Structural model

The amino acid sequences of the myosin heavy chains were obtained from the NCBI protein database [27] with the accession numbers: NM2A—P35579, NM2B—P35580, NM2C—NP_079005, M18A—Q92614. The coiled-coil was translated into a linear chain of point charges with axial spacing of 0.1456 nm between residues [14]. The charges were assigned according to the charges of the amino acids (+2e for arginine and lysine and −2e for aspartic acid and glutamic acid; factor 2 as the rod domain consists of two heavy chains). We utilized the software paircoil [28] to determine the position of the individual amino acids within the rod and subsequently canceled the charges of amino acids that are facing towards the inside of the rod (i.e. positions a and d within the heptad repeat [13]). The rotational invariance of the model was justified with the findings from Ricketson et al. [16] who reported that even in their highly complex model, rotation around the main axis was insignificant for the final outcome. One issue that requires extra care is the treatment of the skip residues, which are single isolated residues outside the usual heptad structure of the coiled-coil that are believed to increase rod flexibility by locally perturbing the coiled-coil structure [29]. While the three skip residues of NM2 have been left out in the molecular model by Ricketson et al. [16], they have been kept in the charge chain model by Straussman et al. [19]. Here we follow the second approach because otherwise we would obtained an unrealistically high level of symmetry along the rod.

Calculation of electrostatic interactions

In line with previous efforts, for straight NM2-rods we restrict our model to the electrostatic interactions [15, 16]. In principle, hydrophobic interactions could result from the local perturbations caused by the skip residues [29], but in general, it is well known that minifilament assembly is mainly determined by electrostatic interactions, as it is very sensitive to salt concentration. Electrostatics in the presence of mobile ions is a very challenging subject and in the strong coupling limit can lead to counterion condensation [30]. Assuming an effective charge of 0.085 e per residue (as obtained from the amino acid sequence of NM2B), a distance of 0.1456 nm between residues and modelling the myosin rod as a cylinder of radius 1 nm, we estimate a surface charge density of 0.09 e/nm² and subsequently a Gouy-Chapman length of 11 nm. Because this is much larger than the Bjerrum length of 0.7 nm, we are in the weak coupling limit described by Poisson-Boltzmann theory, a mean-field theory which assumes local thermal equilibrium [31, 32] and that has been used before to numerically calculate the electrostatic interactions of myosin rods based on a molecular model [16]. Here, however, we aim at a computationally more efficient model. A simple estimate shows that we are also in the limit of small ionic strengths (i.e. qΦ/k_BT ≪ 1). In this limit, the Poisson-Boltzmann equation can be linearized to yield the Debye-Hückel equation (1) For monovalent ions of concentration n₀, the range of the electrostatic interaction is given by the Debye-Hückel screening length l_DH defined by (2) Here ϵ = 80 is the dielectric constant of water. For the physiological salt-concentration ∼ 100 mM NaCl, the screening length takes the value l_DH ≈ 1.3 nm [33]. Eq 1 is solved for a point particle with charge Q by (3) Due to the linear nature of Eq 1, the total electrostatic energy between two NM2-rods can be obtained by summation (4) where N and M represent the total number of amino acids of the two rods and i and j the index of the respective rods.

Bending of the rods

We treat the NM2-rods using the worm-like chain (WLC) model which describes the behavior of semi-flexible polymers, i.e. polymers with locally straight conformation. We assumed a persistence length of l_p = 130 nm [34, 35]. Bending was only considered for one of the two rods and restricted to a circular arc with radius R and arc length L_a. The bending energy of the WLC then amounts to [32, 36] (5) For a given stagger s, we assume that the myosin rod is straight along an overlap length L₀, then bends with radius R and arc length L_a and finally is straight again. In order to decrease the degrees of freedom, a grid-based minimization technique was used to fix L_a and R for given s and L_o. This was realized by testing a range of possible values for R and L_a and calculating the electrostatic energy according to Eq 4 and the bending energy according to Eq 5. The ranges of tested values amount to R ∈ [75 nm, 300 nm] and L_a ∈ [15 nm, 40 nm]. The minimum in total energy is used to fix R and L_a for given s and L_o.

