Resistance and wall shear stress.

For small vessel trees (e.g., for those whose luminal diameters are smaller than 0.6 mm), the Reynolds number is very low. As a result, the blood flow within a small vessel is well approximated by the Poiseuille flow [8]. In addition, the vessel wall can be viewed as a fixed cylinder because fluctuations of the blood pressure are small. Under these approximations, for a single vessel, we can obtain the volumetric flow rate Q and the wall shear stress (1)(2)where is the blood viscosity, is the pressure drop, is the vessel length, and is the luminal diameter. By an analogy to an electrical circuit, the resistance of the vessel can be defined as

(3)Note that the resistance depends only on the length and the diameter of the vessel and is very sensitive to the change of diameter because of the inverse quartic power in Eq. (3). As a result, the vessel system can regulate the blood flow efficiently by controlling luminal diameters. Clearly, for large vessels, the fluid dynamics of blood flow can be much more complex.

We now consider complicated vessel systems with many vessels, such as an arterial tree or a network with arteries, capillaries and veins. For a given pressure drop , luminal diameters , and vessel lengths of each vessel , all the quantities (, , ) can be easily obtained by an analogy of the blood vessel system to a corresponding electrical circuit [8], in which, the blood pressure corresponds to the voltage, the flow rate to the electrical current, and the vessel resistance to the electrical resistance. Eq. (3) can be used to calculate the resistance of all the vessels. As in an electrical circuit, Kirchoff’s law can be invoked to determine the blood flows and pressures in all vessels. Finally, Eq. (2) can be used to calculate the wall shear stress.

Vessel adaptation to wall shear stress.

As is mentioned above, our circulation systems can respond to both short-term and long-term changes of tissue demand. The short-term response, which is the so-called metabolic flow regulation, is achieved by multiple means – regulating the heart blood pressure, changing vessel luminal diameters, and modulating the distribution of capillary flows [14]–[18]. Meanwhile, the long-term response, which is the chronic adaptation, also includes multiple structural changes in luminal diameters, vessel wall thicknesses, and micro-vessel densities [19]–[25]. Both short-term and long-term responses can benefit the efficiency of blood delivery and help to maintain the blood pressure in capillaries. Furthermore, the two responses appear to be similar in some aspects. For example, a short-term increase of blood flow can induce a dilation of blood vessels, whereas a long-term increase of blood flow can induce a structural increase of vessel luminal diameters [15], [16], [19]–[21].

The wall shear stress plays an important role in both metabolic flow regulation and chronic adaptation. On the one hand, the short-term change of luminal diameter is experimentally observed to be related to the wall shear stress: the vessel dilates when the blood flow increases and it contracts when the blood flow decreases, in such a way that the wall shear stress is maintained at a relatively steady level [14]–[17]. In these experiments [14]–[17], endothelial cells are found to be responsible for sensing the wall shear stress. On the other hand, a long-term increase or decrease of blood flow can also induce a structural increase or decrease of vessel liminal diameters [10]. It has been long discovered that there is a cubic relation between the vessel diameter and the blood flow within the vessel [26]. As is noted above, this relationship is later explained by Murray [27] by minimizing a cost function. Murray’s analysis suggests an optimal wall shear stress in the circulation system. Later, it has been further shown in experiments [7], [28] that the wall shear stress does not have large variations along the circulation.

Based on the above experimental observations [7], [14]–[17], [28], it has been assumed in previous studies that vessels can adapt their luminal diameters to maintain a preset wall shear stress [8], [30]. In general, this can be described as(4)where is a positive constant corresponding to the growth rate of diameters and the expected uniform wall shear stress in the circulation. The term characterizes an intrinsic decreasing tendency due to cell death and other effects, and the term describes the increasing tendency stimulated by the wall shear stress. From experimental observations, it is suggested that the coefficient might be a constant for different sizes of vessel. However, it has not been sufficiently verified. In theoretic analysis, it does not have to be strictly a constant. A slightly varying coefficient will not affect the stability of a vessel system. Therefore, we assume this coefficient to be a constant in the following stability analysis.

