Networks with passive cross-links and no filament turnover undergo three stages of deformation in response to an extensional force.

To characterize the passive response of a cross-linked filament network without filament turnover, we simulated a simple uniaxial strain experiment in which we pinned the network at one end, and imposed an external stress at the opposite end (Fig 1E). We quantified the internal network stress, the average filament strain, and the cumulative network strain as functions of time (see section entitled Measuring stress, strain, and strain rate above). The typical response to axial stress occurred in three qualitatively distinct phases (Fig 2A and 2C). At short times (up to vertical dotted line in Fig 2C), the network response was viscoelastic, with a rapid buildup of internal stress and a rapid ∼exponential approach to a level of cumulative network strain that represents the elastic limit predicted for a network with rigid irreversible crosslinks [66] S1A Fig). At intermediate times (beyond vertical dotted line in Fig 2C), the local stress and strain rate were approximately constant across the network (Fig 2B), and the temporal response was effectively viscous; internal stress (blue curve in Fig 2C) (and thus filament strain) remained constant, while the cumulative network strain (red curve in Fig 2C) increased linearly with time (dashed line in Fig 2C), as filaments slip past one another against the effective cross-link drag. The linear increase in cumulative network strain corresponds to a nearly constant strain rate. Thus at intermediate times, we can quantify effective viscosity, η_c, as the ratio of applied stress to the measured strain rate. Finally, at long times, as cumulative network strain increased, there was a corresponding decrease in filament density. As cumulative network strain approached a critical value (∼ 30% for the simulation in Fig 2), the decrease in filament density lead to decreased network connectivity, local tearing, and rapid acceleration of the network deformation (see inset in Fig 2C).

Network architecture sets the rate and timescales of deformation.

To characterize how effective viscosity and the timescale for transition to effectively viscous behavior depend on network architecture and cross-link dynamics, we simulated a uniaxial stress test, holding the applied stress constant, while varying filament rest length L, density l_c, elastic modulus μ_e and cross link drag ξ (see S1 Table). We measured the elastic modulus, G₀, the effective viscosity, η_c, and the timescale τ_c for transition from viscoelastic to effectively viscous behavior, and compared these to theoretical predictions. We observed a transition from viscoelastic to effectively viscous deformation for the entire range of parameter values that we sampled. Our estimate of G₀ from simulation agreed well with the closed form solution G₀ ∼ μ/l_c predicted by a previous theoretical model [66] for networks of semi-flexible filaments with irreversible cross-links (Fig 3B).

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Fig 3. Network architecture sets the rate and timescales of deformation.

(A-C) Comparison of predicted and simulated values for: A) the bulk elastic modulus G₀, B) the effective viscosity η_c and C) the timescale for transition from viscoelastic to viscous behavior τ_c, given by the ratio of the bulk elastic modulus G₀ to effective viscosity, η_c. Dotted lines indicates the relationships predicted by theory.

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A simple theoretical analysis of filament networks with frictional cross link slip, operating in the intermediate viscous regime (see S1 Appendix A.2), predicted that the effective viscosity η_c should be proportional to the cross-link drag coefficient and to the square of the number of cross-links per filament: (8)

As shown in Fig 3B, our simulations agree well with this prediction for a large range of sampled network parameters. Finally, for many linear viscoelastic materials, the ratio of effective viscosity to the elastic modulus η_c/G₀ sets the timescale for transition from elastic to viscous behavior [67]. Combining our approximations for G₀ and η_c, we predict a transition time, τ_c ≈ L²ξ/l_cμ. Measuring the time at which the strain rate became nearly constant (i.e. γ ∼ tⁿ with n > 0.8) yields an estimate of τ_c that agrees well with this prediction over the entire range of sampled parameters (Fig 3C). Thus the passive response of filament networks with frictional cross link drag is well-described on short (viscoelastic) to intermediate (viscous) timescales by an elastic modulus G₀, an effective viscosity η_c, and a transition timescale τ_c, with well-defined dependencies on network parameters. On longer timescales, the cumulative decrease in filament density leads to material failure.

