1. Thermodynamics of Long Supercoiled Molecules: Insights from Highly Efficient Monte Carlo Simulations 
Thibaut Lepage, François Képès, Ivan Junier 
Biophysical Journal 
Volume 109, Issue 1, Pages (July 2015)
DOI: /j.bpj
Copyright © 2015 Biophysical Society Terms and Conditions

2. Figure 1
Torsionally induced super-structuring of DNA molecules. (Left) In vivo, plectonemes, which can be branched, occur because, e.g., of the activity of RNA polymerases and of the anchoring of DNA to the membrane (52). (Right) Topological constraints are exerted in vitro by keeping one end of a molecule fixed and adding helix turns at the other end, thanks to magnetic tweezers (9). To see this figure in color, go online.
Biophysical Journal  , DOI: ( /j.bpj )
Copyright © 2015 Biophysical Society Terms and Conditions

3. Figure 2
A local MC algorithm for simulating supercoiled molecules. (A) (Left) In the discrete version of the sWLC, a rotation of a block of cylinders (green) changes the relative direction of the pairs of cylinders that are on each side of the pivots (red). (Right) (1) In our algorithm, every cylinder, i, is allocated with a twist, Twi, that is equal to the helicoidal winding of the strands (one strand is indicated in black). Schematically, pivots correspond to infinitesimal segments (red s) that connect the main axis of the pivot cylinders (dashed lines). Strand continuity between contiguous cylinders is then ensured by using a junction segment (red S) that is kept parallel with s such that S does not contribute to the overall twist (TwS=0) (see B for further details). (2) A rotation misaligns S with respect to s, generating some twist, TwS≠0. (3) As indicated by the red arrows, TwS=0 is recovered by displacing the end and start positions of the strands around the pivot such that S remains parallel to s, which results in a variation of the length of the strands in each pivot cylinder. The corresponding twist variations within each cylinder and, hence, the corresponding variation of the writhe can thus be easily computed, leading to an algorithm with a theoretical linear time complexity (see main text). (B) In practice, a junction strand, S, corresponds to a piece of strand that connects the end and start points (black points) of the strands associated to two consecutive cylinders—to this end, we use additional coordinates to mark the entry and exit points of the helix of every cylinder. The junction strand is constrained to remain within a plane that is parallel to the plane defined by the main axis of the two cylinders, t→i and t→i+1. To this end, the start point of the strand in i+1 is obtained by rotation of the end point in i around the axis (O,n→), with O the intersection of the main axis and n→=t→i∧t→i+1. Junction strands, although ensuring the continuity of the molecule, do not thus generate any twist, because they remain parallel to the main axis of the molecule. (C) For linear open chains (blue), the conservation of the linking number is implemented by closing the chain at infinity. To this end, we consider at each end of the molecule an infinitely long cylinder (dashed red lines). These external cylinders cannot rotate; they can only translate, as indicated by the red arrows, to follow the motion of the end pivots (red spheres). As originally discussed by Vologodskii and Marko (17), this framework makes it possible to properly handle the conservation of the linking number by associating the well-defined linking number of the closed, infinitely long chain to that of the open chain, which is otherwise ill-defined. To ensure the conservation of this linking number, we further prevent the open chain from crossing the virtual cylinders. In practice, we prevent the open chain from going beyond the end points along the z-axis, as indicated here by the two red walls (the same hard-wall boundary condition was implemented as well in Vologodskii and Marko (17)). Very interestingly, the use of external cylinders further opens the possibility to compute, in a direct way, the torques that are exerted by the open chain. To this end, a torsional energy, characterized by a torsional stiffness, is associated to the excess twist that is transferred from the end cylinders of the open chain to the external cylinders. By losing their torsional neutrality, external cylinders thus behave as magnetic traps, which can be used to investigate the torsional response of the open chain (see Torque measurements for further details). To see this figure in color, go online.
Biophysical Journal  , DOI: ( /j.bpj )
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4. Figure 3
Algorithm performances. Time T in hours (h) needed to perform 107 block rotations, as a function of the length, L, of the chain, measured in Kuhn lengths (lKuhn=2lp). Blue dots indicate our algorithm, which consists of computing the twist. Red dots represent the classical algorithm (25), consisting of computing the writhe. Straight lines are the best fits to a power law. To see this figure in color, go online.
Biophysical Journal  , DOI: ( /j.bpj )
Copyright © 2015 Biophysical Society Terms and Conditions

