Mechanical Model to Estimate Stain Environment at the Periosteum

A mechanical finite-element (FE) model of an adult human femur was established to approximate loading conditions at the surface of the periosteum during bone regeneration. Further, the FE model served as an input into a mechanistic mathematical model (Development of a Cellular-Tissue Model, below). The three-dimensional (3D) computer-aided design (CAD) geometry of the Sawbones standard femur model (third generation), created by M. Papini [31], was accessed online through the BEL Repository (https://www.biomedtown.org). The Sawbones femur represents a composite geometry, which has been validated experimentally as well as computationally to closely represent mechanical properties of the healthy femur [32]. Following import of the Sawbones model into a 3D CAD program (SolidWorks, Dessault Systèmes, Waltham, MA) the one-stage bone transport surgery was simulated on the model through the creation of a full 2.54 cm critical sized defect at the mid-diaphysis, measured as the midline between the femoral head and the condyles. The defect is stabilized with a stainless steel intramedullary (IM) nail of 35 cm length, 12 mm diameter, and interlocked to the proximal and distal femur via four locking bolts of 10 cm length and 7 mm diameter (Fig. 2).

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Figure 2. Set-up of mechanical finite element model.

Simulation of the one-stage bone transport technique at the mid-diaphysis of a human femur, stabilized by an intramedullary (IM) nail and four locking screws.

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Cancellous bone was not accounted for in the mechanical model, as it has been shown previously to alter predictions of strain by less than 1% in a similar linearly elastic model [33]. Joint contact forces, as well as the balancing iliotibial components of the abductors and tensor fascia latae were applied to represent the early stance phase [34], while maintaining the condyles in a fixed position. Meshing and FE analysis was performed (Ansys 14.5, Ansys, Inc. Canonsburg, PA), with a minimum of 150,000 quadratic tetrahedral elements.

The nascent tissue comprises extracellular matrix (ECM) in the form of rapid proliferative woven bone and/or osteochondral tissue in the process of ossification [3], [4], [35]. Tissue genesis proceeds in vivo within the defect throughout the healing process. At any point in time, the tissue (ECM) is idealized as either a cartilaginous and/or osseous template in the process of endochondral ossification. The periosteum is idealized as a membrane of negligible thickness relative to the scale of the defect site. The mechanical environment on the surface of the nascent tissue formed in the defect is therefore assumed to be the same as that of the comparatively soft and elastic periosteum. Material properties are applied based on commonly used values from published studies (Table 1). To assess and account for the evolving mechanical environment at the surface of the periosteum throughout tissue genesis and healing, the material properties of the nascent tissue (ECM, also referred to as callus) evolve over time with repeated simulations. Specifically, at 10 discrete intervals, representing phases of the defect infilling and healing process over time, the Young's modulus and Poisson's ratio are adjusted using mixture theory. The mechanical properties are defined, based on the state of the tissue, falling between the beginning and end states of the endochondral ossification process, with nascent tissue comprising 100% cartilage at one end and 100% cortical bone at the opposite end of the spectrum. The applied material properties are then calculated as a weighted average of the Young's modulus and Poisson's ratio.

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Table 1. Material properties applied to the mechanical finite element model.

https://doi.org/10.1371/journal.pcbi.1003604.t001

Following simulation with the described loading, boundary and material conditions, the strains at the surface of the defect callus surface are extracted (Fig. 3) as inputs for the Cellular-Tissue Model (see below for details). In context of the current study, the axial strain, , which represents the largest measure of normal strain by approximately an order of magnitude, is assessed from each simulation. Strains are recorded as a function of nascent tissue's material properties at the periosteal surface. Based on previous experimental strain mapping studies from our group, positive strains (tensile) are experienced on the lateral aspect of the femur, while negative strains (compressive) are experienced on the medial aspect [19]. For this first generation of the model, only the tensile, positive strains are assessed as they have been more thoroughly described in the literature. Axial strains 90° orthogonal to the lateral aspect are averaged to approximate a representative value, and plotted as a function of Young's modulus (Fig. 3). The further development of mathematical relationships describing the effect of strain on periosteal osteoprogenitor cell behavior is outlined under Parameter Estimation and Simulation Strategy.

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Figure 3. Relationship between nascent tissue material properties and axial strain.

(A) Map of axial strains at the outer surface, representing periosteal mechanical environment. (B) Extracted average axial strain on the lateral aspect as a function of tissue modulus, fit with logarithmic relationship.