The blood pressure also plays an important role in the metabolic flow regulation and chronic adaptation. It is directly related to the adaptation of vessel wall thickness by the circumferential wall stress. In general, the preset wall shear stress can be dependent on pressure, i.e., . These effects have been shown to have no strong impact on the stability issue [8]. Therefore, we will not include these effects in our current work.

Stability of vessel system.

We begin with a brief review of the stability analysis of some simple vessel systems for the above model. The first two cases have been considered in detail in the work of [30]–[32]. We recapitulate the main points of these results and emphasize some important issues related to the stability.

Case 1.

In Fig. 1 (A), a vessel with adaptable diameter and fixed length is in series with a fixed resistor . The pressure drop on the vessel system is fixed to be . When the pressure drop on the vessel system is sufficiently large, the adaptation of the vessel with a fixed resistor in series has two equilibrium diameters, and (). The larger equilibrium diameter, , has been shown to be locally stable, namely, when the initial diameter is greater than , the diameter adapts to eventually. For the adaptation of a single vessel without fixed resistance in series, it is stable in the case of constant flow (fixed flow in the vessel), whereas unstable in the case of constant pressure (fixed pressure drop along the vessel).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 1. Illustration of simple systems in the vessel network.

The icons are borrowed from the electrical circuit [30]. (A) A vessel is in series with a fixed resistance . (B) The parallel part of two vessels is in series with a fix resistance. (C) The parallel part is controlled by the open-close switches.

https://doi.org/10.1371/journal.pone.0045444.g001

Case 2.

In Fig. 1 (B), two parallel vessels, with adaptable diameters and fixed lengths and , respectively, are in a serial connection with a fixed resistance . In this case, at least one of the diameters will decrease to zero eventually, due mainly to the fact that the vessel with a smaller value of in a parallel system always has a smaller wall shear stress. Even if there are more vessels in parallel, at most one of the vessels can survive in the end. Similar to the instability of parallel vessels, this vessel adaptation process is not stable for a vessel network which contains parallel parts in their sub-components. The adaptation process is shown in phase plane in Fig. 2.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 2. Illustration of adaptation in the phase plane.

Squares denote the stable equilibrium states. Arrows starting at point stand for the rate of change of the two diameters. (A) phase plane of a parallel vessel system. In the three stable equilibrium states, at least one diameter is zero, i.e., at most one vessel can survive. (B) phase plane of a parallel system with switches (fixed OTRs). There is a new stable equilibrium in which neither diameter vanishes, i.e., both vessels survive.

https://doi.org/10.1371/journal.pone.0045444.g002

It has been realized in the works of [8]–[10], [33], [34] that the structural adaptation must meet the metabolic demand. From this point of view, a reference blood flow rate was introduced for each vessel and an additional metabolic stimulus was added to the adaptation system [8]–[10]. Metabolic stimulus is also introduced in the works of [33], [34] to study responses to the local state of the tissue. In these studies, the metabolic stimulus gives rise to a locally stable adaptation system.

In the following, we will discuss a possible physiological mechanism for the origin of the metabolic stimulus. In fact, the blood vessel system can meet the metabolic demand by metabolic flow regulation. As a result of the change in blood flow due to flow regulation, the wall shear stress in vessels is changed, resulting effectively in an extra stimulus in the adaptation. We will take into account the effects of metabolic flow regulation in our new adaptation model. In this model, we incorporate fluctuations of capillary flows in the form of an open-close switch of capillary flows.

Case 3.

In contrast to Case 2, as shown in Fig. 1 (C), each parallel part has a switch. Assume the OTRs of the two switches are and , respectively. There are four different states of the vessel system under the independence assumption, as tabulated in Table 1, in which the state denotes the open-close states of the two capillary groups, wherewhere , and and are the wall shear stress of the two capillary groups at state , respectively. In the adaptation process, the effective stimulus of the fluctuating flow due to the switch among different states is assumed to be the average of the wall shear stress in our model. Therefore, the wall shear stress in the adaptation equation (4) is replaced by a weighted average of the wall shear stress over the four states according to their time ratio

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 1. Wall shear stress in different states.

https://doi.org/10.1371/journal.pone.0045444.t001

(5)In case of being much greater than , as shown in Table 1, the time ratio for the case in which only capillary group is open is much greater than the time ratio for the case in which both capillary groups are open. In other words, for a large portion of time, the two vessel groups are not parallel to each other, but directly in series with the fixed resistance . As a result, the stability behavior of the system should be similar to that of a serial system, which has been shown to be stable as summarized in Case 1. We note that the typical value of . Therefore, our argument above can be valid approximately.

