Parameters measured via in situ experiments

The probabilities of CSCs' division types and percentage of transition of NSCCs were determined using in situ immunofluorescence (Fig. 1). To be consistent with experiment results of population dynamics, we estimated K_T, K_N and K_C by calculating the quantity change of sorted CSCs and NSCCs and percentage of NSCCs' transition in one day. Because CSCs and NSCCs' cell cycles are both approximately one day, the division of newly born NSCCs in sorted CSCs population contributes little to quantity change in one day and the division of new CSCs in sorted NSCCs is not significant (Equations used in the estimation are shown in Equations S2 in File S1). The values of these parameters are shown in Table 1.

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Table 1. Parameters collected from in situ experiments.

https://doi.org/10.1371/journal.pone.0084654.t001

After radiation treatment, the average of DSB's production in a cell is reported to be 25–35/Gy [26]. And r is calculated from half-life of DSBs or foci and its order of magnitude is ∼10/day [23], [27]. Since CSC has higher ability to repair DNA damage [28], the assumption that r_C>r_N is made. Here we set r_N = 10 and r_C = 15. The survival fractions (S) of CSCs (S_C) and NSCCs (S_N) under 2 Gy radiation treatment are measured from the experiments. Therefore, the lethal mis-repair rate of CSCs (m_C) and NSCCs (m_N) can be calculated by following equation (Equation (2)),(2)

As shown in Table 2, the value of k, D, r_N, r_C, S_C, S_N, m_C and m_N are 25, 2, 10, 15, 95.0%, 43.0%, 0.0012 and 0.0092 respectively.

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Table 2. Parameters under irradiation surroundings.

https://doi.org/10.1371/journal.pone.0084654.t002

Simulation of long-term dynamic variations between CSC and NSCC subpopulations

Based on the parameters, we then analyzed the dynamics of the CSC proportion (define as ) under different initial conditions via the mathematical model (simulation of cell number variation is shown in Table S1 in File S1 and Fig. S1).

Theoretically, it is shown that the CSC proportion finally reaches a steady value no matter what the initial condition is (Fig. 2A). Comparing simulation results with experimental data reported previously [11], it is clear that the steady value computed by this model is close to the experimental results(Fig. 2B), demonstrating parameters getting from the in situ immunofluorescence can predict the tendency of the dynamics between CSCs and NSCCs subpopulation(experiment data are shown in Tables S2–S3 in File S1). In addition, purified NSCCs and CSCs sorted from SW620 cell line by FACS were cultured, and the CSC proportions at day 26 post inoculation were tested. As shown in Fig. 2C, CSC proportions of different initial cultures reach the same steady value which equals the CSC proportion in unsorted SW620 cells.

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Figure 2. Experiments procedures, results and the simulations of long-term dynamics between CSC and NSCC subpopulations.

(A). Diagram of experiment procedures; (B). Comparison between simulation results and experiment results; (C). Experimental results of long-term equilibrium CSC proportions from initial purified CSCs and NSCCs.

https://doi.org/10.1371/journal.pone.0084654.g002

Parameter sensitivity analysis

The responses of CSC proportion to the change of parameters at equilibrium are analyzed (parameters are shown in Table 1). Regularly, each parameter is increased or decreased by one percent and the change of the CSC proportion at equilibrium is calculated as reported previously [29]. M is an integer, so the change of M is plus or minus 1. As shown in Fig. S2, when K_T, K_N, K_C and e are increased by 1 percent, the CSC proportion at the equilibrium would increase 0.3%, decrease 0.5%, increase 0.2% and increase 1.1% respectively. Among the parameters, M is an insensitive parameter, which is set to be 50 as suggested previously [21]. According to calculation, M is an insensitive parameter in a large range. So the choice of M's value places little influence on simulation of equilibrium. Other sensitive parameters including e (e = P_S−P_D), K_N, K_T and K_C are all measured in experiments

Test the parameters and the dynamics between CSC and NSCC subpopulations via cellular automaton method

To further validate the parameters and the dynamics between CSCs and NSCCs, we then studied the dynamics between CSC and NSCC subpopulations with the parameters via cellular automaton method. Cellular automaton is based on behavior of individual cell and interaction between individuals. It is widely used for modeling multi-cellular biological systems including tumor. It could reflect the discrete property of tumor which is neglected in the ODE method[30]. By using cell automaton method, a better understanding of how tumor grows in microscopic scale can be obtained[31]. As the concept of CSC comes out, cellular automaton method is used for simulation of CSCs [32]–[36].