Calculation of the contact time

We consider dimer formation as a two-step process. In the first step, the positively charged N-terminal region of the first rod attaches to the rod of the second NM2 with axial stagger s. We consider an initial contact of 25 residues which corresponds to 3.6 nm. Variations of the size of this initial contact had a negligible impact on the distribution of contact times. In the second step, the approaching NM2 would then roll onto the other NM2 to partially align the two rods. For the duration of this alignment process the stagger was considered to be fixed and detachment was only possible by reversing the attachment process. We modelled this alignment process as the diffusion of a Brownian particle in an external one-dimensional potential using the Fokker-Planck equation [37–39] (6) The drift A represents the directed motion of the particle and the diffusion constant D the undirected Brownian motion. As we assume the stagger to be fixed, the free variable corresponds to the length of the overlap x = L_o and the external potential V(x) = V(L_o) to the energy potential with respect to L_o for fixed s. The diffusion should be seen as an effective diffusion which describes the random alignment and de-alignment of the two rods. One would expect this effective diffusion to be dependent on the other variables (mainly L_o), however, due to the complex relationship between L_o and D, we used a constant D as a first approximation. In the overdamped limit we neglect the inertia of the system and thus, the directed motion of the particle directly stems from the external potential as A(x) = ∂_x V(x)/ξ with the friction coefficient ξ. Furthermore, we assume constant diffusion as D(x) = D = k_BT/ξ with the same friction coefficient ξ.

We are interested in the so-called mean first passage time T₁, i.e. the average time it takes the Brownian particle to leave the system domain [a, b] defined by a reflecting boundary at x = a (here L_o = L_max) and an absorbing boundary at x = b (here L_o = 0 nm). In our context, the mean time from the first contact to the separation of rods is the mean contact time. From our previous assumptions, the mean first passage time can be calculated as [37, 39] (7) The contact time between two rods with respect to the initial attachment site (i.e. the axial stagger s between the rods) poses a non-trivial transformation from the 2D potential energy to a measure of how likely the different staggers are, i.e. the contact time. In the absence of a microscopic model for the diffusion constant D, the contact times are not considered as absolute values but only in relation to each other.

Staggering of myosin rods

Starting from the regular coiled-coil structure, we transformed the amino acid sequence into a linear chain of point charges with axial distance of 0.1456 nm between neighboring residues, similar to previous efforts [19, 24, 26] and as described in Materials and Methods (Fig 1A). Summing up all charges with a 98 residue window, we obtained the charge distribution along the myosin rod (Fig 1B). It clearly shows the known pattern of the positive end charge and the five negative charges distributed along the rod. Interestingly, the difference between the three different NM2-isoforms is relatively small. The electrostatic potential around the rod can be calculated using the Debye-Hückel equation (S1 Fig).

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Fig 1. Electrostatic interactions and staggering of myosin rods.

A: The myosin rod is treated as a linear chain of charges derived from the amino acid sequence of the respective isoform. B: Charge distribution along the rods. The charges were summed over a 98 residue window. The positive C-terminal tip as well as the five regions of increased net negativity are marked with + and -. All three isoforms are relatively similar. C: Schematic depiction of the parallel and antiparallel configurations with stagger s. D: Electrostatic energy of two straight NM2B rods as a function of stagger s. Dashed grey lines mark the experimentally observed staggers which agree with local energy minima (14.3 nm, 43.2 nm and 72.0 nm for parallel rods and 113–118 nm for antiparallel rods).

https://doi.org/10.1371/journal.pcbi.1007801.g001

Next the two rods were placed next to each other with a stagger s (Fig 1C). The lateral distance between the rods was assumed to be 2 nm which is in accordance with previous research and results from the rod diameter of 1 nm [5]. We then calculated the overall electrostatic interaction energy (Fig 1D). We note that these results are very similar to the ones of a more detailed study that used a three-dimensional molecular structure of the coiled-coil [16], suggesting that our coarse-grained model captures the essential details of the charge distribution. For the parallel rods, the experimentally observed staggers at 14.3 nm, 43.2 nm and 72.0 nm emerged as local minima in the overall electrostatic energy landscape. For the antiparallel rods, the experimentally observed stagger at 113–115 nm (corresponding to an overlap of 43–45 nm with an overall rod length of 158 nm) emerged as the global minimum. However, as the exact length of the non-helical tailpiece is not known, the conversion from overlaps to staggers might not be completely accurate. In all cases, the observed staggers correspond mainly to interactions between the positively charged C-terminal end and regions of increased net negativity along the rod, but in addition also profits from complementary charges at other positions along the rod (S2 Fig). The interactions between antiparallel rods for negative staggers are extremely unfavorable as the positively charged ACDs are not in contact and therefore they are not considered in the following. For the favorable staggers, we find that the difference between the three different isoforms is relatively small (S3 Fig).

