Helical nanofilaments of bent-core liquid crystals with a second twist

Zhang, C.; Diorio, Nicholas; Lavrentovich, Oleg D.; Jákli, Antal

doi:10.1038/ncomms4302

Cited by 63 publications

(60 citation statements)

References 30 publications

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“…In calculating this, we utilised that ΔI = I ¼ 1 À e ÀQ:Δh , where Q is the total elastic scattering cross section. [25] For all of our samples, ΔI/I < 0.3, so ΔI=I % Q:Δh. Previous measurements on similar layered bent-core materials with presumably similar Q values provided that ΔI=I % 0:25 corresponds to about Δh~30 nm.…”

Section: Resultsmentioning

confidence: 99%

“…Previous measurements on similar layered bent-core materials with presumably similar Q values provided that ΔI=I % 0:25 corresponds to about Δh~30 nm. [25] 3. Discussion These cryo-TEM results show very different behaviour from that we observed previously on an other B7-type material, [22] where only the a-spacing (with smaller value than in bulk) was visible.…”

Section: Resultsmentioning

confidence: 99%

“…Previous studies on other thermotropic bent-core LC films carried out with this instrument demonstrated the possibility to visualise smectic layers with resolution better than 0.7 nm. [22,[24][25][26] The LC samples were dissolved in chloroform, and the solution was dispersed on a TEM grid coated with plasma-treated continuous carbon film. After evaporation of the chloroform, the thickness of the LC films was between 50 and 100 nm.…”

Section: Introductionmentioning

confidence: 99%

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Nanoscale structures of polarisation-modulated bent-core materials in thin films

et al. 2015

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We present small angle X-ray and cryogenic transmission electron microscopy (cryo-TEM) studies of three nitrosubstituted (n-OPIMB-NO 2 , n = 7, 9 and16) bent-core liquid crystals (LCs) that form peculiar optical patterns known as B7 textures. Small angle X-ray scattering studies show two periodicities between a~3.4-4.7 nm and b X~9 -16 nm. Cryo-TEM images of about 100 nm thick films do not show the a-periodicity, but only periodicities b T that are about 1 nm smaller than b X measured in bulk by X-ray. Additionally, an intensity modulation with a period c~100-200 nm is observed. These observations can be explained by a B1-type structure, where there are half-layer step discontinuities at the boundaries of the splay domains, and where the molecules are everywhere normal to the substrate.

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Section: Resultsmentioning

confidence: 99%

Section: Resultsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Nanoscale structures of polarisation-modulated bent-core materials in thin films

et al. 2015

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“…9(a)), whose width and thickness (stack height) are finite and in the range of 10s of nm, while the length of nanoribbons is unlimited. 121,122 The self-limitation of width can be understood by considering the "high chirality" limit 123 where K 2 is sufficiently large to lock the director into the preferred cholesteric twist, n(z) = cos(q 0 z), sin(q 0 z), 0 , where z is the pitch axis of the helicoid andŵ = − sin(q 0 z), cos(q 0 z), 0) is the direction along its width. While it is possible to align the director and the normal along the central pitch axis of helicoid, frustration prevents their global alignment and N − n ≃ q 0 x wẑ , where x w ∈ [−w/2, +w/2] is the position along the width.…”

Section: Chirality Vs Layer Formation In 2d Assembliesmentioning

confidence: 99%

Perspective: Geometrically frustrated assemblies

Grason

2016

The Journal of Chemical Physics

112

143

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This perspective will overview an emerging paradigm for self-organized soft materials, geometrically frustrated assemblies, where interactions between self-assembling elements (e.g., particles, macromolecules, proteins) favor local packing motifs that are incompatible with uniform global order in the assembly. This classification applies to a broad range of material assemblies including self-twisting protein filament bundles, amyloid fibers, chiral smectics and membranes, particle-coated droplets, curved protein shells, and phase-separated lipid vesicles. In assemblies, geometric frustration leads to a host of anomalous structural and thermodynamic properties, including heterogeneous and internally stressed equilibrium structures, self-limiting assembly, and topological defects in the equilibrium assembly structures. The purpose of this perspective is to (1) highlight the unifying principles and consequences of geometric frustration in soft matter assemblies; (2) classify the known distinct modes of frustration and review corresponding experimental examples; and (3) describe outstanding questions not yet addressed about the unique properties and behaviors of this broad class of systems. Published by AIP Publishing. [http://dx

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“…This generalization is necessary in media such as a cholesteric LC [39][40][41][42] and a TN cell of small thickness and other media with a sharp spatial variation of dielectric characteristics at the wavelength scale [43][44][45][46]. However, Jones formalism gives a good approximation when the thickness of the TN cell is several times larger than the wavelength and the dielectric constant varies smoothly.…”

Section: Introductionmentioning

confidence: 99%

Geometric phase ando-mode blueshift in a chiral anisotropic medium inside a Fabry-Pérot cavity

et al. 2015

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Anomalous spectral shift of transmission peaks is observed in a Fabry-Pérot cavity filled with a chiral anisotropic medium. The effective refractive index value resides out of the interval between the ordinary and the extraordinary refractive indices. The spectral shift is explained by contribution of a geometric phase. The problem is solved analytically using the approximate Jones matrix method, numerically using the accurate Berreman method, and geometrically using the generalized Mauguin-Poincaré rolling cone method. The o-mode blueshift is measured for a 4-methoxybenzylidene-4 -n-butylaniline twisted-nematic layer inside the Fabry-Pérot cavity. The twist is electrically induced due to the homeoplanar-twisted configuration transition in an ionic-surfactant-doped liquid crystal layer. Experimental evidence confirms the validity of the theoretical model.

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Helical nanofilaments of bent-core liquid crystals with a second twist

Cited by 63 publications

References 30 publications

Nanoscale structures of polarisation-modulated bent-core materials in thin films

Nanoscale structures of polarisation-modulated bent-core materials in thin films

Perspective: Geometrically frustrated assemblies

Geometric phase ando-mode blueshift in a chiral anisotropic medium inside a Fabry-Pérot cavity

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