Self‐Assembling Systems 2016
DOI: 10.1002/9781119113171.ch3
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Theory and Simulation Studies of Self‐Assembly of Helical Particles

Abstract: While it is possible to control the enantioselective process by using depletion interactions and faceting of the bulding blocks [5], helices are among the natural objects to focus on when dealing with chirality. New functional materials [9] [10] can be produced by exploiting the intrinsic chirality of the helical structures, which are useful in catalysis and demixing of enantiomers [11] [12]. The importance of the helix in nature is unquestionable: proteins, polysaccharides, DNA and RNA, the so called molecule… Show more

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Cited by 2 publications
(5 citation statements)
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References 88 publications
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“…We note that an approach involving the explicit third-order virial contribution to the excess free energy was also implemented with some suc-cess for such systems, albeit under stringent symmetry assumptions. 120,121 It would be interesting to investigate whether its generalisation to configurations of freelyrotating particles may lead to significant improvements over the MPL approximation in our case.…”
Section: Discussionmentioning
confidence: 99%
“…We note that an approach involving the explicit third-order virial contribution to the excess free energy was also implemented with some suc-cess for such systems, albeit under stringent symmetry assumptions. 120,121 It would be interesting to investigate whether its generalisation to configurations of freelyrotating particles may lead to significant improvements over the MPL approximation in our case.…”
Section: Discussionmentioning
confidence: 99%
“…In this phase, particles are best packed when each helix interacts with its like-chiral neighbors through the same zero interaction phase, and the system stays in this in-plane liquid crystal state before transforming to crystalline states at very high pressure, as indicated by the increase of ψ 6 BO in Figure f. This chiral liquid crystal phase (also named as screw liquid crystal) has recently been explored extensively both experimentally and theoretically. …”
Section: Resultsmentioning
confidence: 99%
“…The behavior of d ij ( z i / j ) is similar to d ij (ϕ i / j ); thus it is not shown. Because of such complex anisotropic interactions between the helices, general analytical overlap-checking algorithms between two helices are currently unavailable, and helices can only be modeled as connected hard spheres. The computational cost thus scales up dramatically with the increase of coarse-grained degree and the length of helices. In the Methods section, we rigorously prove that for the specific case of parallel helices, as a result of screw axis symmetry of helices, d ij can be written as a periodic function of a single variable ΔΨ ij , which is defined as the interaction phase : where C i / j is the chirality sign of the helices i / j ( C R = 1, C L = −1).…”
Section: Resultsmentioning
confidence: 99%
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