4.1.1. Tumor growth (without therapy).

The growth kinetics of the tumor is estimated by four variables of our model, S, S_R, C and C_R, signifying the four sub-populations of cells that are found in the tumor. In order to validate the growth kinetics of these tumor cell sub-populations of our model, we have used data from different experimental and theoretical studies of tumor growth estimation. The early temporal growth kinetics of the Stem (S) and Resistant Stem cells (S_R) were validated over a period of 5 days, with the reports of Tomasetti and Levy [3], by choosing the parameter values γ_S = 2 day^-1 and δ_S = 0.2 day^-1 (Fig 2A). Here, it was observed that the Stem cells (S) start proliferating exponentially during this initial growth phase of tumor formation. During this time frame, the stem cells also start acquiring mutations and start producing the Resistant Stem Cells (S_R) that gradually starts proliferating slowly and is maintained in very low numbers inside the tumor [3]. It is to be noted that for all our subsequent simulations we have used γ_S = 0.15 day^-1 and δ_S = 2 x10^-7day^-1, as reported in the S1 Text.

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Fig 2.

Model validation with experimental data: (a) Stem and Stem resistant cell proliferation at γ_S = 2 day^-1 and δ_S = 0.2 day^-1; (b) Proliferation of the Cancer Resistant cells as observed in experiments along with the observations from our simulation; figure depicts growth kinetics of the Breast cancer cell line MCF-7/TAX-resistant to Paclitaxel, Hepatocellular Carcinoma cell line SK-Hep1/CDDP3-resistant to Cisplatin, and Colon Cancer cell lines SW-620-L-OHP and LoVo-L-OHP-resistant to Oxaliplatin; (c) Temporal cellular behavior of the components of the model during tumor formation; (d) Temporal cytokine expression pattern during tumor formation; (e) Immune Cell Ratio at steady state- experiment versus simulation results (f) Immune cell ratio in the disease free condition versus cancer scenario. Note: CD4 = T_H1 + T_H2; CD8 = Tc.

https://doi.org/10.1371/journal.pone.0203030.g002

Temporal behaviors of the Cancer (C) and Resistant Cancer (C_R) sub-populations have been simulated to validate our model with experimental data (Fig 2B; See Methods Section 7.7). Fig 2B depicts the temporal growth kinetics of the Breast cancer cell line MCF-7/TAX-resistant to Paclitaxel [31], Hepatocellular Carcinoma cell line SK-Hep1/CDDP3-resistant to Cisplatin [32], and Colon Cancer cell lines SW-620-L-OHP and LoVo-L-OHP-resistant to Oxaliplatin [33]. Our simulation result mimics the average behavior of the resistant cancer cell lines over the time period of 5 days (Fig 2B), using the parameter set estimated through the MCMC method.

The model was simulated for a sufficiently long time to study the temporal evolution of the drug-sensitive and drug-resistant cancer cells without any therapeutic interventions (Fig 2C). Here, it was observed that during the early stages of tumor development, the stem cells (S) show a very slow rate of proliferation. According to our simulation results, it is observed that although a single stem cell initiates the formation of the entire tumor, the stem cells maintain a very low number during the first few months of tumor development. The rapid proliferation of the Cancer cells (C) during the early growth phase lead to their transformation to the resistant C_R species that soon start proliferating rapidly, thereby giving rise to a tumor. At the end of the exponential growth phase, the cancer progression is impeded by the activated M1, T_H1 and Tc immune cells and the systems stay relatively stable for some time until the stem cells start proliferating exponentially and form the main bulk of the tumor. Our simulation results indicate that the first resistant stem cell of the tumor is detected at 400 days. Around 800 days the model reaches its steady state. The total tumor density at steady state can be estimated to be around 2.5x10¹⁰ cells/ml, i.e. 25 times higher than the reported minimum threshold of a clinically detectable tumor [3]. From here we calculate the relative abundance of the sub-populations of the tumor cells and derive that at steady state, the tumor is composed of 94.59% Stem cells (S), 4.49% Cancer cells (C), 1% Cancer Resistant cells (C_R) and small fraction of Stem Resistant cells (S_R) that comprises 0.001% of the tumor mass.

