2.1 Hydrodynamics

The geometry of the problem is shown in Fig 1. The vessel walls are assumed to be rigid. For specificity, the vessel profile is approximated with the following formula: (1) where L_x denotes vessel length, H denotes plaque height and d corresponds to one half of stenosis width (see Fig 1).

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Fig 1. Geometry of the vessel fragment.

L_x, L_y and H correspond to vessel length, cross section diameter and plaque height. Γ_in and Γ_out denote inlet and outlet boundaries respectively. Γ₊ and Γ₋ refer to upper and lower vessel walls respectively.

https://doi.org/10.1371/journal.pone.0134028.g001

The blood flow is described using the modified Navier-Stokes equations [26]: (2) (3) where is blood velocity, t denotes time, is the Hamilton’s operator, p is pressure, and ρ and ν depict blood density and kinematic viscosity, respectively.

The last term in Eq (2) aims to account for the effect of thrombus formation on the blood flow. The effect is described in terms of the Darcy’s filtration law, with the multiplier α_p(M₁, M₂) standing for the filtration resistance of a blood clot (in case one has formed). The values of M₁ and M₂ reflect first and second statistical moments of fibrin polymer mixture (see section 2.3). An explicit dependence of α_p on M₁ and M₂ is given in section 2.4.

No-slip boundary conditions are assumed for the vessel walls Γ₊ and Γ₋. The inlet and outlet boundary conditions are given as follows: (4) (5) (6) where L_y denotes vessel width and V₀ is inlet blood flow velocity in the center of the vessel.

2.2 Blood vessel and activation source

The pro-coagulant factors that enter the lumen from atherosclerotic plaques are mostly products of inflammatory processes that take place inside the plaques [27, 28]. In this work we do not focus on their biochemical nature and describe their effect in terms of a phenomenological “primary activator” of blood coagulation [22–25] denoted as u.

The concentration of primary activator under the vessel wall u₀ is assumed to be non-zero in the vicinity of the stenosed wall Γ₋. The “healthy” non-atherosclerotic tissue is assumed to be devoid of primary activator: (7) (8)

The activator is assumed to be “leaking” into the vessel from the underlying tissue. In the mathematical model this is represented by the boundary condition imposed on u on Γ_±: (9) where μ is the vessel wall permeability, D_u denotes diffusion coefficient, operator denotes the space derivative normal to Γ_±, u∣_Γ± is the concentration of the primary activator in the blood flow near the corresponding vessel wall (Γ_±).

The permeability μ is assumed to depend on wall shear stress . The dependence is approximated with a piecewise-linear function: (10) where τ₁ and τ₂ are threshold shear stress values that define the degree of vessel wall resistance to stress; μ₁ denotes the permeability of an intact vessel wall, while μ₂ corresponds to the maximal permeability of the vessel.

The concentration of the primary activator u is taken to be zero on the inlet boundary Γ_in. Zero-gradient conditions are assumed on Γ_out [29, 30].

2.3 Blood coagulation cascade

The kinetics of blood coagulation reactions is described in the framework of the phenomenological model introduced in [22–25]: (11) (12) (13) (14) Here θ and φ denote concentrations of the activator and the inhibitor of biochemical network of blood coagulation reactions (see [22, 31–33]) and F_g corresponds to fibrinogen (fibrin precursor) concentration. The components of the coagulation cascade are subject to convection and diffusion as described by the last term in Eqs (11)–(14).

The formation of fibrin polymers from fibrinogen is described in terms of the first two statistical moments of fibrin chain length distribution: (15) (16)

The first and second fibrin moments M₁ and M₂ are defined through the concentration of k-mers of fibrin F_k as [22, 34]: (17)

M₁ reflects the total amount of fibrin-monomer molecules in polymerized and non-polymerized forms. The ratio M₂/M₁ determines weight-averaged number of fibrin-monomers in polymer molecules of fibrin [35–37]: (18)

Just as Eqs (11)–(14) the polymerization equations take into account diffusion and convection, accounting for the fact that, generally speaking, both depend on the polymer molecule size. This dependency is incorporated into the coefficient of polymer chains transport b_p and diffusion coefficient D_f. The explicit expressions for b_p and D_f as functions of fibrin-polymer moments are given in the next section.