The adaptation process for the case is illustrated in the phase plane as shown in Fig. 2 (B). Arrows starting at the point stand for the rate of change , which is obtained using Eq. (4) in the average sense, i.e., the wall shear stress is obtained using Eq. (5). Fig. 2 (B) also suggests the stability of the equilibrium state for co-existing parallel vessels with switches. A detailed analysis of the stability for a symmetric parallel system is presented in Section Methods – when the OTR is smaller than a critical value, , and the pressure drop on the vessel system is sufficiently large, the adaptation has a stable co-existing equilibrium state.

Now we turn to consideration of the effect of the open-close switch on the stability of vessel trees. The vessel tree is assumed to be in series with a fixed resistance. We further assume that there is a constant pressure drop along the vessel system. In our model, the “leaves” (i.e., the smallest vessels) of the vessel tree represent capillary groups that have two states – open or close.

For a vessel system with capillary groups, there are different states of configurations. In this case, the wall shear stress in the adaptation equation (4) is replaced by its weighted average over all the different states using Eq. (5). In this case, the state variable denotes the state of all the capillary groupsand is the probability of the state

Clearly, the average blood flow rate in the vessel tree is(6)which allows us to compute the average wall shear stress as

(7)Using similar arguments to those in Case 3, one can see that when a vessel tree is small (i.e., the number of capillary groups is small), the adaptation of vessels allows the parallel “crowns” (i.e., subtrees of the vessel tree, as shown in Fig. 3) to co-exist. For example, when all the OTRs are set to be , a -level complete binary vessel tree is locally stable in our simulation of vessel trees according to the adaptation equation (4) (for details, see below). Essentially, the stability of parallel crowns also arises from the serial property induced by the open-close switches. However, when the number of capillary groups becomes large (e.g., there are 16 capillary groups in a 5-level complete binary vessel tree), the results of our simulations indicate that the adaptation of the system becomes unstable. In fact, the larger crowns are less likely to be in serial connections with the constant resistance, and they become effectively parallel to each other, because there are open capillary groups in both crowns for majority of time. As a result, the adaptation of a large vessel system with fixed OTRs is unstable. This conclusion is similar to that of Case 2. In our simulations for large vessel systems, we find that the vessel diameters are adapted to a state nearly satisfying Murray’s law at first, then the vessels in one of the largest sub-trees that has a smaller wall shear stress are narrowed almost proportionally. Eventually, all the vessel diameters of this crown becomes zero (we will refer to this phenomenon as global degeneration). Furthermore, one of the daughter crowns of the surviving sub-tree will become also degenerate if the size of the crown is still large. Finally, only a small vessel crown (e.g., a four-level vessel crown) can survive during the adaptation process of the vessel system.

So far, we have only taken into account the open-close switch by a fixed value of the OTRs in our discussion above. Therefore, the effects of metabolic flow regulation are not yet incorporated into our model, which allows the open-close switch to modulate blood flows according to tissue demand. Next, we model the effects of metabolic flow regulation through a constitutive relation of the OTR with the blood flow, and discuss the effect of this metabolic flow regulation in the adaptation of large vessel systems. As will be shown below, the adaptation of large vessel systems becomes stable after incorporating this type of metabolic flow regulation, that is, through the coupling between the blood flow and the OTRs.

As is mentioned above [1]–[6], [18], when the average flow in a capillary group decreases, the concentration of O₂ (CO₂) in the tissue over which the capillary group perfuses becomes lower (higher). As a result, the capillary groups automatically opens more, i.e., the OTR increases. In this sense, the micro-vessels can modulate the blood flow in response to the local tissue demand. Therefore, we introduce a reference blood flow rate for each capillary group (, where is the index of the capillary group). We define the normalized flow rate , where is the blood flow in the -th capillary group. We model the OTR, , as a function of . We define the sensitivity, , of the -th switch as

According to the metabolic flow regulation behavior discussed above, an increase of blood flow results in a decrease of OTR. Therefore, we have(8)

As we mentioned above, the stability of the adaptation of two large parallel vessel crowns are similar to that of two parallel vessels as summarized in Case 2. Hence, we re-examine this issue using our model of metabolic flow regulation, i.e., by coupling the change of the OTRs with the change of blood flow rate. We will describe important relevant results of the parallel vessel system as shown in FIG. 1 (B). These results will facilitate our understanding of the stability property of large vessel trees.

