remarks It has been the aim of this paper to use a spectral postprocessing technique for the numerical solutions of one and two-stage model of carcinogenesis mutations with time delay and diffusion. The spectral postprocessing with the coarse-mesh symplectic initial guess produces high accurate approximate solution. It also saves a significant amount of computational time over the standard schemes. We compared the results obtained by simulateing the one and two-stage model with the available one and find it with good agreement. The future work includes the theoretical stability analysis of the proposed method and its extension to higher dimensions.
The author is very grateful to Professor Urszula Forys of the Institute of Applied Mathematics and Mechanics Faculty of Mathematics, Informatics and Mechanics University of Warsaw, Poland for her many discussions and Xu Xiang of MSU for his help in Algorithm.