The values of u, θ, φ, M₁ and M₂ on the boundary Γ_in are supposed to be equal to zero in all numerical experiments, while F_g concentration on Γ_in is assumed to be equal to initial fibrinogen concentration . The zero-gradient conditions were adopted for all chemicals on Γ_out [29, 30]. Vessel walls are taken to be impermeable for θ, φ, F_g, M₁ and M₂.

2.4 Special features of polymers movement

To close the mathematical description explicit definition of D_f, b_p and α_p is needed. For the purpose we develop a phenomenological approach that allows us to formally treat the polymerized and non-polymerized states of blood in a unified manner.

To describe dependence of polymer chains diffusion coefficient D_f on polymer chain size the following asymptotic expression is used: (19) where N_e is a phenomenological parameter of reptation theory [38, 39]. An asymptotic Eq (19) has very clear limit forms:

• when fibrin molecules experience only hydrodynamic friction [39, 40], N_w ≪ N_e, for the diffusion coefficient one has: D_f ∼ 1/N_w;
• in accordance with reptation theory [38, 39], when N_w ≫ N_e and .

The expression for b_p was obtained in the following way. Single polymer chain in fluid flow experiences the following drag force (we neglect hydrodynamic interaction effects in this work): (20)

This force makes the chain to move with the speed: (21)

Thus b_p is: (22)

It was assumed that in blood the prevailing mechanism of fibrin molecules nucleation is a heterogeneous one and that microparticles and some of the formal blood elements serve as nucleation centers [41]. If the concentration of heterogeneous centers of nucleation is equal to n₀ ([n₀] = [cm⁻³]), the distance between the centers may be estimated as .

Assuming fibrin polymer chains to be Gaussian, characteristic size of the coil may be estimated as [40]: (23) where l₀ is the characteristic size of single fibrin-monomer molecule, and K is number of fibrin monomers in Kuhn’s segment. l₀ can be estimated from the fibrin molecule volume: .

The transition between diluted and semidiluted solution takes place when and when the distance between centers of nucleation is equal to R. This gives the value [38]: (24)

It is easy to see that the coefficient of polymer chains transport by flow b_p is essentially decreased if N_w > N_e. At the same time it is known that entanglement effects are essential when . Hence, it seems to be reasonable to suppose that the magnitudes of N_e and are of the same value: (25)

Coefficient α_p determines the degree of slowing down the velocity of blood when large polymers or gel are formed. In this case α_p is a filtration resistance inversely proportional to filtration permeability in the Darcy’s law. In the case of dilute polymer solution there is almost no slowing effect, α_p is given by: (26) where ξ represents characteristic size of polymer gel/solution. It is known that for diluted solutions b_p goes to unity. In accordance with expression (26) the value of filtration resistance drops to zero. The value of ξ reflects average pore size in gel and it is equal to the distance between polymer molecules in solution.

In dilute solution the distance between polymer molecules is more than molecules size ξ ≫ R and the average concentration of monomers in the solution, M₁, is much smaller then the local concentration of monomers in one polymer M_c: M_c ≫ M₁. In mature gel opposite conditions are satisfied: ξ < R, M_c < M₁. General form of expression for ξ may be given as [36, 38]: (27) where power m must be chosen to make ξ independent on N_w.

Local concentration of fibrin-monomer in the Gaussian coil is estimated as: (28) where N_w/N_a is a number of moles of monomers in one polymer (N_a is Avogadro number) and R³ estimates the volume that polymer occupies.

