Cell reactions.

The first considered reaction is the cell proliferation in which a cell can divide giving place to two daughter cells, (1) where α > 0 is the maximal proliferation rate and g_b(·) is a decreasing function capturing intracellular competition for resources. Such a competition will increase with tumour cell concentration N*, causing a reduction in the proliferation rate. On the other hand, the proliferation capability increases with the amount of nutrients that the tumour cells receive through the vessels f₁(E). These assumptions capture a switching behaviour in which the cells proliferate if the environmental conditions are favourable (N* < K + f₁(E)) (Fig 1A). Thus, for a large concentration of available nutrients, the cells duplicate with a maximum rate α, (g_b(0) = 1), while the division decay for a lower concentration of nutrients (lim_{x → ∞} g_b(x) = 0). In particular, we assume that g_b(·) has the Hill form (2) with n₁ > 0.

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Fig 1. Rate dependences characterizing tumour, vascular and VEGF dynamics.

(A) Effective nutrients received f₁(E) for c₁ = 1 and n = 3. (B) VEGF production rate f₂(E), dependence on the effective nutrients available. (C) Rates of proliferation (solid line) and death (dashed line) for the tumour cells with n₁ = 2. (D) Rates of proliferation and death for the vessels dependence with VEGF concentration for n₃ = n₄ = 2.

https://doi.org/10.1371/journal.pone.0155553.g001

The actual concentration threshold (K + f₁(E)) depends non-linearly on the concentration of endothelial cells through E and it is related to the maximal tumour size that can be reached assuming the effective vessel density is equal to E. The parameter K corresponds to the maximal tumour size if no vasculature is present. Thus, following the ideas of [19–21], it is assumed that f₁(E) is an increasing Hill function of E such that f₁(0) = 0. Additionally, in a nutrient saturation environment there is a maximum response b₁. (3) with b₁, c₁, n > 0 (see Fig 1A).

On the other hand, under hostile conditions cells can also die following similar arguments of competition and saturation of resources as the growth rate, (4) where δ_N is the maximum death rate and function g_d(·) grows with the concentration of tumour cells and decreases with the nutrient supply, and analogously to [19–21], is assumed a Hill increasing function, (5) (see Fig 1C). Note that this description assumes the same characteristic tumour size K + f₁(E) for both, the birth and death rate, as a first approximation in order to reduce the complexity of the model.

Protein reactions.

The regulation proteins, that stimulate vessel growth, are secreted by tumour cells, (6)

The rate of stimulatory protein secretion f₂(E) also depends on the supply of nutrients to the tumour cells (E) and it is assumed to be a non-negative decreasing function of E that satisfies (lim_{E → ∞} f₂(E) = 0), see [20]. On the other hand, if no vascular network is present, the VEGF proteins are secreted at a maximum rate a₂ (f₂(0) = a₂) with a characteristic concentration c₂, giving place to the used expression for (7) (see Fig 1B).

Additionally, the proteins degrade with a constant rate δ_P, (8)

Vessel reactions.

Finally, the regulatory proteins secreted by the tumour cells control the angiogenesis process, thus (9) (10)

Similarly, to the tumour cell proliferation, the vascular generation/death is controlled by two switching mechanisms that follow a rate proportional to the number of vessel cells and a factor dependent on the protein concentration reaching maximum generation/death rates b₃, a₃ > 0, and, following the ideas of [20], can be described as (11) (12) (see Fig 1B), where n₃, n₄ > 0 and m₃ is a characteristic protein concentration under which the production and degradation of vessels reach half of their maximum values. Specifically, in the case b₃ = a₃, m₃ is the protein concentration for which vessel cell birth and death are in balance. More detailed vessel birth and death reactions (9) and (10) would include competition between vessels for the available protein. This is not included in this model as a first approximation to vessel cell dynamics. Table 1 gathers the introduced parameters for the three species and their interpretation.

Macroscopic tumour morphologies.