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Development of a Cellular-Tissue Model

A mechanistic, mathematical model is developed to quantify the dynamics of cellular and tissue components that can form in a bone defect surrounded by periosteum (depicted schematically in Fig. 1). Definition of a cylindrical coordinate system best depicts tissue genesis described the experimental model [4], analogous to the geometry of a critical sized defect in cross-section and in cognizance of the small length scale cell activity relative to the span of the defect. Furthermore, nascent periosteum derived cell-modulated bone genesis in critical sized defects enveloped in situ by either native, intact periosteum [1], [36] or periosteum substitute [4], [36] proceeds primarily from the outer radial boundary of the bone defect inwards rather than from the axial proximal and distal edges of the defect toward the middle of the defect length. In this model, the primary regulatory processes of BMP-2 are probed in context of bone tissue genesis via endochondral pathways. While BMP is chosen generally to represent a class of molecules that modulate tissue genesis and healing, BMP-2 exerts unique effects on osteoprogenitor cells, chondrocytes and osteoblasts. In overview, a mechanical feedback loop is established, where chondrocytes produce cartilaginous ECM (cartilage), which is subsequently mineralized into bone by osteoblasts. The process of endochondral ossification results in evolution of material properties during tissue genesis, effectively stiffening the defect site and decreasing the mechanical strain experienced at the bounding periosteal surface during the course of healing. Mechanosensistive osteoprogenitor cells within the periosteum upregulate BMP-2 production as a function of their prevailing mechanical environment (strain). A decrease in production of BMP-2 follows stiffening of the tissue regenerate. BMP-2 in turn regulates the cell processes of proliferation and differentiation (Fig. 4).

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Figure 4. System diagram of cellular processes.

Periosteally mediated bone regeneration following mechanical strain stimulus of progenitor cells located in the periosteum, mediated by expression of, e.g. BMP-2. For the purposes of the current model as a foundation for next generation models, BMP is an isolated representative factor implicated in regulating all of the described processes and as such represents a class of signaling molecules whose mechanistic roles can be probed explicitly in follow on studies.

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Dynamics of Osteochondroprogenitor Cells

The osteochondroprogenitor (OP) cells located within the cambium layer of human periosteum are capable of differentiating along chondrogenic and osteogenic pathways [37]. BMP-2 is known to regulate key biological activities of periosteal OP cells. Human mesenchymal stem cells (MSCs, of which OPs are a subset [38]) proliferate significantly faster following BMP-2 treatment relative to untreated control cells [39]. Additionally, differentiation of periosteal progenitors into chondrogenic and osteogenic cells is regulated by BMP-2 in a dose-dependent manner [8], [16]. While some migration of OP cells may occur, a simplifying assumption of no migration is made in the current model iteration, as cell tracking experiments indicate that periosteal OPs remain close to the periosteal surface [17]. Future versions of the model will be developed to determine eventual roles of migration activity on healing.

The primary behavioral processes of OP cells comprise proliferation and differentiation into chondrocytes (C) or osteoblasts (B), while remaining close to the periosteum at . The OP number per unit surface area at the periosteum changes with time according to:(1)Injury and mechanical stimulus of periosteum results in a rapid proliferation of OP cells [40]; proliferation and differentiation of OP cells serves to maintain a population of multipotent cells in the periosteum throughout healing. As long as the density of OP cells is below a critical density, the rate of OP cell proliferation follows a Monod relationship for a rate-limiting factor (BMP):(2)When the density of OP cells is above the critical density, the rate of proliferation matches the rate of differentiation to chondrocytes and osteoblasts:(3)such that population of OP cells remains constant in the periosteum during healing.

The rate of OP differentiation to chondrocytes or osteoblasts similarly follows a Monod relationship for BMP:(4A)(4B)In the Monod relationship, V represents the maximum rate and K is the bound BMP concentration at V/2.

Dynamics of Bone Morphogenetic Protein

As BMPs are the most well-known and researched musculoskeletal growth factors [41], they are the focus of the framework for growth factor activity in the model presented here (although future iterations of the model may be expanded to include an array of growth factors and cytokines that modulate tissue genesis and healing). BMPs are widely implicated as important regulatory factors during all stages of bone regeneration including cellular proliferation, differentiation, ECM production and apoptosis [42]. Recently, BMP-2 has also been shown to play an key role in periosteum-mediated bone regeneration [43], where deletion of BMP-2 postnatally almost completely blocks osteogenic and chondrogenic differentiation of periosteal progenitor cells [16]. The OP cells within the periosteum are mechanosensitive, with BMP-2 upregulation detectable within the periosteum in vivo as shortly as one hour after loading stimulation [44]. The periosteum also responds to mechanical stimulation by a robust proliferation of OP cells within the cambium layer [14], [45].