4.1.2. Immune cell-ratio comparison with cytometric data.

Our simulations results revealed the dynamics of the adaptive immune responses generated during the tumor development (Fig 2C). Here we observe that as the tumor sub-populations begins to proliferate, the Tc cells show enhanced activation that is required for the natural regression of the tumor (Fig 2C). However, as the tumor continues to proliferate and the resistant cancer cells (C_R) peaks to 1.5x10⁹ cells/ml, there is a sharp rise in the M1 and T_H1 cells proliferation. The combined effect of the Tc, M1 and T_H1 cells helps to impede the tumor development and decrease it by 3 folds which then falls below the limit of tumor detection (i.e. 10⁹ cells/ml, [3]) and apparently stays dormant till 400 days. Thereafter, as the stem (S) and resistant stem (S_R) cells start proliferating, the adaptive immunity becomes active again. However, this is also accompanied with the increase in abundance of M2 and Treg cells (Fig 2C), that helps in the sustenance and continued survival of the tumor cells.

In order to analyse the changes in the immune activation state before and after tumor formation, the immune cell ratio values obtained at the steady state are estimated and compared to the cell ratios in the normal disease-free condition (Fig 2F). It may be mentioned here, in Fig 2E and 2F, CD4 depicts the summation of both the T_H1 and T_H2 cells of our model, while CD8 implies Tc cells. From our model analysis, we observe that, during Cancer, the ratio of CD4 and CD8 cells reaches a mean value of 2.75, that is in sharp contrast to the normal healthy individuals which show a value of 1.48 (Fig 2F) [34]. On the other hand, the value of CD4:Treg ratio in Cancer shows a value of 15.2 that is higher than the ratio observed in the normal scenario. This happens due to the enhanced T_H2 proliferation during tumor development. This also explains the reason for the elevated CD4/Treg ratio. However, the CD8:Treg ratio shows a decrease in Cancer patients and reaches to about 5.5, which is a characteristic of resistant tumors in mammals [35]. In Fig 2E we have compared these results of our numerical simulation with experimental data obtained from various literatures. Here, we clearly observe that our simulation corroborates very well with the experimental observations made from blood samples of Cancer patients (Fig 2E) [36, 37]. Additionally, we have observed the changes in the T_H1:T_H2 and M1:M2 ratios that have important implications in Cancer prognosis. We find that both T_H1:T_H2 ratio and M1:M2 ratio get decreased during Cancer as compared to the normal disease-free conditions (Fig 2F) [38, 39]. These results are in excellent agreement to the literature that suggests Cancer patients showing T_H1:T_H2 ratio below 8 show poor disease prognosis [39].

4.1.3. Cytokine production.

IL10 production is a characteristic feature for Cancer detection. During Cancer, the marked increase in IL10 production has been noted in blood samples of various cancer patients, where an average concentration of 0.01ng/ml has been recorded in various protein expression studies [40–42]. The temporal protein expression profile, from our simulations, suggests the IL10 expression starts increasing around the 15^th day until it reaches to a concentration of 0.005 ng/ml (Fig 2D). The IFN-γ production begins along with the proliferation of the Tc cells and increases sharply with the activation of the T_H1 cells (Fig 2D). This is accompanied by IL2 production that helps in the continued proliferation of the T_H1 cells. After the proliferation of the stem cells, the cytokine production increases further. The IL10 concentration starts increasing rapidly and attains a concentration of 0.009 ng/ml at steady state. The steady state concentrations of IFN-γ and IL2 reach 9.6 ng/ml and 0.6 ng/ml respectively. The cytokine expression levels from our simulation lie close to the experimentally observed ranges of protein expression of cancer treatment prior to their treatment [40].