Filament turnover allows sustained large-scale viscous flow and defines two distinct flow regimes.

To characterize how filament turnover shapes the passive network response to an applied force, we introduced a simple form of turnover in which entire filaments disappear at a rate k_dissρ, where ρ is the filament density, and new unstrained filaments appear with a fixed rate per unit area, k_ass. Absent deformation, filament density will equilibrate to a steady state value, ρ₀ = k_ass/k_diss, with time constant τ_r = 1/k_diss. However, in networks deforming under extensional stress, density will be shaped by both turnover and network extension, and changes in density will feed back on deformation through the density-dependence of effective viscosity (Fig 3B).

To examine the consequences of these effects, we simulated a uniaxial stress test for different values of τ_r, while holding ρ₀ and all other parameters fixed (Fig 4A–4C). For large τ_r, network extension was accompanied by a continuous decrease in filament density, leading ultimately to loss of connectivity and material failure (S2 Fig). For lower values of τ_r, the network approached a steady state characterized by continuous extension at a constant density and strain rate (Fig 4B, S2 Fig). Analysis of a simple coarse-grained model (S1 Appendix A.3) revealed how this behavior emerges from a competition between density equilibration via turnover and the decrease in density, and thus effective viscosity, during extension. For τ_r greater than a critical lifetime τ_crit, the latter effect dominates, leading to a runaway decrease in filament density, loss of connectivity and material failure. For τ_r < τ_crit, the coarse-grained model predicts the existence of a dynamically stable steady state characterized by continuous extension at constant density and strain rate (S1 Appendix A.3), as observed in our simulations (S3 Fig).

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Fig 4. Filament turnover defines two regimes of effectively viscous flow.

A) Comparison of 12 × 20μm networks under 0.1 pN/μm extensional stress without (top) and with (bottom) filament turnover. Both images are taken when the networks had reached a net strain of 0.04. For clarity, filaments that leave the domain of applied stress are greyed out. B) Plots of strain vs time for identical networks with different rates of filament turnover. Network parameters: L = 5 μm, l_c = 0.5 μm, ξ = 1 nN ⋅ s/μm. C) Plot of effective viscosity vs turnover time derived from the simulations shown in (B). Square dot is the τ_r = ∞ condition. D) Plot of normalized effective viscosity (η/η_c) vs normalized turnover time (τ_r/τ_c) for a large range of network parameters and turnover times. For τ_r ≪ τ_c, the viscosity of the network becomes dependent on turnover time. Red dashed line indicates the approximation given in eq 9 for m = 3/4.

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For τ_r < τ_crit, we observed two distinct steady state flow regimes (Fig 4B and 4C). For intermediate values of τ_r, effective viscosity remains constant with decreasing τ_r. However, below a certain value of τ_r (≈ 10³ for the parameters used in Fig 4C), effective viscosity decreased monotonically with further decreases in τ_r. To understand what sets the timescale for transition between these two regimes, we measured effective viscosity at steady steady for a wide range of network parameters (L, μ, l_c), crosslink drags (ξ) and filament turnover times (Fig 4D). Strikingly, when we plotted the normalized effective viscosity η_r/η_c vs a normalized turnover time τ_r/τ_c for all parameter values, the data collapsed onto a single curve, with a transition at τ_r ≈ τ_c between an intermediate turnover regime in which effective viscosity is independent of τ_r and an high turnover regime in which effective viscosity falls monotonically with decreasing τ_r/τ_c (Fig 4D).