5. Figure 4
Simulating long supercoiled molecules. Relative extension of a simulated 16 kbp DNA molecule (533 cylinders) as a function of σ for different stretching forces, with C=86 nm, lp=50 nm, and re=2 nm ([NaCl]=100mM). Bars indicate the mean ± SD over four simulations of 107 iterations. Black crosses represent experimental results (11), where one end of the molecule is kept fixed and the other end is manipulated by magnetic tweezers (upper right), allowing to add helix turns to the molecule and to stretch it. To see this figure in color, go online
Biophysical Journal  , DOI: ( /j.bpj )
Copyright © 2015 Biophysical Society Terms and Conditions

6. Figure 5
Structural insights of long supercoiled molecules in the buckling regime. (A) Plectoneme tracking in a 21 kbp molecule using a color code that reflects the density of DNA on the axis along which the molecule is stretched (see the Supporting Material for details) (inspired by the work of van Loenhout and colleagues (16)). High densities (red) reveal plectonemic structures that can be more or less branched, as shown by extracting a particular conformation—the red and orange zooms indicate a branched and a straight plectoneme, respectively. (B) Plectonemes can coexist with curls (blue zoom) and helices (green zoom). To see this figure in color, go online.
Biophysical Journal  , DOI: ( /j.bpj )
Copyright © 2015 Biophysical Society Terms and Conditions

7. Figure 6
Plectoneme properties in the buckling regime. (A) In the spirit of the van Loenhout study (16), we developed a method to detect, count, and measure the plectonemes obtained in our simulations. Namely, for each cylinder i, we test whether i is the starting point of a plectoneme, that is, if there exist cylinders much farther away along the chain that are in the neighborhood of i. Denoting w as the expected width of plectonemes, we thus search whether there exists a cylinder at least 500 bp away from i that is located within a distance w of i (500 bp is the resolution reported by van Loenhout and colleagues (16)). If so, we consider as the end of the plectoneme (j in the figure) the cylinder with this property that is the most distant from i along the DNA. We then repeat the procedure from cylinder j+1, and so on. Here, we report results using an expected width w=2K/f (2), which lies between 16 and 32 nm in the experiments presented here—the exact value of w actually has a negligible effect (Fig. S7). (B) Application of the method on a 21 kbp molecule (1400 cylinders) using f=3.2 pN and σ=0.07, where five plectonemes are detected and painted with different colors (note that the blue ones are branched). (C) Using this automatic detection, compared to the results of van Loenhout and colleagues (16) (black), we obtain a significantly higher number of plectonemes (red). To be able to properly compare our results with experiments, we further consider the spatial resolution (∼500 nm (16)) that is intrinsic to the fluorescent staining of DNA due to light diffraction. To this end, we merge the plectonemes whenever their distance along z is <500 nm. In this case, we still find a larger number of plectonemes (blue) but that is nevertheless consistent with experimental results. Here, parameters of the simulations are such that 25% of DNA is plectonemic (16). The bars indicate the standard variation over 12 simulations. To see this figure in color, go online.
Biophysical Journal  , DOI: ( /j.bpj )
Copyright © 2015 Biophysical Society Terms and Conditions

8. Figure 7
(A) Direct numerical estimation of the torque, Γ, for different f and σ for a 16 kbp molecule. (Inset) At low forces ( f=0.25 pN), our estimation of Cs, which is proportional to the slope of Γ(σ) (44), is consistent with the experimental torques of Mosconi et al. (11). Discrepancies in (B) between experiments and simulations for the estimation of Cs at f<0.5 pN are thus likely to be due to a too small number of experimental points. (B) The effective torsional modulus, Cs, as a function of f. Simulations were run using C=86 nm. The solid blue line represents the large force expansion by Moroz and Nelson (44) using C=86 nm. Dashed blue lines show the same expansions but using C=80 nm (lower curve) and C=100 nm (upper curve), hence justifying the use of C=86 nm. The bars indicate the mean ± SE. To see this figure in color, go online.
Biophysical Journal  , DOI: ( /j.bpj )
Copyright © 2015 Biophysical Society Terms and Conditions