The calculation scheme can be found in Fig.3A. In each time step, A NSCC decides whether to die or whether to transform into a CSC. NSCCs and CSCs progress one step in their cell cycles respectively. A cell will divide into two cells when it finishes one cell cycle. If there is no vacant site for the cell to divide, it would become quiescent. If there is space for the cell to divide, for a CSC, it would decide division type by chance; for a NSCC, it would divide and both the daughter cells' generations increase by 1.

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Figure 3. The long-term dynamics between CSC and NSCC subpopulations via cellular automaton simulation method.

(A). Calculation scheme for cellular automaton method. (B). Typical result of simulation with cellular automaton method (initial condition is that all the cells are NSCCs). Red: CSC; Blue: NSCC; Black: vacant lattice. (C). Comparison between simulation results with cellular automaton method and experimental results.

https://doi.org/10.1371/journal.pone.0084654.g003

As shown in Fig.3C, with the parameters, the simulation shows consistency with the experiment data and the CSC proportion from each group also reached the steady value, further indicating those parameters collected from the experiments are reliable. In addition, the results of cellular automaton method provide more detailed information of the dynamics. During the proliferation, CSCs and NSCCs may firstly form colonies, and then expand around (Video S1-2). Finally, CSCs and NSCCs scattered uniformly throughout the whole area. It is possible that all off-springs of a CSC or a NSCC are CSCs and NSCCs for several generations. If these CSCs or NSCCs connect with other CSCs or NSCCs respectively, they become aggregations in certain areas (Fig.3B).

Simulation of long-term dynamic variations between CSC and NSCC subpopulations after radiation treatment

The dynamic variations between CSCs and NSCCs after radiation treatment are simulated with several additional parameters were then performed (Table 2) (simulation of cell number variation is shown in Table S4 in File S1and Fig. S3). The results showed that the model simulation gives an acceptable prediction on experimental results as we previously reported [11]. As shown in Fig. 4B, CSC proportions of all groups from different initial proportions can finally reach the same steady value as the cases without radiation, indicating short term radiation cannot disturb the long term dynamic equilibrium between the CSCs and NSCCs. Interestingly, in the mixture of 70% CSCs and 30% NSCCs group, simulation shows that CSC proportion rises in the beginning quickly and falls down in two days (Fig. 4C). This is also in accordance with the experimental results as we reported previously [11].

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Figure 4. Radiation experiments procedures and simulations of long-term dynamics between CSC and NSCC subpopulations.

(A). Diagram of experiment procedures with radiation treatment; (B). Comparison between simulation and experiment results in 0–24 day (radiation is applied when t is 0 day); (C). Amplified image of the results from irradiated 70% CSC group (0–2d) (radiation is applied when t is 0 day).

https://doi.org/10.1371/journal.pone.0084654.g004

Imperfect sorting cannot explain the dynamic equilibrium between NSCCs and CSCs

The dynamic equilibrium between CSCs and NSCCs is an interesting phenomenon [1], [9]–[11]. This phenomenon, which is recently reported by several papers, may have profound impacts on the understanding of tumor heterogeneity as well as clinical therapy strategies[10]. Analysis of the phenomenon also showed that, a stable equilibrium CSC proportion between 0 and 1 is easily to achieve if there exist transitions from NSCCs to CSCs (). If K_T equals 0, the non-zero equilibrium CSC proportion exists only under the condition that , that is, the net proliferation rate of CSCs is higher than that of NSCCs (details can be found in Discussion S1 in File S1 and Fig. S4), which is also not the case in our experiments and other reports [2], [37].

An alternative explanation for dynamic equilibrium suggested by Zapperi et al is that this phenomena might due to the imperfect sorting of the cells via flow cytometry instead of the transitions from NSCCs to CSCs. The imperfect sorting is unavoidable in the experiments, resulting in some cells into the wrong group as a minority (Fig.5A). As shown in Discussion S1 in File S1,

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Figure 5. Impact on the long-term dynamics between CSC and NSCC subpopulations with sorting error.

(A). Diagram of sorting error in the experiments; (B). Comparison between simulation (K_T = 0) and experiment results.

https://doi.org/10.1371/journal.pone.0084654.g005

R is the CSC proportion in the whole population.

If K_T is 0, . Under the situation of imperfect sorting, R is very low in sorted NSCCs at the beginning. So nearly equals zero. So the increase of R will be insignificant in the first several days. According to our experiment data, is larger than 0.1 in the first two days. If R is 0.02 at the beginning, should be larger than 5. This is against experiment records on cell proliferation. However, if K_T is not 0, is approximately equal to K_T at the beginning. The increase of R will be more close to our experiment data.