4.2.1. Development of drug resistance is governed by the pattern of stem cell differentiation.

With the assumption that the stem cells predominantly tend to renew their pool of stem cells, i.e. with a probability p3, we have varied the values of p1 and p2 to observe the effect of the asymmetric and symmetric differentiation of the stem cell on the development of drug resistance (Fig 3A–3D). Here it may be observed that as we increase the values of p1 and p2, the rate of the stem cell renewal decreases gradually, thereby leading to decrease in the steady state values of S and S_R (Fig 3A and 3B). However, in the case of C cells (Fig 3C), we observe that as we increase the value of p1, the steady state values of C decreases, whereas the variation of p2 has little effect on the steady states of C (Fig 3C). The steady state level of C_R on the other hand, is greatly influenced by p1 and p2 (Fig 3D). With the increase in the value of p1 and p2, the steady states value of C_R increases, signifying as the mode of stem cell differentiation changes, the tumor cell sub-populations tend to transform into the resistant Cancer cells. Hence, from our results, we may infer that higher asymmetric stem cell division may be associated with a high rate of drug resistance.

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Fig 3. Parameter variation study.

(a-d) Surface plot of the steady state values of S, S_R, C and C_R under varying p1 and p2; (e-h) Surface plot of the steady state values of S, S_R, C and C_R under varying γ_M1 and γ_M2; (i) Temporal Plot at β_Th1Ck2 = 0.1; (j-k) Phase plane of S vs. IFN-γ and C vs. IFN-γ at β_Th1Ck2 = 0.1; (l) T_H1/T_H2 ratio at varying μ_Th1Ck1; (m) Fold change in steady states at varying μ_Th1Ck1.

https://doi.org/10.1371/journal.pone.0203030.g003

4.2.2. Dual role of tumor associated macrophages.

The differential regulatory behavior of the type I and type II TAMs on the tumor cells was studied by varying the γ_M1 and γ_M2 parameters, governing the growth rate of the M1 and M2 macrophages (Fig 3E–3H). Here it was observed, as we increase the birth rate of M1, the steady state values of all the sub-populations of the tumor decreases. However, on varying γ_M2, we observe that although the S, S_R and C sub-populations show a decrease in the steady state values, the C_R population increases (Fig 3E–3H). This result corroborates with the experimental observations that indicate that while M1 macrophages may a have an important role in suppression of the tumor growth, a higher abundance of M2 macrophages may lead to poor disease prognosis [43]. From our model analysis, we infer that a higher proliferation of M2 TAMs leads to an increased accumulation of resistant cancer cells in the tumor. This is primarily because of the feedback regulations that govern the dynamics of the tumor-immune interaction network.

4.2.3. IFN-gamma and IL10 feedbacks regulate Cancer progression.

The cytokines are the key regulators of the Tumor-Immune interaction network. The IFN-γ produced by the T_H1 cells helps in maintaining the steady state dynamics of the entire system. Parameter variation studies reveal that as we increase IFN-γ production from the T_H1 cells by changing the value of β_Th1Ck2 between 10^-7 and 10^-2 ng/cell/day, the S and S_R cells show a dampening oscillation in their temporal behavior and these stem cell populations gradually decrease to a very low value. On the other hand, with the increasing β_Th1Ck2 values, the temporal behavior of C and C_R cell population changes from dampening to stable oscillations at β_Th1Ck2 = 0.1 (Fig 3I). The increased production of IFN-γ leads to the rapid killing of the S and S_R populations, whose oscillations dampen with time resulting in complete elimination of the stem cells from the system (Fig 3J). However, the high rate of C proliferation balances out the negative feedback effect of the high IFN-γ production, which keeps oscillating the system (Fig 3K). The phase-plot depicts the feedback regulation that operates between the Cancer (C) cells and IFN-γ that regulates the Cancer relapse. As the Cancer proliferation reaches 4x10⁶ cells, the IFN-γ production starts increasing which reduces the Cancer proliferation. When the Cancer cells fall below 1x10⁶ cells, the IFN-γ production also starts decreasing. However, at low levels IFN-γ, the Cancer cells start proliferating again (Fig 3K). This leads the system into stable steady state oscillations.