Case 4.

We consider the vessel system shown in Fig. 1 (B), in which the parallel effective vessels represent parallel vessel crowns. For simplicity, an initial perturbation is introduced to only one effective vessel (vessel in Fig. 1 (B)) of the parallel part, where is the deviation from the equilibrium diameter . Since the resistance of the blood vessel is changed by the perturbation, the blood flow in it also changes, giving rise to a change in the OTRs of the capillaries in the vessel crown. As a result, the change in the resistance of the effective vessel has a component that is induced by metabolic flow regulation. Note that, for a positive (or negative) , the change of blood flow is positive (or negative). Thus the change of resistance induced by metabolic flow regulation has an opposite sign to . From Eq. (3), the resistance of the vessel after the perturbation can be written aswhere is the resistance of the vessel at the equilibrium state. From our discussion above, we can see that the change of resistance due to metabolic flow regulation has an opposite sign to the change of resistance due to the perturbation. In other words, the metabolic flow regulation-induced change of resistance gives rise to a compensation to the change of resistance arising from the perturbation. Hence, a compensation to the flow in the vessel. Clearly, in the critical case that , the compensation is so large as to maintain the blood flow at the value of equilibrium. Hence, the system is stable, which is similar to the case of constant flow rate as we mentioned in Case 1. This suggests that the system should be stable as long as the compensation is sufficiently large, even if it does not fully compensate the blood flow.

In the following, we describe the condition for that renders the system stable. For Fig. 1 (B), according to the Kirchoff’s law, we can obtain the blood flow and wall shear stress for vessel (9)where is the blood flow in vessel before perturbation, and and are the pressure drop on the parallel part before and after the perturbation, respectively. Due to the perturbation, the blood flow in vessel also changes because the blood pressure changes from to , which can also induce metabolic flow regulation. However, the change of blood pressure in large crowns due to the perturbation is generally very small. Therefore, we ignore the change of resistance in vessel , and obtain the wall shear stress

As a consequence of the argument employed in Case 2, we observe that the key point for the system to be stable is that the smaller one of the two parallel vessels should have a greater wall shear stress. Therefore, on the order of , we obtain approximately the necessary condition for the system to be stable(10)

We can see that according to Eq. (10), in order to stabilize the adaptation of parallel systems, at least of the change in resistance (or in blood flow) should be compensated. In the work of [8], a flow-dependent metabolic stimulus is introduced to stabilize the adaptation. A similar analytical result on the metabolic stimulus obtained in the work of [8] provides a lower bound of the metabolic stimulus for adaptation stability.

We will further examine the condition (10) by direct numerical simulations after we discuss the relation between and the sensitivity (see below). The result of our simulations suggest that the conditions (10) are approximately valid.

When the capillary flow is regulated gradually, the strength of the regulation and the probability for the graded regulation to switch on may respond to the local tissue states. This graded regulation also induces a change of the effective resistance. Therefore, the compensation effect of effective resistance of graded regulation is similar to that of open-close switch. When the compensation is large enough, the adaptation process of large vessel systems also becomes stable with graded regulation of capillary flow.

Aside from the metabolic flow regulation as we modeled here, in general, other means of metabolic flow regulation, such as responses to the wall shear stress and to blood pressure [15], [16], have similar effects in the compensation of blood flow, thus helping to maintain a stable adaptation. For example, when a vessel is initially smaller than its equilibrium state, the resistance of the vessel is larger than that of the equilibrium state. Therefore, the blood pressure in its downstream vessels becomes lower. The metabolic flow regulation to the decreasing blood pressure results in a non-structural dilation of the vessels, leading to an increase of blood flow as a compensation. This similar compensatory effect can likely help to stabilize the adaptation of the system.

