Thesis
Order reconstruction and solution landscapes for liquid crystalline systems
- Creator
- Rights statement
- Awarding institution
- University of Strathclyde
- Date of award
- 2023
- Thesis identifier
- T16636
- Person Identifier (Local)
- 201982189
- Qualification Level
- Qualification Name
- Department, School or Faculty
- Abstract
- Liquid crystals are the surprisingly less well known fourth phase of matter, sitting between the familiar solid and liquid phases. These materials combine fluidity with orientational and/or positional order, yielding surprising and desirable properties relevant for use in tailor-made applications. In this thesis, we place an emphasis on the study of order reconstruction (OR) solutions. These OR solutions describe polydomain structures i.e., multiple sub-domains separated by domain walls. We study OR solutions within the Landau de Gennes continuum theory for liquid crystals in a reduced, one-dimensional setting relevant for microfluidic problems. OR solutions in nematic liquid crystals are well known, but we demonstrate the existence of OR solutions in the physical settings of ferronematics, and both passive and active nematodynamics, demonstrating the universality of such solutions. This work involves studying coupled systems of non-linear ordinary differential equations, and utilising techniques from the calculus of variations, partial differential equation theory, and asymptotic analysis, to gain insight. We also place significant emphasis on studying solution landscapes i.e., how all critical points (stable and unstable) of an energy functional connect to one another, and this is implemented through advanced numerical methods. In our final chapter, this sheds light on a competition between uniaxiality and biaxiality in cholesteric liquid crystals, and a way to potentially observe biaxiality experimentally.
- Advisor / supervisor
- Majumdar, Apala
- Resource Type
- DOI
Relations
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PDF of thesis T16636 | 2023-06-21 | Public | Download |