Almost global well-posedness of 2-D Ericksen-Leslie's hyperbolic liquid crystal model for small data

Abstract

This article is devoted to the two dimensional simplified Ericksen-Leslie's hyperbolic system for incompressible liquid crystal model, where the direction d of liquid crystal molecules satisfies a wave map equation with an acoustical metric. We established the almost global well-posedness for small and smooth initial data near the constant equilibrium. Our proof relies on the idea of vector-field method and ghost weight method. There are two key ingredients in our proof: (i) Inspired by the gauge theory in Tataru Tataru,Tataru05, we reformulate the wave map equation into a free wave equation with acoustical metric, where the nonlinearity is annihilated due to the geometry of S1; (ii) Motivated by the ghost weight method in Alinhac A01, we introduce a new and important ``good unknown", the velocity u, which provides the additional dissipation u/ t-r∈ L2tL2x. These new observations turn out to be extremely crucial in resolving the system in low dimensions.