BMP-2 (here labeled as BMP for simplicity) is produced by mechanical stimulation of OP cells and diffuses away from the periosteum into the defect site. The system of BMP anatagonists is complex and not yet fully understood, but it appears to be a self-regulatory negative feedback loop [46]. To keep this aspect as straightforward as possible in the current generation of our model, we idealized deactivation of BMP from the system as a metabolic removal by cell uptake and consumption. As our understanding of the biology gains sophistication, the model will be refined to provide a more realistic reflection of the complex biological situation.

Hence, the number of BMP units per unit volume in the defect, , change according to:(5)Initially, no BMP is present: . Furthermore, at the surface of the nail, BMP cannot penetrate:(6)At the periosteum, the rate of production of BMP, which is proportional to the number density of the OP cells, equals the BMP diffusion flux into the defect. The rate of production depends on the strain at the periosteal surface, modeled as the axial normal strain, :(7)where relates periosteal strain to BMP production.

Mechanical Factors

The mean axial normal strain, is calculated as an empirical function of the average elastic modulus : described in the Parameter Estimation and Simulation Strategy section. The average elastic modulus is integrated over the defect region:(8)The local elastic modulus depends on the area fractions of cartilage () and bone (), and is calculated using a law of mixtures, where the elastic modulus for cartilage () and for bone () are known constants:(9)and where the fraction of ECM at any position in the cross-section of the defect is:(10)

Chondrocyte Dynamics

Chondrocytes (C) migrate according to random motility, proliferate, and die by apoptosis, where is the number of chondrocytes per unit volume:(11)The rate coefficient for proliferation depends on the local BMP concentration:(12)Chondrocyte apoptosis occurs at a critical density of the local ECM, i.e. :(13)Migrating cells do not enter into the intramedullary cavity (filled by a nail) so that the cell motility flux is zero; consequently,(14)Close to the periosteum, OP cells that differentiate into C cells migrate into the defect space. The rate of migration per unit surface area equals that of cell differentiation:(15)Initially, no chondrocytes are present in the defect:

Osteoblast Dynamics

Osteoblasts (B), which are formed by the differentiation of OP cells, migrate by random motility, proliferate and die by apoptosis. The number of osteoblasts per unit volume, , change with time and position as follows:(16)The rate coefficient for proliferation depends on the local BMP concentration:(17)Apoptosis of osteoblasts occurs when they are surrounded by a critical density of bone:(18)Since migrating cells do not enter into the intramedullary cavity (filled by a nail), the cell motility flux is zero; consequently,(19)Close to the periosteum, OP cells that differentiate into B cells migrate into the defect space. The rate of migration per unit surface area equals the rate of cell differentiation:(20)Initially, no osteoblasts are present in the defect:

Production of Extracellular Matrix

The extracellular matrix (ECM) consists of cartilage and mineralized bone. Cartilage is produced by chondrocytes, and is mineralized (transformed) into bone, mediated by osteoblasts. In any region of the defect (), the ECM formation is considered to be characterized by neighborhood area fractions of cartilage () and bone (), such that(21)

Within the defect (), the local area fraction of cartilage increases in proportion to the local density of chondrocytes, and decreases in proportion to as the rate of mineralization:(22)The rate coefficient of cartilage formation varies with , the local area fraction of total ECM. When is small, the rate of production of cartilage is a maximum. When increases beyond a critical value, , the rate slows as increases due to contact inhibition. Cartilage production stops when reaches a critical maximum density :

Mineralized bone is produced by osteoblasts mineralizing the cartilage template, the presence of which must precede bone formation. The local area fraction of mineralized bone increases in proportion to :(23)The rate coefficient for bone mineralization, , depends upon the local cell density of osteoblasts:

Parameter Estimation and Simulation Strategy

Proliferative rates are estimated based on literature values for osteoprogenitor cells, chondrocytes and osteoblasts as:  = 1.5 fold/day [47],  = 1.3 fold/day [48] and  = 2.4 fold/day [49]. The diffusivity of BMP-2, , is approximated as the diffusivity of protein in cytoplasm:  = 0.013 cm²/day [50]. The motility of osteoblasts and chondrocytes is estimated as one order of magnitude lower than that of BMP: 1.3×10⁻³ cm²/day. The maximal rate of cartilage and bone production per day by chondrocytes and osteoblasts are estimated as: 3×10⁻⁶ cm²/(cell day) [51], [52].

