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Mathematical problems of nematic liquid crystals: between dynamical and stationary problems

Arghir Zarnescu

2021Philosophical Transactions of the Royal Society A Mathematical Physical and Engineering Sciences21 citationsDOIOpen Access PDF

Abstract

Mathematical studies of nematic liquid crystals address in general two rather different perspectives: that of fluid mechanics and that of calculus of variations. The former focuses on dynamical problems while the latter focuses on stationary ones. The two are usually studied with different mathematical tools and address different questions. The aim of this brief review is to give the practitioners in each area an introduction to some of the results and problems in the other area. Also, aiming to bridge the gap between the two communities, we will present a couple of research topics that generate natural connections between the two areas. This article is part of the theme issue 'Topics in mathematical design of complex materials'.

Topics & Concepts

Liquid crystalTheme (computing)Dynamical systems theoryMathematical problemComputer scienceMathematical modelBridge (graph theory)Mathematical sciencesNatural (archaeology)Mathematical theoryCalculus (dental)Management scienceTheoretical physicsMathematicsPhysicsGeometryEngineeringQuantum mechanicsGeologyStatisticsInternal medicineMedicineDentistryOperating systemPaleontologyOpticsLiquid Crystal Research AdvancementsAdvanced Differential Equations and Dynamical SystemsNonlinear Dynamics and Pattern Formation
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