To better illustrate this probability, we analyzed theoretically in our model with sorting error of CSCs and NSCCs as θ percent (normally θ≤2 according to the instructions of the flow cytometry). If there are no transitions from NSCCs to CSCs (K_T = 0), the model cannot fit experimental data of CSC proportion dynamics gained from experiments with θ. Simulated annealing algorithm is used to fit our experiment data whose initial condition is “purified” CSCs, because this process could be achieved with K_T = 0. Then we get 50 parameter combinations of K_C, K_N and e. As shown in Fig.5B, the results showed that, although minority CSCs will lead the population to stable equilibrium CSC proportion and these parameters fit the experiment data of purified CSCs precisely, none of these parameter combinations could fit experiment data of purified NSCCs well. As shown in Fig.5B, the differences between simulation and experiment results lie in time span for reaching the equilibrium. This value is largely dependent on M. Thus, to get the curve that is similar with experiment data, M should be around 5 or less. This is obviously against the experimental data[21], [38]. Therefore, imperfect sorting cannot explain the dynamic equilibrium between CSCs and NSCCs.

Cell culture

Human colon cancer SW620 cells were purchased from Cell Resource Center (IBMS, CAMS/PUMC, Beijing, China) characterized by STR Profiling. Cells were cultured in Dulbecco's modified Eagle's medium, supplemented with 10% fetal bovine serum, 100 units/ml penicillin, and 100 µg/ml streptomycin at 37 °C in 5% CO₂.

Cell staining and flow cytometry

Matched subpopulations were separated as described previously [39], [40]. In brief, cells were stained at a concentration of 10⁷ cells per 100 µl of buffer. Anti-CD133/1(AC133)-PE (MiltenyiBiotec) antibody was used for flow cytometric sorting/assay. For all experiments, samples were sorted on a BD FACS Aria II and analyzed on a BD LSR II flow cytometer using BD FACS Diva Software (BD Bioscience). Side scatter and forward scatter profiles were used to eliminate debris and cell doublets.

In situ immunofluorescence

Details of in situ immunofluorescence of and chip design are shown in our previous paper [11]. In brief, purified NSCCs and CSCs were stained with the mouse monoclonal antibody against human CD133 antigen coupled with R-phycoerythrin (CD133/1(AC133)-PE from Miltenyi Biotec) together with the DNA-binding dye Hoechst 33342 respectively. After degassing the chip, 25 ml cell (CSCs or NSCCs) suspension were pipetted into the reservoir. The cell suspension was aspired into the cell culture rooms because of the negative pressure. After loading of the sample, the cells in the reservoir were removed and 35 ml of medium was added and cultured normally. After 2 h incubation, cells were photographed for the first time as described below. For immunofluroscence staining of cells at defined time points such as 12 h or 24 h, media in reservoir was removed and 20 ml medium with appropriate concentration of CD133/1(AC133)-PE (Miltenyi Biotec) was added. After incubation, the medium with CD133/1(AC133)-PE in reservoir was removed and 35 ml fresh medium was added and incubated in dark for washing the cells. Cells were washed twice and were immediately photographed.

Simulated annealing algorithm

Simulated annealing algorithm is a Monte-Carlo algorithm that is often used for optimization problems. The initial parameters are generated randomly and the candidate parameters are also generated randomly by certain rules. These parameters were then used to solve Equation (1). In simulated annealing, we temporarily accept a worse combination of parameters with chance to decrease the risk of local optimization. As temperature falls down, near global optimal solutions would be derived [44]. In fitting process, a parameter combination is accepted ultimately if ∑(simulation-data)² is smaller than threshold value. Simulation denotes results calculated by the parameter combination and data denotes experiment results. The computational code can be found in Code in File S1.

Cellular automaton method

In cellular automaton method, cells are defined as agents with properties including division, transition and death. There are two kinds of agents: CSC and NSCC. NSCC can perform the behaviors including division, transition and death. CSC can execute symmetry and asymmetry divisions. The agents' behaviors are quantified by parameters which have been used in Equation (1). Each cell agent occupies a regular lattice with dimension of 10 µm×10 µm. In this model, 200×200 lattices were defined. A lattice is set to accommodate one cell at most at the same time. Therefore, a cell could divide into two cells unless there is at least one vacant site in its neighborhood (von Neumann neighborhood)[45].