Soft-mode turbulence in electrohydrodynamic convection of a homeotropically aligned nematic layer

Hidaka, Yoshiki; Huh, Jong–Hoon; Hayashi, Ken; Kai, Shoichi; Tribelsky, Michael I.

doi:10.1103/physreve.56.r6256

Cited by 55 publications

(34 citation statements)

References 21 publications

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“…There are two types of SMT pattern; oblique rolls in f < f L and normal rolls in f > f L , where f L denotes the Lifshitz frequency [9,10]. The interaction between the convective and Goldstone modes are different between oblique and normal rolls [45,46]; the convective wave vector in SMT tend to become parallel to the C-director in the normal roll and oblique in the oblique roll.…”

Section: Soft-mode Turbulencementioning

confidence: 99%

“…With further increasing V , the electrohydrodynamic convection occurs at the electroconvective threshold voltage V c . The nonlinear coupling between the convective mode q(x, y) and the Nambu-Goldstone one C(x, y) induces spatially and temporally disordered pattern called soft-mode turbulence (SMT) [9][10][11]. SMT is regarded as an experimentally observed spatiotemporal chaos.…”

Section: Soft-mode Turbulencementioning

confidence: 99%

“…An experimentally obtained spatiotemporal chaos in homeotropically aligned nematic liquid crystals is soft-mode turbulence (SMT) [9][10][11], induced by nonlinear coupling between the local convective mode and global Nambu-Goldstone one (see Appendix for details). SMT has a characteristic spatial structure.…”

Section: Introductionmentioning

confidence: 99%

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Compressed exponential relaxation as superposition of dual structure in pattern dynamics of nematic liquid crystals

Narumi

Nugroho

Yoshitani

et al. 2013

AIP Conference Proceedings

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Soft-mode turbulence (SMT) is the spatiotemporal chaos observed in homeotropically aligned nematic liquid crystals, where non-thermal fluctuations are induced by nonlinear coupling between the NambuGoldstone and convective modes. The net and modal relaxations of the disorder pattern dynamics in SMT have been studied to construct the statistical physics of nonlinear nonequilibrium systems. The net relaxation dynamics is well-described by a compressed exponential function and the modal one satisfies a dual structure, dynamic crossover accompanied by a breaking of time-reversal invariance. Because the net relaxation is described by a weighted mean of the modal ones with respect to the wave number, the compressed-exponential behavior emerges as a superposition of the dual structure. Here, we present experimental results of the power spectra to discuss the compressed-exponential behavior and the dual structure from a viewpoint of the harmonic analysis. We also derive a relationship of the power spectra from the evolution equation of the modal autocorrelation function. The formula will be helpful to study non-thermal fluctuations in experiments such as the scattering methods.

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Section: Soft-mode Turbulencementioning

confidence: 99%

Section: Soft-mode Turbulencementioning

confidence: 99%

See 1 more Smart Citation

Compressed exponential relaxation as superposition of dual structure in pattern dynamics of nematic liquid crystals

Narumi

Nugroho

Yoshitani

et al. 2013

AIP Conference Proceedings

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“…The time evolution of the patterns was studied as a function of frequency and the dimensionless control parameter For quantitative characterization of the pattern dynamics a local autocorrelation function C(x,t) of the intensity along the line I(x,t) was computed according to the formula ( ) ∝ ε at small ω, which indicates a direct transition to STC from the homogeneous state [15]. At higher ω (above ω*) the structure is stationary at onset up to ε = 0.05.…”

Section: Pattern Dynamics At Thresholdmentioning

confidence: 99%

“…Consequently one obtains spatio-temporal chaos (STC), often called soft mode turbulence [6], already at the onset of EC. This type of chaotic behavior has been devoted considerable attention to in recent years, both theoretically [5] and experimentally [7][8] [9].…”

Section: Introductionmentioning

confidence: 99%

Square Patterns and their Dynamics in Electroconvection

Kochowska

Éber

Buka

et al. 2005

Molecular Crystals and Liquid Crystals

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Characteristics of electroconvection patterns have been studied in a homeotropic nematic liquid crystal with unusual combination of material parameters (negative conductivity and positive dielectric permittivity anisotropies). The morphological phase diagram has been explored. Two distinct types of pattern dynamics have been detected: losing autocorrelation of the pattern during temporal evolution due to spatio-temporal chaos at onset and domain coarsening of a grid pattern.

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Light‐Driven Electrohydrodynamic Instabilities in Liquid Crystals

Zhan

Schenning

Broer

et al. 2018

Adv Funct Materials

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Soft-mode turbulence in electrohydrodynamic convection of a homeotropically aligned nematic layer

Cited by 55 publications

References 21 publications

Compressed exponential relaxation as superposition of dual structure in pattern dynamics of nematic liquid crystals

Compressed exponential relaxation as superposition of dual structure in pattern dynamics of nematic liquid crystals

Square Patterns and their Dynamics in Electroconvection

Light‐Driven Electrohydrodynamic Instabilities in Liquid Crystals

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