Substituting Eq (28) to Eq (27) and choosing m = 1 [38] gives: (29) This gives for α_p: (30) where (31)

Equations describing polymerization in terms of statistical moments may have singular solutions (particularly, when M₂ blows up) [42]. In present work we focus on the early stages of fibrin gel formation in the blood flow. It was assumed that gel is worth to be considered as sufficiently “mature” when the mean weight-averaged number of fibrin-monomers in polymer molecules N_w exceeds the value corresponding to the semidiluted solution condition by at least two orders of magnitude (). Research of more condensed gel evolution remains outside the scope of this work’s objectives.

In the mathematical model presented in this work, if N_w exceeded “mature gel” value () in some region in the vessel, then M₂ at that region is assumed to be equal to its maximal value .

2.5 Initial conditions and numerical parameter values

At the initial moment t = 0 all variables but F_g were assumed to be equal to zero in the interior part of calculation domain while F_g was assumed to be equal to . The and p fields are taken to correspond to stationary flow under given boundary conditions.

Numerical simulations were performed assuming L_x = 7.5 cm and L_y = 1 cm. The values of other parameters used in numerical calculations are listed in Table 1 (see also [24, 25]).

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Table 1. Parameter values.

https://doi.org/10.1371/journal.pone.0134028.t001

4.1 Threshold-like activation of intravascular thrombus formation

Of primary importance is mapping the blood coagulation regimes in the system. We define coagulation in terms of fibrin gelation occurring anywhere in the vessel. Mathematically, this corresponds to N_w = N_w(x, y, t) reaching in the flow domain at a finite time. In contrast, the no thrombi formation regime is defined such that holds true everywhere in the vessel.

Numerical analysis of Eqs (2), (3) and (11)–(16) shows that both regimes — with and without blood coagulation — are observed in the system within the explored range of parameters. Fig 2 shows the parametric diagram of the regimes in the parameter space. Label “I” is used to denote the stationary regimes with no coagulation in the vessel while “II” marks the regimes with thrombi formation.

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Fig 2. Parametric diagram of blood coagulation system regimes in the parameter space.

Re is the Reynolds number and is the non-dimensional vessel wall permeability. Label “I” is used to denote stationary regimes with no coagulation in the vessel while “II” marks the regimes with thrombi formation. Also shown are two typical values Re₁, Re₂ marking the boundary of the coagulation regime for a given and —the permeability of the vessel wall below which clotting does not occur under any hydrodynamic conditions. Finally, Re = Re_τ2 indicates the lowest Reynolds number at which the shear stress reaches τ₂ and the local permeability of the vessel reaches . h = 0.6, d = 0.4.

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Note the characteristic “tongue” shape of the boundary between regions I and II. This shape implies that the range of Reynolds number values at which blood coagulation occurs is limited both from above and below: for any two thresholds of hydrodynamic activation of blood coagulation exist. ( denotes the value of vessel wall permeability such that if clotting does not occur under any hydrodynamic conditions (see Fig 2).)

The two thresholds can be naively interpreted as follows. Let us denote the two threshold Re values, for a given , as Re₁, Re₂ (see Fig 2). If Re < Re₁, the value of wall shear stress is small and primary activator u does not leak into the blood flow in sufficient quantities to induce coagulation. If Re > Re₂, convective flow washes the coagulation substances away. If Re₁ < Re < Re₂, thrombus formation starts.

Note that the results imply that blood coagulation can be induced in the system via both increasing and decreasing the blood flow intensity — depending on the initial state of the system.

In addition to mapping the boundary between the two coagulation regimes we have explored the scaling behavior of the system in the vicinity of the boundary. Numerical simulations show that the following holds true for the nucleation time T* (given constant Re): (36) Here the nucleation time T* is the non-dimensional time it takes for N_w to reach in least one point of the vessel in the simulation, is the specific value of , located on the border between zones “I” and “II”, and C₁ is a value independent of . Also, in the vicinity of the left portion of the boundary the following scaling law is valid (given constant ): (37) where Re_crit is the specific value of Re, located on the border between zones “I” and “II”, and C₂ is the value independent on Reynolds number (Re).