The steady states of Eqs (13)–(15) will be labelled alphabetically: A, B and C_i. The trivial steady state always exists, and corresponds to the case in which the tumour disappears completely. This state is always unstable (see Lemma D in S1 Text). In the rest of steady states (N* ≠ 0), i.e. the final state of the tumour will always have a finite number of tumour cells so the relative measure E = V/N is mathematically well defined. To study the existence and stability of these solutions comes in handy to rewrite Eq (15) in terms of E without any loss of generality (16)

In order to have a finite tumour (N* ≠ 0), a balance of production and death of tumour cells is required (see Eq (13)) (17) where the solution γ is defined uniquely because g_b is a decreasing positive function, g_d is increasing non-negative, g_d(0) = 0, and g_b(∞) = 0. In particular, if n₁ = n₂, then γ is given by the following analytical expression

Similarly, in order to reach the steady state condition dE/dt = 0 in Eq (16) requires E = 0 or a balance in the vessel production and degradation through f_3b(P*) = f_3d(P*). If E = 0, from Eq (17) we obtain N* = Kγ, since f₁(0) = 0. Using Eq (14) we get P* = a₂ N*/δ_P, obtaining the steady state

This solution corresponds with the case in which the vessel network disappear from the tumour, while the number of tumour cells reach a constant amount, i.e. we have an avascular tumour. The steady state B is locally asymptotically stable if the condition f_3b(a₂ Kγ/δ_P) < f_3d(a₂ Kγ/δ_P) holds; for details see Proposition E in S1 Text.

Finally, it only remains to consider the steady state corresponding with E ≠ 0, and the vessel balance f_3d(P*) = f_3b(P*). This last equation has exactly one positive solution denoted by (see of Fig 1D). Moreover, in the particular case a₃ = b₃ we have . On the other hand, solution to Eq (17) gives N* = γ(K + f₁(E)). Introducing this expression of N* into Eq (14) we obtain (18)

This equation can have multiple solutions, determining the steady states C_i. The existence of these steady states correspond with the positive zeros of the auxiliary function (19)

For the functions f₁ and f₂ given by Eqs (3) and (7), respectively, there can be at most three solutions to Eq (18) (see Fig 2 and Proposition B in S1 Text). The stability of a steady state depends on the behaviour of the function h given by Eq (19) at the point . Namely, if the function h is increasing in some neighbourhood of E_Ci, then C_i is unstable (white circles in Fig 2). Otherwise, it is locally asymptotically stable (black circles in Fig 2) (See Proposition G and Remark H in S1 Text for details).

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Fig 2. Possible stable morphologies of a vascular tumour.

Different possible shapes of the function h, which zeros determine the coordinates of positive steady states of systems (13), (14) and (16). The coordinates E_Ci of the steady states are indicated with black circles (stable states) or white circles (unstable states). E_M and E_m indicate the values at which h reaches its local maximum and minimum.

https://doi.org/10.1371/journal.pone.0155553.g002

The number of stable states depends on the sign of h(0) and the local maximum and minimum values of h(E), in a generic case, having four different outcomes gathered in Fig 2: No steady state (D); one stable steady state (A); two steady states, one stable and one unstable (C); three steady states, two stable and one unstable (B). In all of them the stability alternates with increasing E, being the largest E_Ci always stable. Changing the parameters of the model one can change the shape of h(E) or shift h(E) vertically, thus changing the number and positions of steady states C_i. This is illustrated in Fig 3 where it is indicated the existence and stability of the steady states C and B in dependence on the parameter δ_P.

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Fig 3. Bifurcation diagram showing coexistence of different tumour morphologies depending on protein degradation rate.

Scheme showing a possible bifurcation diagram for the systems (13)–(15) for the tumour cell density N* (A) and the protein density P* (B) as a function of δ_P. In the interval δ_Pcr,1 < δ_P < δ_Pcr,2 (for more details see Proposition B in S1 Text) a coexistence of the stable steady states is observed. Stability is indicated with solid lines (stable solutions) and dashed lines (unstable solutions).

https://doi.org/10.1371/journal.pone.0155553.g003

In Table 2 the existence and stability results of the steady states of the systems (13)–(15) are summarised

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Table 2. Steady states of the macroscopic systems (13)–(15).

https://doi.org/10.1371/journal.pone.0155553.t002

Stochastic description of the model.