Splaying of myosin rods

We next addressed the question which additional feature might be relevant to stabilize the metastable states identified by the electrostatic model. Since the myosin rods have a persistence length of l_p∼130 nm [34, 35], which is smaller than their length of 160 nm, appreciable bending is expected and indeed is commonly seen in electron microscopy images [6]. We therefore reasoned that bending might be an important aspect of minifilament stability. We considered the stagger s and overlap L_o to be free variables and to allow for variable bending after the overlap region (Fig 2A). For every set of (s, L_o), we choose optimum values for the arc length L_a and the radius R to minimize the overall energy. The result of such a calculation is the energy as a function of both the stagger s and the overlap L_o (Fig 2B). The black diagonal line indicates the maximum possible overlap and the shaded area above this line represent inaccessible values for L_o. For parallel rods, it is clearly visible how the experimentally observed staggers at 14.3 nm and 43.2 nm can achieve larger overlaps L_o (blue spikes in the heat plots), which indicates their high stability. The overall energies at these staggers are also more favorable (i.e. more attractive). For the antiparallel case, the experimentally observed staggers around ∼113 nm are also visible, although several other favorable interactions are also conceivable. For small overlaps L_o, most of the staggers (in the parallel and antiparallel case) yield negative energies which reflects that the positive tip can attach at several negatively charged sites along the rod, indicating a large diversity of possible configurations. As for the straight rods discussed above, the differences between the isoforms for the bent case are also relatively small (S4 Fig).

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Fig 2. Splaying of myosin rods.

A: Schematic depiction of the considered configurations. The two rods have axial stagger s and overlap L_o. One of the two rods can bend along a circular arc with radius R and arc length L_a. B: Total energy of two NM2B with respect to the stagger s and the overlap L_o. The grey arrow heads indicate the experimentally observed staggers, which indeed correspond to favorable interaction energies (blue).

https://doi.org/10.1371/journal.pcbi.1007801.g002

To better understand the relation between the total energy and the overlap L_o for a given stagger s, we next plotted vertical cross-sections through the energy potential for NM2B (Fig 3). Similar results were obtained for the other two isoforms (S5 Fig). All parallel cases, which correspond to the experimentally observed staggers, are favorable for small overlaps and become unfavorable for larger overlaps. This strongly suggests that the formation of parallel dimers is always accompanied by the splaying of the heads away from the rods. By only partially aligning, the two rods prevent the negatively charged N-terminal end from interacting. For intermediate values of L_o, the potentials are rather flat with variations on the scale of ≤ k_BT for several tens of nm. This suggests that the actual value of L_o fluctuates in the range of favorable values.

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Fig 3. Total energy of two NM2B as a function of overlap L_o for fixed stagger s.

The parallel staggers have a critical overlap L_o below which bending is favorable, while the antiparallel staggers exhibit decreasing overall energy for increasing overlap L_o. The minimum total energy for the parallel cases is between ∼ −6.5 and ∼ −8k_BT, while the antiparallel ones reach values of up to ∼ −11k_BT.

https://doi.org/10.1371/journal.pcbi.1007801.g003

For the antiparallel case, the experimentally observed values at 113.4 nm and 118.2 nm as well as the stagger at 84.7 nm is shown. In contrast to the parallel case, the antiparallel staggers exhibit a steady decrease in overall energy with increasing overlap L_o, which is expected as both of the positively charged C-terminal regions can favorably interact on either side. This suggests that once attached at these staggers, the two antiparallel rods quickly align completely. The antiparallel staggers are also more tightly bound than the parallel ones. While the parallel cases achieve values between ∼ −6.5 and ∼ −8 k_BT, the antiparallel ones have a maximum attraction of ∼ −11 k_BT. This suggests that the antiparallel configurations act as nucleation sites.

Zipping and rolling of splayed rods

The splaying of myosin rods away from the minifilament main axis predicted above suggests strong interactions with the environment and high dynamics. In order to explore the potential dynamics of splayed configurations, we next treated the assembly process as a dynamical system subject to thermal motion. In detail, we imagined a two-step process of dimer-creation [26] (Fig 4A). In the first step, the positively charged tip of a NM2-rod is attracted to the large, negatively charged rod domain of another NM2-rod. After the tip attaches, the approaching NM2 would then roll onto the other NM2 to partially align the two rods. The length of the overlapping region between the two rods L_o then stochastically fluctuates depending on the electrostatic potential. As binding energies between two rods reach several k_BT, the rods can only disassociate by unrolling, thus effectively reversing the attachment process. The stagger s between the rods remains unchanged until the two rods disassociate.

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Fig 4. Zipping and rolling of splayed rods.