The mean axial normal strain is calculated as a function of (GPa), which is determined from the average of for all lateral nodes at the periosteal surface from finite element outputs:(24)where is in GPa (Pa⁹) and is in millistrain (ε⁻³).

To estimate , we consider a periosteal tensile strain of 2.5 millistrain, experienced at the lateral surface in a rat forelimb model [53] in context of strain magnitudes predicted on the corresponding surface of our current FE model. In the experimental rat model, the strain induces a four-fold upregulation of BMP production at the periosteal surface, where a one-fold increase is comparable to the non-loaded side. Although the alignment of the strain gage during measurements was not reported in this study, compressive and tensile strains are reported, and we assume that the strains represent axial components. Simply put, a 100% increase in BMP production represents a two-fold upregulation, and a 300% increase represents a four-fold increase in BMP production at the periosteal surface (e.g. 100 pg BMP increasing by 300% would be 100 plus 300 pg, resulting in 400 pg total or a four-fold increase). We then apply the experimental observations relating strain (2.5 millistrain or 0.25%) and upregulation of BMP production (300%) in the rat model [53] to our FE model, which predicts axial strains on the surface of the human femur to range from zero to a maximum of 12 millistrain or 1.2%, with most values on the order of magnitude of 0.25% (per method of calculation outlined in Mechanical Model to Estimate Stain Environment at the Periosteum). Hence, assuming a linear relationship between strain and BMP production, the following value of k_Mech is established, which represents the percent increase in BMP production with a given strain:  = 1.2 as a factor increase in BMP production over baseline per unit of microstrain.

The governing equations described previously are transformed to dimensionless versions (Fig. S1). Subsequently the spatial derivatives are discretized so that the model can be represented as an initial-value problem (Fig. S2). Numerical solution of this problem was obtained by applying a code for stiff differential equations “ode15s” in MATLAB R2011b (MathWorks, Natick, MA). For the first set of simulations, all dimensionless parameters are set to 1, except the calculated cell motilities, and and the mechanical stimulus parameter, . In subsequent simulations, parameters are varied independently to determine the relative effect on known outcome measures of ECM area fractions, and .

Comparing Model Predictions to Two Experimental Cases

In vivo experiments harnessing the regenerative capability of the periosteum to infill critical sized defects have been performed in ovine models [1], [4]. Two experiments provide ideal case studies to explore the power of the model to predict potential biological mechanisms leading to observed outcomes. In the first case study, resected autologous periosteal graft is tucked into a periosteal substitute membrane, which is then sutured around the critical sized defect, and stabilized by an intramedullary nail. In the second case study, a patent (intact vascularity) periosteal sleeve is sutured in situ after removal of underlying cortical bone and similar placement of an intramedullary nail for mechanical stabilization. The case studies are of particular interest, as they share a common final desired outcome of full tissue generation and healing of the defect at 16 weeks after surgery. However, previous studies indicate that the two case studies each exhibit a distinct time course for tissue generation as well as mechanism of mineralization.

Healing outcomes are assessed at 16 weeks, where tissue blocks are prepared for hard tissue histology, including Giemsa-eosin staining and fluorochrome microscopy. Giemsa-eosin staining dyes cartilage and cell nuclei blue, and mineralized bone tissue pink (Fig. 13A), offering an ideal comparison between model parameters and biological outcomes at a given time point. The nature of histological staining, however, does not enable temporal analysis of key variables as tissue must be fixed and processed. The chelation of fluorochromes, administered at distinct time-points (e.g. 2 weeks, 4 weeks) enables a semi-quantitative assessment of the extent of mineralization, where unique fluorescence wavelengths are utilized to indicate mineralization occurring during a known time span (Fig. 13B).

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Figure 13. Spatiotemporal assessment of endochondral ossification.