The exact stochastic dynamics describe a multivariate birth-death process [26] that can be tackled analytically by means of the corresponding Master Equation [33, 34]. Unfortunately, the analytical solution of the Master Equation exists only for a few simple situations, e.g. when birth and death are constants and the corresponding Master Equation is linear. This is not true for the current case and numerical simulations of the birth-death process are required. This can be achieved by means of the Gillespie algorithm [35], which generates exact stochastic realisations of the microscopic reactions.

Even though the system can be simulated exactly using Gillespie algorithm, when the number of reactions is high, the simulations can be computationally heavy. Additionally, such simulations do not provide analytical insight into the magnitude of the fluctuations. For this reason it is often useful to approximate the stochastic process, for instance, through state-space truncating procedures [36] or by approximating the fluctuations as a superimposed random diffusion [32, 37]. This latter case includes the Chemical Langevin Equation (CLE), which introduces the fluctuations as a multiplicative noise to the macroscopic evolution of each one of the species in Eqs (13)–(15). The intensity of the noise is determined by each reaction channel rate and its stoichiometry [32–34]. This leads to the following system of stochastic differential equations (20)

By ξ_i(t) we denote white Gaussian noises with the following properties (21) (21) where δ(t−t′) denotes the Dirac delta distribution and δ_ij is Kronecker’s delta. The different noise terms in Eq (20) are uncorrelated between themselves because each reaction only involves changes in one of the species.

The CLE is valid as long as a time scale exists such that all the reactions take place without a relevant change in their reaction probability. This is similar to other expansions of volume Ω in which the stochastic effect is reduced to an order Ω^1/2, see e.g. [32, 33]. Note that the deterministic limit (Eq 13) is recovered for Ω → ∞.

In the current analysis we use both, the Gillespie algorithm and the Langevin description. The first returns exact trajectories while the second is used to determine analytical properties or obtain stochastic trajectories when the populations of the species is large enough. Actually, later in the text, the Langevin system will be tested for small populations to assess the agreement of both descriptions obtaining that the CLE approximation is enough in most biological relevant tumour scenarios.

Behaviour of the stochastic system.

In contrast to the deterministic model, the resulting stochastic trajectories have the ability to explore the whole dynamical landscape. Concretely, one of the effects of the intrinsic noise is the ability to jump between different co-existing stable steady states. This is presented in Fig 4 where the used parameters correspond with previous studies [19, 21] for which the bi-stability behaviour (see Fig 5 and Remark H in S1 Text) is observed, (see S1 Fig). This switching is not available for large Ω (Ω > 1000), where the trajectories follow probability distributions around the corresponding deterministic solution. For smaller volume sizes these transitions become more frequent and the noise plays a more important role determining the final state of the tumour (see Figs 4, 6, 7 and S1 Fig). This effect is also seen as a broadening of the probability distributions around each stable state, providing variability to the tumour characteristic even when it can be described within a single morphology. Additionally, as expected, for very small sizes (Ω ∼ 10) the Langevin approximation can not recapitulate results predicted by the Gillespie algorithm. Concretely, the CLE overestimates the fluctuations giving a higher switching probability. Nevertheless, as will be discussed in the next section, in a biologically relevant scenario Ω ≫ 10. Finally, it is interesting to point out that the transition between states for a growing tumour happens usually at early times when the populations of species is small (Fig 4), even though there is a continuous flux over time that predicts a complete depletion of the macroscopic state for a long enough time (see S1 Fig). A precise quantification of this effect in which jump rate between states changes in time is analysed in the Results section.

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Fig 4. Fluctuations change the macroscopic evolution of the tumour.

Deterministic solution (black) compared with 10 different realizations of Gillespie (red) and Langevin (green) for two different values of Ω = 100,1000. Time courses show variability around the macroscopic description and even jumps to different tumour states. Initial condition (1.5, 0.9, 3.0) and parameters are α = 1.0, δ_N = 1.1, δ_P = 0.34, K = 1.0, b₁ = 2.3, c₁ = 1.5, a₂ = 0.4, c₂ = 1.0, a₃ = 1.0, m₃ = 1.02, b₃ = 1.0, n = 2, n₁ = 1, n₂ = 2 and n₃ = n₄ = 2 (see [21]).

https://doi.org/10.1371/journal.pone.0155553.g004

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Fig 5. Bifurcation diagram showing coexistence of different tumour morphologies depending on cell death rate.