This biphasic dependence of effective viscosity on filament turnover can be understood intuitively as follows: As new filaments are born, they become progressively stressed as they stretch and reorient under local influence of surrounding filaments, eventually reaching an elastic limit where their contribution to resisting network deformation is determined by effective crosslink drag. The time to reach this limit is about the same as the time, τ_c, for an entire network of initially unstrained filaments to reach an elastic limit during the initial viscoelastic response to uniaxial stress, as shown in Fig 2b. For τ_r < τ_c, individual filaments do not have time, on average, to reach the elastic limit before turning over; thus the deformation rate is determined by the elastic resistance of partially strained filaments, which increases with lifetime up to τ_r = τ_c. For τ_r > τ_c, the deformation rate is largely determined by cross-link resistance to sliding of maximally strained filaments, and the effective viscosity is insensitive to further increase in τ_r.

These results complement and extend a previous computational study of irreversibly cross-linked networks of treadmilling filaments deforming under extensional stress [68]. Kim et al. identified two regimes of effectively viscous deformation: a “stress-dependent” regime in which filaments turnover before they become strained to an elastic limit and deformation rate is proportional to both applied stress and turnover rate; and a “stress-independent” regime in which filaments reach an elastic limit before turning over and deformation rate depends only on the turnover rate. The fast and intermediate turnover regimes that we observe here correspond to the stress-dependent and independent regimes described by Kim et al., but with a key difference. Without filament turnover, Kim et al.’s model predicts that a network cannot deform beyond its elastic limit. In contrast, our model predicts viscous flow at low turnover, governed by an effective viscosity that is set by cross-link density and effective drag. Thus our model provides a self-consistent framework for understanding how crosslink unbinding and filament turnover contribute separately to viscous flow and connects these contributions directly to previous theoretical descriptions of cross-linked networks of semi-flexible filaments.

In summary, our simulations predict that filament turnover allows networks to undergo viscous deformation indefinitely, without loss of connectivity or material failure, over a wide range of different effective viscosities and deformation rates. For τ_r < τ_crit, the observed dependence of effective viscosity on filament lifetime can be represented phenomenologically by a simple equation of the form: (9) where the exponent m = 3/4 was chosen to yield a good fit to data in (Fig 4D). For τ_r ≫ τ_c, η ≈ η_c: effective viscosity depends on crosslink density and effective crosslink drag, independent of changes in turnover rate. For τ_r ≪ τ_c, effective viscosity is governed by the level of elastic stress on network filaments, and becomes strongly dependent on filament lifetime: η ∼ η_c(τ_r/τ_c)^m. The origins of the m = 3/4 scaling remain unclear (see Discussion).

Asymmetric filament compliance and spatial heterogeneity in motor acitvity is sufficient for macroscopic contraction.

Previous work [37, 39, 69] identifies asymmetric filament compliance and spatial heterogeneity in motor activity as minimal requirements for macroscopic contraction of disordered networks. To confirm that our simple implementation of these two requirements (see Models section) is sufficient for macroscopic contraction, we simulated active networks that are unconstrained by external attachments, varying filament length, density, crosslink drag and motor activity. We observed qualitatively similar results for all choices of parameter values: Turning on motor activity in an initially unstrained network induced rapid initial contraction, followed by a slower buildup of compressive stress (and strain) on individual filaments, and an ∼exponential approach to stall (Fig 5). On longer timescales, polarity sorting of individual filaments, as previously described [41, 43–45] accompanied network expansion (see S2 Video).

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Fig 5. In the absence of filament turnover, active networks with free boundaries contract and then stall.

A) Simulation of an active network with free boundaries. Colors represent strain on individual filaments as in previous figures. Note the buildup of compressive strain as contraction approaches stall between 100 s and 150 s. Network parameters: L = 5 μm, l_c = 0.3 μm, ξ = 100 pN ⋅ s/μm, υ = 10 pN. B) Plots showing time evolution of total network strain (black) and the average extensional (blue) or compressional (red) strain on individual filaments. C) Plots showing time evolution of total (black) extensional (blue) or compressional (red) stress. Note that extensional and compressional stress remain balanced as compressional resistance builds during network contraction.