Another important feedback regulation that is crucial for the determination of tumor progression is the negative feedback effect of the IL10 cytokine on the T_H1 proliferation. This is governed by the parameter μ_Th1Ck1. As the value of μ_Th1Ck1 is increased, the T_H1/T_H2 ratio decreased rapidly (Fig 3L). This results in the further proliferation of all the tumor sub-populations, i.e., S, S_R, C and C_R, and the fold changes in the steady state values of all four increases with increasing μ_Th1Ck1 values (Fig 3M). Here it may be observed that inhibition of T_H1 cells by IL10, results in higher fold changes of the steady state of S_R cells.

4.3.1. Failure of chemo and radiotherapies due to the presence of resistant cells.

Chemotherapy and Radiotherapy are effective for controlling tumor proliferation in the absence of the resistant cells, i.e. when the rate of transformation of the stem and cancer cells to their resistant counterparts reduces. Here we have tried to simulate the cancer scenario without any mutational pressure, i.e. m_C = 0 and m_S = 0. Under such conditions, when we apply the Treatment Protocol 1, we observe the Stem and the Cancer cells population decreases rapidly and an overall reduction in the tumor population is observed (Fig 4). However, during the formation of a tumor, a certain fraction of the tumor cells acquire resistance to drugs. Under such conditions, i.e. m_C>0 and m_S>0, when the Treatment Protocol 1 is applied at the end of the detection time (DT = 200 days), we observe that even though the drug-sensitive populations viz. S and C decreases, the resistant populations S_R and C_R remain unaffected during the chemotherapeutic cycles. Thereafter, during the Radiotherapy cycles, the S_R cell population being completely unaffected by radiation proliferates rapidly, while the C and C_R population sharply decreases for some time and then becomes stable. In the next treatment-free stage, S_R, C and C_R start proliferating again. This activates the IFN-γ from the T_H1 and Tc cells that help to bring down the S_R and C_R populations a little, that are then sustained at by the M2 and the Treg cells of the tumor microenvironment. The last phase of Chemotherapy does not have any effect on S_R and C_R populations. Hence the reduction in the overall tumor mass is not substantial. Also, it may be noticed here that at the end of this treatment regimen the T_H1/T_H2 ratio is reduced to 2.5 that is indicative of poor disease prognosis.

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Fig 4. Changes in the tumor growth after therapeutic interventions.

Protocol 1 has been applied without and with the presence of resistant cells. Protocol 2 efficiently suppresses tumor in spite of the presence of resistant cells. Color code: Black-without treatment, Green-Chemotherapy, Red-Radiotherapy, Pink-Immunotherapy.

https://doi.org/10.1371/journal.pone.0203030.g004

4.3.2. Immune interventions for effective tumor remission.

Combinatorial treatment protocol was designed to reduce the tumor burden and restore healthy T_H1/T_H2 ratio. Parameter variation studies revealed the importance of the T_C and the T_H1 cells in the regulation of the steady state levels of the tumor cells. Here, Immunotherapy was introduced as two control variables, i.e., u3_Tc and u3_T_H1, which boost the production of the T_C and T_H1 respectively. The stimulus to the T_H1 and T_C cells was started at the end of the last chemotherapeutic cycle and was administered for 20 days followed by 1 day rest. This was repeated for 10 cycles. The dosage of each therapy was varied in wide ranges, and it was observed that when Immunotherapy is low, the change in Radio and Chemotherapies does not affect the tumor population significantly which is reflected in the very small tumor fold change and low T_H1/T_H2 ratio (S1 Fig). As the Immunotherapy is increased, the fold change of tumor population increases along with the T_H1/T_H2. However at very high doses of immunostimulation, the fold changes decreases and the T_H1/T_H2 ratio increases abruptly that leads to extreme suppression of the T_H2 cells in the system. Hence the region 1.5< d_I <2.5 can be considered as the ideal dosage of immunostimulation required for triggering the remission of Tumor. Using the leads from this analysis, the Protocol 2 was designed. At the end of this treatment regimen, it was observed that all the four tumor sub-populations showed a huge reduction in their proliferation, i.e. 136 fold reduction in tumor mass (Protocol 2). The T_H1/T_H2 ratio was boosted to 8.8.