Stability diagram for N* depending on parameter δ_N of systems (13)–(15). Model parameters are as indicated in the caption of Fig 4. Different steady states of the system are drawn with different colours: A (red), B (green) and C_i (blue). Solid line indicates stability while dashed one instability of the corresponding steady state.

https://doi.org/10.1371/journal.pone.0155553.g005

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Fig 6. System size determines stochastic populations (Langevin dynamics).

Distribution of (N*, P*, V*) at time t_total = 10000 of 1000 different realizations of Langevin simulation for different values of Ω = 10, 50, 100, 500 and 1000. Initial condition N* = 2.2, P* = 1.0, V* = 3.5 (close to steady stable state C₃). The parameters are those of Fig 4.

https://doi.org/10.1371/journal.pone.0155553.g006

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Fig 7. System size determines stochastic populations (Gillespie simulations).

Distribution of (N*, P*, V*) at time t_total = 10000 of 1000 different realizations of Gillespie simulation for different values of Ω = 10, 50, 100, 500 and 1000. Initial condition N* = 2.2, P* = 1.0, V* = 3.5 (close to steady stable state C₃). The parameters are those of Fig 4.

https://doi.org/10.1371/journal.pone.0155553.g007

Fluctuations also give the system the possibility to visit unstable states such as state B for which V* = 0. Nevertheless, once the number of vessel cells reaches zero, the tumour is unable to create more vessels Eq (9). Therefore, the number of vessel cells remains zero during the rest of the evolution of the tumour, describing an avascular state. This can also be predicted from Eq (20), where for V = 0 the deterministic and stochastic terms become null. Thus, even though the state B can be unstable, it will always capture a stochastic trajectory that reaches V = 0 in the absorbent set of states (N, P, 0).

Likewise, the state A = (0, 0, 0) (all the tumour cells disappear) is an absorbent state. Even though state A is linearly unstable, once a fluctuations drives the system in state A cells cannot proliferate and the system is trapped i.e. fluctuations can make the tumour disappear. Again, the absorbent state A, which is always unstable, has a very different dynamics when the stochastic nature of the tumour is considered.

Such behaviour is shown in Fig 8, where a stable tumour becomes avascular and finally dies due to the fluctuations. Since this is an stochastic effect, the rate of absorbency will decrease with increasing Ω and disappear in the deterministic limit (Figs 6 and 7).

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Fig 8. Noise can change the morphology of the tumour over time.

Three Langevin trajectories showing a stable tumour becoming avascular and finally disappearing (each trajectory fluctuates around the steady state C₃ then jumps to the vicinity of B trapped in the set of states (N, P, 0) and finally is absorbed by A). Initial condition and parameters are those of Fig 3, Ω = 10.

https://doi.org/10.1371/journal.pone.0155553.g008

Estimation of VEGF parameters.

The VEGF dynamics comes mainly determined by two parameters, namely, its maximal production rate a₂ and its degradation rate δ_P. Nevertheless, VEGF interacts in general through three major isoforms of mouse VEGF (VEGF₁₂₀, VEGF₁₆₄ and VEGF₁₈₈), which have different expression levels depending on the species and tissue type [39] and [40]. For mouse skeletal muscle, the VEGF isoform has been reported to have mRNA expression ratio of (VEGF₁₆₄+VEGF₁₈₈) to VEGF₁₂₀ has been measured to be 92:8, see Results in [40], while for the lung tissue this ratio is 82:18. The VEGF isoform distribution and dynamics has already been studied in a thorough in silico model for the mouse skeletal muscle [41], where the secretion rate of VEGF was estimated to be equal to 5875.2 molecules per cell per day; see Results in [41]. Additionally, the lower and upper bounds of the secretion rate of VEGF₁₆₄+VEGF₁₈₈ has been found to be 864 and 17000 molecules per cell per day, respectively. Thus, using the findings on the skeletal muscle mouse with the ratio for lung tissue we can set bounds for total VEGF production rates to be 939 and 19000 molecules per cells per day. Since the estimations made in [41] where done extrapolating information from skeletal muscle tissue to lung tissue we will assume a looser range that will be refined later in the parameter fitting.