Although from different experimental cohorts, the time course of endochondral ossification observed as a gradient of green to red in the right hand case study in (B) can be tied to the spatial gradient of mineralization observed as a gradient from pink to blue in (A). (A) Endochondral ossification of cartilage template (c) to bone (b) by osteoblasts seen as the densely blue-staining rounded cells lining the interface of mineralized tissue and cartilage. Staining of histological specimens enables quantitative assessment of ECM outcome and cell density at a given time in the healing process. Chondrocytes are present in the cartilage matrix, and appear more irregularly shaped. Scale bar = 100 µm. (B) Spatial and temporal aspects of defect filling via cellular tissue genesis. Insets in upper right and lower left quadrants (note length scale compared to length scale of defect and IM nail) depict temporal bone formation through visualization of fluorochromes, which chelate to mineral as the ECM is mineralized. The upper right quadrant shows the case study in which patent periosteum is sutured in situ around the defect; direct intramembranous bone formation (rapid mineralization of callus) is observed within two weeks (green), and subsequent osteoblastic bone formation (red, blue) occurs via lamellar apposition. The lower left quadrant demonstrates a case in which bone graft is packed in the defect before suturing of patent periosteum around the defect; bone remodeling is observed in the graft-filled defect zone (blue, green) and endochondral bone formation is observed between the underside of the periosteum and the outer edge of the packed bone graft (not shown). Cf. [18] for original micrographs showing full field of view.

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Comparing final outcome measures between the two experimental case studies, a larger area (in cross section, volume in full tissue block) of callus generation was observed when periosteum graft is incorporated in a periosteum substitute implant than when periosteum is sutured around the defect in situ. From micro-computed tomography (μCT) of the entire callus regenerated via periosteum sutured in situ, callus volume comprised 3500 mm³ out of the 4000 mm³, or 87.5% of total defect space [1], with cross-sectional area of tissue regenerate measured in histological cross sections proportional to representative volume. The μCT-measured volume corresponds well to the computational model parameter phi value of 0.1, corresponding to 90% callus infilling. Based on μCT measures of the case study in which periosteum is sutured in situ around the defect, total bone volume comprises approximately 40% of callus tissue regenerate. In contrast, periosteum mediated bone generation in the case where the periosteum substitute is used results in approximately 60% filling of the defect with bone; in this case study, quantitative μCT measures could not be made due to retention of the IM nail which leads to imaging artifacts. Though of the same order of magnitude, differences in bone generation between the two case studies may be attributed to differences in tissue regenerate composition, which result from parameters including relative cell populations, as well as differentiation and proliferation rates.

To begin to elucidate which predictive model parameters may lead to these observed differences in outcomes, model parameters are varied parametrically to achieve experimentally relevant ECM area outcomes. As an initial approach midway between the two experimental case study outcomes, ECM area outcomes were targeted at 50% bone and 50% cartilage comprising the total, final callus cross-section (Fig. 14). To achieve the experimentally relevant outcomes from the complete set of parameters of relevance for healing, the rate of differentiation of osteoprogenitor cells to osteoblasts, as well as the proliferation rate of chondrocytes and osteoblasts must be reduced. Additionally, cartilage and bone are formed at the same rate, whereas complete healing outcome analyzed previously (Fig. 5) requires a faster rate of cartilage production from chondrocytes.

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Figure 14. Parametric elucidation of callus healing at 16 weeks in ovine models.

Simulation of observed outcomes in two experimental cases where a critical sized femoral defect is enveloped by periosteum or a periosteum substitute.

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Histological experimental measures including fluorescence intensity of the fluorochrome administered after two weeks of healing are comparable with computational predictions. Specifically, the radial intensity of the chelated fluorochrome, a measure of chelated fluorochrome and thus mineral concentration, significant correlates to periosteal proximity, where mineral concentration increases with increasing proximity to the periosteum and distance from the IM nail [18]. These data match the predicted gradients in BMP, cells and tissue fractions over time, as predicted by the computational model (Fig. 15). Taken together, the data from these two case studies demonstrate the feasibility of the predictive model.

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Figure 15. Comparison of model-predicted spatial profiles with experimental measurements.

(A) Experimental result: radial distribution of mineralization from the periosteum (0) to the intramedullary nail (10) at 2 weeks indicates more bone formation adjacent to the periosteum, with mineralization/chelation significant correlated to radius, and little to no bone present at the intramedullary nail. [18] (B) Model predictions at early times (for a 16-week experiment, t = 0.25 corresponds to 4 weeks) indicate a similar distribution of bone, with no mineralized tissue at the surface of the nail.

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