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Main Authors: Pollard, Joseph, Morris, Richard G.
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2412.08866
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author Pollard, Joseph
Morris, Richard G.
author_facet Pollard, Joseph
Morris, Richard G.
contents The Peach-Koehler force between disclination lines was originally formulated in the study of crystalline solids, and has since been adopted to provide a notion of interactions between disclination lines in nematic liquid crystals. Here, we argue that the standard formulation of this interaction force seemingly fails for materials where there is a symmetry-broken ground state, and suggest that this is due to the interaction between disclination lines and merons: non-singular yet non-trivial topological solitons. We examine this in the context of chiral nematic (cholesteric) liquid crystals, which provide a natural setting for studying these interactions due to their energetic preference for meron tubes in the form of double-twist cylinders. Through a combination of theory and simulation we demonstrate that, for sufficiently strong chirality, defects of $+1/2$ winding will change their winding through the emission of a meron line, and that interactions between the merons and defects dominate over defect-defect interactions. Instead of Peach-Koehler framework, we employ a method based on contact topology - the Gray stability theorem - to directly calculate the velocity field of the material. We apply our framework to point defects as well as disclination lines. Our results have implications not just for chiral materials, but also for other phases with modulated ground states, such as the twist-bend and splay-bend nematics.
format Preprint
id arxiv_https___arxiv_org_abs_2412_08866
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Defect Dynamics in Cholesterics: Beyond the Peach-Koehler Force
Pollard, Joseph
Morris, Richard G.
Soft Condensed Matter
The Peach-Koehler force between disclination lines was originally formulated in the study of crystalline solids, and has since been adopted to provide a notion of interactions between disclination lines in nematic liquid crystals. Here, we argue that the standard formulation of this interaction force seemingly fails for materials where there is a symmetry-broken ground state, and suggest that this is due to the interaction between disclination lines and merons: non-singular yet non-trivial topological solitons. We examine this in the context of chiral nematic (cholesteric) liquid crystals, which provide a natural setting for studying these interactions due to their energetic preference for meron tubes in the form of double-twist cylinders. Through a combination of theory and simulation we demonstrate that, for sufficiently strong chirality, defects of $+1/2$ winding will change their winding through the emission of a meron line, and that interactions between the merons and defects dominate over defect-defect interactions. Instead of Peach-Koehler framework, we employ a method based on contact topology - the Gray stability theorem - to directly calculate the velocity field of the material. We apply our framework to point defects as well as disclination lines. Our results have implications not just for chiral materials, but also for other phases with modulated ground states, such as the twist-bend and splay-bend nematics.
title Defect Dynamics in Cholesterics: Beyond the Peach-Koehler Force
topic Soft Condensed Matter
url https://arxiv.org/abs/2412.08866