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During the rapid initial contraction, the increase in network strain closely matched the increase in mean compressive strain on individual filaments Fig 5B, as predicted theoretically [37, 38] and observed experimentally [39]. Contraction required asymmetric filament compliance and spatial heterogeneity of motor activity (μ_e/μ_c > 1, ϕ < 1, S3A Fig). Thus our model captures a minimal mechanism for bulk contractility in disordered networks through asymmetric filament compliance and dispersion of motor activity.

Active networks cannot sustain stress against a fixed boundary in the absence of filament turnover.

During cortical flow, regions with high motor activity contract against passive resistance from neighboring regions with lower motor activity. To understand how the active stresses that drive cortical flow are shaped by external resistance, we analyzed the buildup and maintenance of contractile stress in active networks contracting against a rigid boundary. We simulated active networks contracting from an initially unstressed state against a fixed boundary (Fig 6A and 6B), and monitored the time evolution of mean extensional (blue), compressional (red) and total (black) stress on network filaments (Fig 6C and 6D). We focused initially on the scenario in which there is no, or very slow, filament turnover, sampling a range of parameter values controlling filament length and density, motor activity, and crosslink drag.

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Fig 6. In the absence of filament turnover, active networks cannot sustain continuous stress against a fixed boundary.

A) Simulation of an active network with fixed boundaries. Rearrangement of network filaments by motor activity leads to rapid network fragmentation. Network parameters: L = 5 μm, l_c = 0.3 μm, ξ = 100 pN ⋅ s/μm, υ = 100 pN. B) Simulation of the same network, with the same parameter values, except with ten-fold lower motor activity υ = 10 pN. In this case, the distribution of filaments remains more uniform, and network connectivity is maintained in the sense that each filament maintains overlap with many others. Note the progressive shift towards less extensional and greater compressional strain on individual filaments (see color map). C) Plots of total network stress and the average extensional (blue) and compressional (red) stress vs. time on individual filaments for the simulation shown in (A). Rapid buildup of extensional stress allows the network transiently to exert force on its boundary, but this force decays and this decay is closely associated with a decrease in extensional stress, reflecting the breakdown in network connectivity. D) Plots of total network stress and the average extensional (blue) and compressional (red) stress vs. time on individual filaments for the simulation shown in (b). Rapid buildup of extensional stress allows the network transiently to exert force on its boundary. However, stress decays at longer times as decreasing extensional stress and increasing compressional stress approach balance. Note the different time scales used for plots and subplots in C) and D) to emphasize the similar timescales for force buildup, but different timescales for force dissipation.

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For all parameters, total stress built rapidly to a peak value σ_m, and then decayed over time (Fig 6C and 6D). The rapid initial increase was determined largely by a rapid buildup of extensional stress (Fig 6C and 6D) on a subset of network filaments (Fig 6A and 6B t = 10s). The subsequent decay involved two forms of local remodeling: for some parameter values, e.g. for higher motor activity (e.g. Fig 6A and 6C), active forces drove rapid network tearing and fragmentation, as previously described [40, 47]. The decay in total stress was closely associated with loss of extensional stress, while buildup of compressive stress made a minor contribution. For other parameter values, (e.g. for lower motor activity as in Fig 6B and 6D), the distribution of filaments remained more uniform, and the decay in total stress was accompanied by a slow decrease in extensional stress, and a slow increase in compressional stress, such that at long times, a low level of residual total stress was sustained by a balance of larger extensional and compressive stresses (see Fig 6D).

Combining dimensional analysis with trial and error, we were able to find empirical scaling relationships describing the dependence of maximum stress σ_m and the time to reach maximum stress τ_m on network parameters and effective crosslink drag (, , S3C and S3D Fig). Although these relationships should be taken with a grain of salt, they are consistent with our simple intuition that the peak stress should increase with motor force (υ), extensional modulus (μ_e) and filament density (1/l_c), and the time to reach peak stress should increase with crosslink drag (ξ) and decrease with motor force (υ) and extensional modulus (μ_e). We were unable to find simple scaling relationships for stress decay, likely because this involves multiple forms of filament rearrangement with different scaling dependencies.