A: Schematic depiction of the alignment process. B: Contact times calculated from the Fokker-Planck equation. Experimentally observed staggers (marked by the dashed grey lines) are present as clear peaks.

https://doi.org/10.1371/journal.pcbi.1007801.g004

In our dynamical framework, the quantity of main interest is the mean time for which two rods are engaged with each other, termed mean contact time T₁. Favorable staggers naturally result in higher mean contact times and therefore are more likely to be incorporated into minifilaments. We calculated T₁ by treating the alignment process as an effective Brownian motion in an external potential using the Fokker-Planck equation (Fig 4B). We note that the contact times scale inversely with the diffusion constant and are given in units of nm² because we abstain from parameterizing our simulations with a specific time scale as this would depend on context. We found that the contact time can reproduce the experimentally observed staggers for parallel rods (indicated by dashed lines in Fig 4B) much clearer than the total electrostatic energy shown in Fig 1D. These results suggest that the bending and dynamic attachment of the rods are inherent features of NM2 dimer formation and thus NM2-minifilament nucleation and growth.

Mixed filaments

We next applied our contact time procedure to hetero-dimers, thus addressing the important question of mixed filament stability (Fig 5). The order of magnitude scaling factor on the top left of all diagrams reflects the strong variability in the contact times. The diagonal corresponds to the homo-dimers as discussed above. On the off-diagonals, the isoform that is listed first corresponds to the straight NM2-rod while the one listed second corresponds to the shifted and bent one. In the cell, the dimer formation between e.g. NM2A and NM2B is likely to be a mix between NM2A-NM2B and NM2B-NM2A as calculated here. For parallel interactions (Fig 5A), all pairings show strong peaks at the experimentally observed staggers of 14.3 nm, 43.2 nm and 72.0 nm. For combinations of NM2A and NM2B, the peak heights decrease, but the relative order stays the same. NM2C-containing dimers have their highest peak at s = 43.2 nm, as expected from the respective energy landscapes (S5 Fig). When comparing the overall contact times for parallel homo-dimers, NM2A has the highest contact time followed by NM2B and then NM2C. We furthermore find that NM2B-NM2A dimers have the highest peak of all pairings suggesting that mixed NM2B-NM2A dimers are the most stable. The contact times between NM2C and the other two isoforms are the lowest ones, which can be explained by the smaller net positivity of the C-terminal tip of the NM2C-rod.

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Fig 5. Contact times for NM2 hetero-dimers.

The diagonal lines correspond to homo-dimers and the isoform that is mentioned first corresponds to the straight NM2-rod while the second one corresponds to the shifted and bent one. Experimentally observed parallel staggers (marked by the dashed grey lines) are recovered as stable configurations. Antiparallel configurations are more stable by two orders of magnitude. Surprisingly NM2A-NM2A homo-dimers have longer contact times than NM2B-NM2B homo-dimers.

https://doi.org/10.1371/journal.pcbi.1007801.g005

The contact times for antiparallel interactions (Fig 5B) are about two orders of magnitude larger than the ones for parallel interactions, again strongly suggesting that antiparallel staggers act as nucleation centers for minifilament growth. Most pairings have their highest peaks at s = 118 nm, the same value as reported by Ricketson et al. [16] and close to the experimentally observed range (within the uncertainty of the non-helical tailpiece). As mentioned above, this stagger can be considered to be the interaction between the positive tip and the first region of net negativity (S2 Fig) and corresponds to the maximum possible extension of two antiparallel rods. We note however that dimers containing NM2A have their highest peaks at s = 85 nm, which corresponds to the interaction between the positive C-terminal end and the second region of increased negativity (S2 Fig). The reason for this behavior might be that the first region of net negativity is weakest for NM2A. Similar to the parallel case, NM2A forms the longest lasting homo-dimers with contact times of roughly one order of magnitude larger than the NM2B and NM2C homo-dimers. NM2A-NM2B hetero-dimers are more stable than NM2B homo-dimers. In general, NM2A-NM2B have the highest number of pronounced peaks, while NM2C-containing hetero-dimers show the fewest ones. As the number of favorable configurations is likely linked to minifilament stability, these findings suggest that NM2A-NM2B minifilaments are the most stable ones. Our results also agree with the observation that NM2C forms smaller minifilaments.

In order to extend the range of our analysis, we also tested the interactions between the NM2 isoforms and myosin 18A (M18A), a myosin that has been shown to be incorporated in small numbers into NM2-minifilaments [40]. For the case of parallel interactions, we found that there are fewer favorable staggers than between the isoforms with the longest-lasting parallel interaction close to the usual 14.3 nm stagger (S6 Fig). In the antiparallel case, the two major staggers around ∼85 nm and ∼114 nm are present. Our model thus shows why M18A can be incorporated into NM2-minifilaments. Furthermore, we predict the lack of favorable large parallel and small antiparallel staggers, which agrees with the observation that M18A assembles at the middle of the minifilaments [40].