Finally, for later discussions, we mention other factors that can affect the OTRs. These factors include the tissue activity, , the capillary density, , (the number of capillaries in unit volume of tissue) and the partial pressure, , of Oxygen in the blood. When the tissue is in an excitory state (e.g., when the muscle tissue is at work), the tissue activity is larger than the rest state, and the consumption of Oxygen in tissue is faster. According to the response of the open-close process to the tissue state as discussed at the beginning of this section, the OTR becomes greater. Therefore, we have

Similarly, we further have

For an animal living at high altitude plateau, the partial pressure of Oxygen in the air is low, leading to a low partial pressure of Oxygen in its blood. As a result, the OTRs becomes greater, which helps to deliver more blood to the tissue. From this point of view, the multi-function of the open-close process is not only important in maintaining the stability of the vessel adaptation, but also important in the acclimatization to living conditions.

Now we turn to comparison of the new model with previous models. In the work of [8]–[10], a reference blood flow rate for all vessels (including the high order vessels) is introduced. A metabolic stimulus related to the flow rate is incorporated into the adaptation process. This additional stimulus can stabilize parallel vessel systems. In the modeling work of vascular remodeling in tumors [33], [34], the large vessels that are distant from the tumor are not allowed to collapse, thus the stability issue of these vessels are avoided. Vessels inside the tumor are adapted according to the local tissue Oxygen concentration, which acts as a metabolic stimulus and stabilizes the adaptation process of small vessels. In both models, metabolic stimulus is crucial for the stability in adaptation process. In contrast to the works of [8]–[10], in our new model, the reference blood flow rate is introduced only for capillary groups. We do not explicitly introduce metabolic stimulus. The short term metabolic flow regulation according to the capillary flow is incorporated to modulate the blood flow. As a result of the change in blood flow, wall shear stresses in large vessels also change. The change of shear stress results in an additional effective stimulus, which stabilizes the adaptation of large vessels. For small vessels near the tissue that they superfuse, additional metabolic stimulus may come directly from the tissue and can be important in their adaptation. In particular, such stimulus may be important in the stability of parallel capillaries in a group.

In the modeling work of [39], capillaries are generated or removed according to the tissue states at each time step, and the diameters of higher order vessels are modified according to Murray’s law. Therefore, an infinite adaptation speed of the vessel diameters and fixed flow rates in capillaries in each step are assumed in this model. As summarized in Case 1, the constant flow case is stable. In other words, the change of the blood flow is assumed to be fully compensated by the metabolic flow regulation process. As discussed above, when the compensation of the change of blood flow is partially compensated (more than of the original change) by the metabolic flow regulation, it is sufficient to render a stable adaptation.

Vessel System.

We simulate the vessel adaptation of an -level M-tree. As defined in Section Methods, an M-tree is a complete symmetric binary vessel tree, whose diameters satisfy Murray’s law and the vessel length of each vessel is proportional to its diameter. We add perturbations at random to the initial value of diameters. The constant and the preset wall shear stress in Eq. (4) are assumed to be uniform in the vessel tree, and the pressure drop along the vessel system is fixed at a constant value. The sensitivity of the OTRs is assumed to be a constant, which is the same for all the switches. Hence, the constitutive relation of the OTRs is(11)where is the reference OTR, and are the flow rate of the -th capillary group and its reference value, respectively, and is the constant sensitivity. When is greater than 1 (or less than 0), the OTR is simply set to be 1 (or 0).

Stability. Now we consider the validation of the condition (10) for stability of parallel vessel crowns. Note that, for large vessel trees, we don’t have the value of and yet, since there are too many different states.

In order to consider the average effect of the many different states, we define the effective resistance, , of a vessel tree (or a vessel crown) by(12)which is a weighted harmonic mean resistance of all different states. If the pressure drop on the vessel tree (or a vessel crown) were independent of the state , this effective resistance could be used to compute the average blood flow in the root vessel by

(13)The pressure drop generally depends on the state. For a large vessel tree, however, it varies within a relatively small range for most states (see detailed discussion in Section Methods). This implies that Eq. (13) holds approximately and allows us to compute the effective resistance of a large vessel tree (crown) approximately by that of its two daughter crowns(14)where is the resistance of the root vessel of the vessel tree (crown), and and are the effective resistance of its daughter crowns respectively. The validity of Eq. (13) suggests that we can use the effective resistance to replace and calculate in the stability condition (10).

