Global strong solutions for non-isothermal compressible nematic liquid crystal flows under a scaling-invariant smallness condition

Abstract

We study the three-dimensional Cauchy problem for a non-isothermal compressible nematic liquid crystal system with far-field vacuum. By deriving refined energy estimates and exploiting the coupled structure of the equations, we establish the global existence and uniqueness of strong solutions, provided that the following scaling-invariant quantity is sufficiently small: (1++1) [\|0\|L3+(2+)(\|0u0\|L22+\|∇ d0\|L22)] [\|∇ u0\|L22+(+1)\|0θ0\|L22 +\|∇2 d0\|L22+\|∇ d0\|L44]. In particular, our result identifies a new scaling-invariant quantity and does not impose additional restrictions on the viscosity coefficients, which improves previous work (Commun. Math. Sci. 21 (2023), 1455--1486).

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