7.1.1. Tumor formation.

The core tumor consists of the Cancer Stem Cells (S), the Cancer Cells (C) and their drug resistant counterparts Resistant Stem Cells (S_R) and Resistant Cancer Cells (C_R) (Fig 1A, red box). The model takes into consideration the different patterns of stem cell differentiation, viz. the symmetric and asymmetric stem cell differentiation (Fig 1B). In the asymmetric differentiation, one stem cell (S) produces one daughter stem cell (S) and a differentiated progenitor Cancer cell (C) with probability p₁, while in the symmetric differentiation one stem cell (S) produce either two Cancer cells (C) with probability p₂ or two stem cells (S) with probability p₃ (where, p₁+p₂+p₃ = 1). The stem cells undergoing asymmetric differentiation acquire mutation (represented with black dotted line in Fig 1A) with a probability m_S that leads to the transformation of a stem cell (S) to a resistant stem cell (S_R). Since the probability that this mutation hits the daughter stem cell and not the differentiated cancer cell is 0.5, the probability of formation of S_R from S is further multiplied by p₁/2. The symmetric differentiation leads to the renewal of the non-mutant stem cell (S) pool with a probability (1-m_S)(1-p₁-p₂) [3]. Considering these factors (as described by Tomasetti and Levy [3]), we assume that the growth rate of S can be mathematically represented as (γ_S(1 − m_S)(1 − p₁ − p₂))S, while the rate of depletion of the stem cell pool, that includes the differentiation of S to C and the transformation S to S_R can be represented as . It may be mentioned here that γ_S and δ_S represents that natural birth and death rates of S cells. A similar nomenclature has been followed for all the other cell types.

The resistant stem cells are formed from the transformation of an S to S_R. The S_R follows a similar pattern of self-renewal and differentiation that leads to the replenishment of the S_R pool and the formation of differentiated C_R cells [3]. Here, it may be assumed that the S_R represents the compartment of stem cells that accumulate all the mutations in its pool, such that no separate compartment for any secondary mutations has been considered here in this model.

The Cancer cells (C) are formed from the stem cells (S) with the probability p₁+p₂. These C cells follow a Gompertzian growth kinetics that can be mathematically represented by , where C_max is the carrying capacity of the tumor [49]. Here, it has been assumed that during proliferation these C cells acquire mutations with a probability m_C and get transformed into C_R cells. Hence the probability of proliferation of the non-mutant C cell is further multiplied by a factor (1-m_C). The C_R cells are formed from the differentiation of the S_R cells with probability p₁+p₂ and the transformation of the C to C_R cells with probability m_C. The C_R cells also follow similar Gompertzian growth kinetics. The total carrying capacity of these non-stem tumor cells has been considered as K_tumor, while each of C and C_R has a carrying capacity of K_tumor/2, so that both the cell populations can use the nutrients equally and have an equal advantage in proliferation.