Next we consider the relation between and the sensitivity . As discussed in Section Methods, when the vessel crowns are large, we can compute the effective resistance recursively according to Eq. (14), until the daughter crowns are sufficiently small (e.g., a 5-level tree). In other words, we can compute the effective resistances of small vessel crowns by definition, then use these effective resistances to compute the resistances of large vessel crowns and eventually the entire vessel tree. For a 5-level M-tree with uniform OTR , the profile of the effective resistance, , of the 5-level M-tree is shown in Fig. 4.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 4. Effective resistance of a 5-level M-tree.

The resistance and its derivative are decreasing functions of the OTR. The values in the ordinate are normalized by the resistance of a capillary group.

https://doi.org/10.1371/journal.pone.0045444.g004

Using Eq. (14), we can recursively compute an approximate effective resistance, , of an -level () vessel crownwhere is normalized by the resistance of the capillaries. Therefore, from Eq. (11), we have

(15)The condition (15) leads to the following condition that the sensitivity satisfies.(16)for a locally stable -level M-tree.

In our numerical simulations, we first add 5% random perturbations on the vessel diameters of a 7-level M-tree initiallywhere is the vessel diameter before perturbation and is a random number uniformly distributed in the interval . Then we evolve the vessel diameters according to the adaptation equation (4). To maintain the stability, the lower bound of the sensitivity estimated from Eq. (16) is about for ( and ). In our simulation, the adaptation is stabilized when . This is in good agreement with the estimate value. Therefore, the numerical simulation confirms that the condition (10) is valid as an approximate stability condition for large vessel trees (vessel crowns).

It can be seen from Eq. (16) that the lower bound of the sensitivity is an increasing function of the level of the vessel tree. Therefore, a sensitivity that can stabilize a relatively small vessel tree may not be able to stabilize a large vessel tree. For example, with , a 7-level vessel tree is stable, but an 8-level vessel tree is not stable. When the sensitivity is not large enough, the stability behavior of the adaptation is similar to the case in which the OTRs are fixed, i.e., there is also a global degeneration. For greater sensitivity , the surviving vessel crown can be larger.

The total number of capillaries in our body is of an order of , which corresponds to a lower bound of the sensitivity estimated from the M-tree. The modeling study in the work of [40] shows that 20–30% increase in Oxygen demand results in an increase by 25–42% of perfused capillaries. This result is in good agreement with the experimental data in the works of [41], [42], which shows that a comparable increment in Oxygen demand is associated with an increment of capillary filtration coefficient at about 18–43%. According to these studies, we can estimate the sensitivity of the open-close switches, which is about . It is worthwhile to point out the following: First, for animals that have bigger size than human beings, the lower bound of sensitivity for adaptation stability is also greater; Second, other means of metabolic flow regulation can have similar effects on the compensation of blood flow. This can help to decrease ; Third, further experiments which aim directly at the measurement of the sensitivity hopefully can help us to obtain a more accurate value of the sensitivity.

Micro-Vessel rarefaction.

Micro-vessel rarefaction [43]–[48] is a phenomenon in the adaptation of real vessel networks, i.e., some small arterioles, small venules, and capillaries become degenerate in many different vessel crowns. Micro-vessel rarefaction is closely connected with the pathogenesis of hypertension [43]–[45]. Micro-vessel rarefaction induces an initial increase of heart blood pressure in a hypertension patient, then the adaptation processes generate a vicious circle between the increased blood pressure and increased peripheral resistance [43]–[45], resulting in thickened vessel walls and narrowed vessel lumens. In order to understand the pathogenesis of hypertension, it is important [43], [49] to understand the origin of rarefaction in hypertension patients.

Furthermore, experimental observations [46]–[48] suggest that decreased tissue activity can also result in micro-vessel degeneration, whereas increased tissue activity can prevent micro-vessel degeneration or even increase the number of micro-vessels. It is also suggested [25], [50], [51] that a low partial pressure of oxygen in arterial blood can slow micro-vessel rarefaction or prevent rarefaction from occurring in the vessel system. Based on our discussion on the behavior of the open-close process, decreased tissue activity results in lower OTRs, whereas increased tissue activity, or low partial pressure of oxygen, results in greater OTRs. This leads us to hypothesize a scenario that, a global decrease of OTRs (which means all OTRs in the vessel network decrease) can induce micro-vessel rarefaction, whereas a global increase of OTRs can help to prevent micro-vessel rarefaction.