In other words, it appears that in the vicinity of the liquid state stability boundary the clot nucleation time grows up to infinity (see Eqs (36) and (37)). This result is reminiscent of the results of the theory of first-order transitions where similar scaling laws exist connecting the extent of supersaturation with the nucleation time [41, 58, 59].

4.2 Effects of stenosis geometry

We further investigated the coagulation regimes by exploring the influence of stenosis geometry on thrombus formation. Fig 3 shows the parametric diagrams in the (h, Re) space for two values of plaque width . As in Fig 2 zone “I” corresponds to stable liquid states (no coagulation) and zone “II” corresponds to thrombus formation.

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Fig 3. Parametric diagrams of blood coagulation regimes in the (h, Re) parameter space for two different values of , the non-dimensional plaque diameter.

Region “I” denotes regimes in which there is no coagulation, region “II” represents regimes of macroscopic thrombus formation. (a): , ; (b): , .

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The results suggest that for relatively wide stenoses (, Fig 3b) the “thrombogenic” zone “II” in parametric plane is a single-connected domain, while for a narrow stenosis (, Fig 3a) zone “II” is split into two separate areas. There exists a critical value of for which zone “II” consist of two areas connected in 1 point only (not shown in Fig 3). This means that in parametric space the surface dividing zones “I” and “II” is saddle-like.

Interestingly, the results of the mapping also suggest that the range of Reynolds numbers in which macroscopic thrombus formation occurs in general is wider for relatively small plaques (0.3 < h < 0.4) than it is for large plaques (0.8 < h < 0.9), irrespective of .

4.3 Typical scenarios

We also explored the spatial characteristics of blood coagulation in the system under consideration. Numerical simulations suggest that at least two different types of scenarios can be distinguished.

Successive stages of the two different scenarios are shown in Figs 4 and 5. The figures show the distribution of the weight-average number of fibrin monomers in polymer chains N_w in the vessel. Red color corresponds to clots (), while green shades represent microthrombi with different lengths of polymer chains ().

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Fig 4. Successive stages of a solid thrombus formation.

a—thrombus nucleation, b—formation of fibre-like fibrin structure, c—fibre-like structure thickening, d—solid thrombus. Shown are the color maps of N_w—the weight-average number of monomers in fibrin-polymer in the vessel, with red areas representing regions of fibrin gel formation (). Streamlines are plotted to visualize the flow, and the separatrix, which divides the core of the flow from the recirculation zone, is shown with a dashed line. Parameters used in the simulations are: Re = 130, h = 0.5, , . Note that only a fragment of the vessel closest to the plaque is depicted.

https://doi.org/10.1371/journal.pone.0134028.g004

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Fig 5. Successive stages of a friable floating fibrin structure formation.

a—thrombus nucleation, b—formation of fibre-like fibrin structure, c—thick and friable floating fibrin structure. Shown are the color maps of N_w—the weight-average number of monomers in fibrin-polymer in the vessel, with red areas representing regions of fibrin gel formation (). Streamlines are plotted to visualize the flow, and the separatrix is shown with a dashed line. Parameters used in these simulations are: Re = 180, h = 0.6, , . Note that only a fragment of the vessel closest to the plaque is depicted.

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Notably, the early stages of coagulation are the same across the explored range of parameters: the nucleation of a macroscopic thrombus occurs near the reattachment point of the recirculation zone that forms behind the stenosis. Then the stage of macroscopic fibre-like structure formation comes (see Figs 4b and 5b). The direction of the growth of the fibre-like structure is determined by the separatrix line, which divides the core of the flow from the recirculation zone.

Further behavior depends on the parameter values. The fibre either successively thickens into a solid thrombus in the recirculation zone (see Fig 4d) or underlays the formation of a floating friable structure (see Fig 5c). Interestingly, the floating structure does not have a sharp border and is characterized by a downstream cloud of mircothrombi.