7.1.2. Immune cells in the tumor microenvironment.

As the tumor develops the resident TAMs, both M1 and M2, encounters the C and C_R cells of the tumor and gets activated (Fig 1A) [38]. It may be assumed that this cell to cell interaction will follow a saturating kinetics where even in the presence of a high number of tumor cells, the availability of TAMs acts as the limiting condition. Hence a Michaelis-Menten type functional form may be used to represent the TAM activation, e.g. . These M1 and M2 TAMs now activate the T_H1 and T_H2 cells respectively [50]. Here the abundance of the T_H cells acts as the limiting condition. In a similar way, the M2-TAMs also activate the Treg cells present in the tumor microenvironment [51]. The Tc cells, on the other hand, infiltrate the tumor, gets directly activated by C and C_R cells (Fig 1A). However, the S and S_R cells of the tumor inhibit the Tc cell proliferation [9]. This is a bidirectional reaction, as the activated Tc also tries to kill the tumor cell sub-populations via its cytotoxic activity [52, 53]. The Treg cells act as immune-suppressor of the system and try to inhibit Tc proliferation, whereas the T_H1 cells act as immune-stimulator of the system that helps in Tc proliferation and tumor infiltration [54, 55]. All these cell to cell interactions tend to follow saturation growth kinetics and hence have been modelled using the Michaelis Menten form discussed earlier [23].

7.1.3. Cytokines and feedbacks.

Tumor formation triggers the immune system to produce cytokines. In this model, three important cytokines have been considered, viz. IFN-γ, IL-2 and IL-10 (Fig 1A). The activation of the T_H1 cells stimulates the production of IL-2 cytokine from them. The amount of cytokine produced is directly proportional to the abundance of effector cells activated. Hence, this has been modelled using the Law of Mass Action, e.g. (β_Th1CK3 * T_H1), where β_Th1CK3 (units: ng cell^-1day^-1) is the rate of production of IL2 from T_H1 cells [56]. This IL2 is responsible for the auto-regulation and sustained proliferation of the T_H1 cells. Hence, we have considered a positive feedback loop from IL-2 to T_H1 cell that has been modelled using a saturating function , where the cytokine acts as the limiting factor [23, 56]. Similarly, the IFN-γ is produced by T_H1 and Tc cells which have a negative feedback effect on all the tumor cell sub-populations. The production of IL-10 is regulated by M2, Treg and T_H2 cells. An auto-regulatory positive feedback loop exists between IL10 and the Treg cells. IL10 also plays an important role in the proliferation of the C and C_R cells and inhibition of the T_H1 cells. This IL10 mediated regulation captures the inhibitory actions of T_H2 on T_H1 cells that are often observed in Cancer scenario.

7.4.1. Protocol 1.

This Protocol is an adaptation of the standard treatment protocol used for applying chemo and radiotherapy (adapted from British Columbia Cancer Agency Protocol GIGAJCPRT - http://www.bccancer.bc.ca/). It was applied to our model to observe the fold changes in the tumor cell population. The protocol can be summarized as follows:

7.4.2. Protocol 2.

This Protocol was designed as a combinatorial treatment protocol of Chemotherapy, Radiotherapy and Immunotherapy to enhance the treatment efficacy. Based on Protocol 1, this Protocol is an improvisation where Immunotherapy has been included that boosts both the T_H1 and Tc simultaneously. In order to design this combinatorial treatment protocol, the dose of Radio, Chemo and Immunotherapy were varied over wide ranges in order to create 1000 treatment combinations. The treatment efficacy of each combination was plotted in a 4-dimensional scatter plot, measured in terms of fold change and T_H1/T_H2 ratio (S1 Fig). The Protocol 2 can be summarized as follows:

7.4.3. Measuring treatment efficacy.

The efficacy of a treatment protocol is measured by the reduction in the size of the tumor and the overall recovery from the immune-suppression induced by the tumor, to ensure minimal chances of tumor relapse. Hence we have defined two parameters that can be used as an indicator of Cancer prognosis:

1. Fold Change – The treatment efficacy was estimated by measuring the fold change of the tumor mass at the end of the treatment period as compared to the tumor mass measured at the time of detection.
2. T_H1/T_H2 ratio - In order to ensure maximum treatment efficacy and minimize chances of Cancer relapse, the T_H1/T_H2 ratio was used as an indicator for disease prognosis. A minimum threshold of T_H1/T_H2 ≥ 5 was chosen to optimize treatment protocol.