This scenario is also confirmed in our numerical simulation. In our simulation, we made a 10% random perturbation to the reference blood flow rate of capillary groups (or to the reference OTR ). As a result, some of the capillaries have smaller OTRs than the others. In the simulation, in different vessel crowns, we have observed degeneration of capillary groups that have small OTRs, but the entire vessel crowns are stabilized by a sufficiently large sensitivity (e.g., for the 7-level M-tree). Furthermore, as we decrease the reference blood flow rate proportionally throughout the entire system, more vessels become degenerate, i.e., a global decrease of the OTRs can induce rarefaction. In FIG. 5, we show the stability behavior of a parallel system. The two capillary groups of the system have different OTRs. As we decrease the OTRs of the two capillary groups proportionally, the co-existing stable equilibrium may disappear. This example suggests that a global decrease of the OTRs is a possible origin of the micro-vessel rarefaction. This is consistent with the experimental observations [25], [46]–[48], [50], [51]. Because there is also micro-vessel rarefaction in patients who are susceptible to hypertension, it may be important to study the behavior of OTRs in those patients.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 5. Global decrease of OTRs leads to vessel rarefaction.

For the parallel system shown in Figure 1 (C), the OTRs of the two switches are different. When the OTRs decrease with the ratio fixed, the stable co-existing equilibrium state becomes unstable. Similarly, for complex vessel systems, when there is a global decrease of the OTRs, the vessels with small OTRs may become degenerate and micro-vessel rarefaction occurs. If the OTRs decrease too much, there can be a global degeneration of the vessel system.

https://doi.org/10.1371/journal.pone.0045444.g005

M-Tree.

Let be the level number of the vessel tree. An -level M-tree is a complete symmetric binary vessel tree, whose diameters satisfy Murray’s law and the length of each vessel is proportional to its diameter. The capillary (group) number and the vessel number of the -level M-trees are shown in Table 2.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 2. Vessel numbers and capillary numbers of M-trees.

https://doi.org/10.1371/journal.pone.0045444.t002

For this tree, the diameters and resistances satisfywhere is the resistance of the capillaries. Using Eq. (23), the effective resistance of the -level vessel tree is obtained from that of its two -level crowns

where is the resistance of the root vessel of the -level tree. At the same time, we can directly calculate the effective resistance from the definition. In order to compare the values obtained by these two methods, we define the relative error as

where is the exact effective resistance obtained from the definition. The numerical results of the relative error in percentage are shown in Table 3.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 3. Relative errors in percentage for the effective resistance of M-trees.

https://doi.org/10.1371/journal.pone.0045444.t003

Fibonacci vessel tree.

Since the real vessel tree is not symmetric, to consider the asymmetric case we define a Fibonacci tree (F-tree): a -level F-tree is a capillary with diameter ; a -level F-tree is a symmetric vessel tree with two daughter -level F-trees; and an -level F-tree () has an -level left daughter F-tree and an -level right daughter F-tree. The tree is also assumed to satisfy Murray’s law. We have Table 4 for the F-trees.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 4. Vessel numbers and capillary numbers of F-trees.

https://doi.org/10.1371/journal.pone.0045444.t004

Similarly, the relative error is defined as

We tabulate the relative errors (in percentage) in Table 5.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 5. Relative errors in percentage for the effective resistance of F-trees.

https://doi.org/10.1371/journal.pone.0045444.t005

The above error is that of resistance, which also represents the error of the blood flow in the root vessel of the two crowns. Since the position of the capillaries in the tree is also asymmetric, there is an additional error due to the asymmetry, as in Table 6 (maximum error in percentage of all capillaries).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 6. Additional error due to asymmetry in percentage for the effective resistance of F-trees.

https://doi.org/10.1371/journal.pone.0045444.t006

In conclusion, the relative error in computing the effective resistance using (23) decreases as the capillary number of the crown increases. When a vessel has 8 downstream capillaries, the relative error is about 1 for corresponding M-tree and F-tree.