On the other hand the VEGF degradation rate δ_P of the three isoforms can be considered comparable and determined from in vitro half-life measurements [42, 43], obtaining a degradation rate of 16.6 day⁻¹. Again, this datum correspond to a different tissue, in this case human cells. Thus, we treat that estimation as a reference for the mouse tumour.

Estimation of tumour cells growth parameters.

The maximal tumour growth rate i.e. the tumour cell proliferation rate with nutrient profusion has been reported for the lung carcinoma (Lewis) C57BL/6 [44] showing a doubling time of 1–1.7 days. This gives a range for the maximal growth rate parameter α in the range 0.41–0.69 day⁻¹.

On the other hand, in the absence of nutrient supply from blood vessels the growth of the tumour is hindered reaching a maximal number of tumour cells that in our model comes described by the parameter product . This can be related to the first stages of cancer disease when cells are supplied only by diffusion and no angiogenesis takes place. The typical diameter of the tumour that can be achieved in this avascular phase of growth is 2–3 mm, [1, 2]. Since the average diameter of the Lewis lung cancer (LLC) cell equal to 7 μm [38], the average number of cells at the end of avascular growth can be estimated to be in the range 2.33 × 10⁷–7.87 × 10⁷ (cells).

All the estimated parameters above mentioned, their ranges and their bibliographical sources are summarised in Table 3.

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Table 3. Estimated parameters for Lewis lung carcinoma.

https://doi.org/10.1371/journal.pone.0155553.t003

Note, that due to a lack of experimental data, none of our estimations take into account the number of vessel cells V. For instance, in [38] the final vessel cells density for LLC tumours was determined via counting the number of the microvessels per high-power field (HPF) within hot spot area. Similarly, in [45] for the same type of tumour, the number of microvessels were counted for each section and the mean number of microvessels/HPF were calculated as a marker for microvessel density in tumour tissue. In both cases, such data can not be used to interpret the actual number of cell vessels V. Similar problems are found in measures of VEGF such as Fig 5B in [45], where the concentration of plasma level of VEGF (expressed in pg/mL) at single time point was measured. Such blood samples were drawn by a terminal cardiac puncture after opening of the chest wall and collected in heparin anti-coagulated tubes preventing to use those data as a measure of VEGF concentration in the tumour tissue.

Fitting of the parameters using tumour volume growth data.

With the parameter ranges obtained, a further inference can be carried out by using volume data growth for the Lewis lung cancer (LLC) published in [38]. Again, assuming spherical tumour cells of radius r = 3.5 μm the volume measurements of LLC cultivated in vivo can be directly converted to number of cells. The resulting profile of number of cells in time can be compared with realisations of the model for different parameter values. The optimal values of the parameters can be found by optimising a distance function between the experimental data and the model prediction. In this case we minimise the mean square error (MSE) between both (24) where M is the number of experimental measurements, are the measured values and the values of the solution of ODE for respective time points. Due to the number of parameters, the optimisation has been done using Particle Swarm Optimization (PSO), a stochastic optimisation technique that explores efficiently the parameter space [46, 47]. The PSO was carried out using the Matlab^® implementation of the algorithm.

The resulting optimal set of parameters shows a good agreement with the experimental data (MSE = 0.07%) predicting LLC volume growth during the first months (Fig 9B). The corresponding values of the estimated data are given in Table 3. In order to give soundness to the parameter estimation, a sensitivity study was performed on the inferred parameters. The results of the sensitivity analysis are discussed below in the Results section, while computational details and specific results are gathered in S2 Text.

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Fig 9. Lewis lung cancer growth prediction during the first month.

(A) and (B), comparison of the experimental tumour Lewis lung cancer data from [38] (red circles) and solutions of model (23) for δ_P = 8.9112 day⁻¹ (blue lines) for the best fitted parameters, with MSE error equal to 0.07%. (C), (D), (E) and (F), comparison of solutions P*, E and V* of system (23) with δ_P = 8.9112 day⁻¹ (blue lines). Solid green lines show the behaviour of the model for a high suppression of VEGF (δ_P = 2 × 10⁴ day⁻¹). For δ_P > δ_Pcr,2 the model has only one stable steady state with a small amount of tumour cells. Rest of parameters are given in Table 3.

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