Filament turnover allows active networks to exert sustained stress on a fixed boundary.

Regardless of exactly how active stress is dissipated over time, these results reveal a fundamental limit on the ability of active networks to sustain force against an external resistance in the absence of filament turnover. To understand how this limit can be overcome by filament turnover, we simulated networks contracting against a fixed boundary from an initially unstressed state, for increasing rates of filament turnover (decreasing τ_r), while holding all other parameter values fixed (Fig 7A–7C). While the peak stress decreased monotonically with decreasing τ_r, the steady state stress showed a biphasic response, increasing initially with decreasing τ_r, and then falling off as τ_r → 0. We observed a biphasic response regardless of how stress decays in the absence of turnover, i.e. whether decay involves loss of network connectivity, or local remodeling without loss of connectivity, or both (S4 Fig). Significantly, when we plot normalized steady state stress (σ/σ_m) vs normalized turnover time (τ_r/τ_m) for a wide range of network parameters, the data collapse onto a single biphasic response curve, with a peak near τ_r/τ_m = 1 (Fig 7D). In particular, for τ_r < τ_m, the scaled data collapsed tightly onto a single curve representing a linear increase in steady state stress with increasing τ_r. For τ_r > τ_m, the scaling was less consistent, although the trend towards a monotonic decrease with increasing τ_r was clear.

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Fig 7. Filament turnover allows active networks to exert sustained stress on a fixed boundary.

A) Snapshots from simulations of active networks with fixed boundaries and different rates of filament turnover. All other parameter values are the same as in Fig 6A. Note the significant buildup of compressional strain and significant remodeling for longer, but not shorter, turnover times. B) Plots of net stress exerted by the network on its boundaries for different recycling times; for long-lived filaments, stress is built rapidly, but then dissipates. Decreasing filament lifetimes reduces stress dissipation by replacing compressed with uncompressed filaments, allowing higher levels of steady state stress; for very short lifetimes, stress is reduced, because individual filaments do not have time to build stress before turning over. C) Plots of steady state stress estimated from the simulations in B) vs. turnover time. D) Plot of normalized steady state stress vs. normalized turnover time for a wide range of network parameters and turnover times. Steady state stress is normalized by the predicted maximum stress σ_m achieved in the absence of filament turnover. Turnover time is normalized by the predicted time to achieve maximum stress τ_m, in the absence of filament turnover. Predictions for σ_m and τ_m were obtained from the phenomenological scaling relations shown in (S3B and S3C Fig). Dashed blue line indicates the approximation given in eq 10 for n = 1.

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As for the passive response this biphasic dependence could be described phenomenologically with a simple equation of the form: (10) where the exponent n = 1 was chosen to yield a reasonable fit to the data in (Fig 7D) for τ_r > τ_m.

These results reveal that filament turnover can “rescue” the dissipation of active stress during isometric contraction due to network remodeling, and they show that, for a given choice of network parameters, there is an optimal choice of filament lifetime that maximizes steady state stress.

We can understand the biphasic dependence of steady state stress on filament lifetime using the same reasoning applied to the case of passive flow: During steady state contraction, the average filament should build and dissipate active stress on approximately the same schedule as an entire network contracting from an initially unstressed state (Fig 7B). Therefore for τ_r < τ_m, increasing lifetime should increase the mean stress contributed by each filament. For τ_r > τ_m, further increases in lifetime should begin to reduce the mean stress contribution. Directly comparing the time-dependent buildup and dissipation of stress in the absence of turnover, with the dependence of steady state stress on τ_r, supports this interpretation (S5 Fig).