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arxiv: 2112.09263 · v1 · pith:FKPUGZQR · submitted 2021-12-17 · math.AP

Global small solutions to heat conductive compressible nematic liquid crystal system: smallness on a scaling invariant quantity

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classification math.AP
keywords inftynablasystemcompressiblecrystalglobalheatinvariant
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In this paper, we consider the Cauchy problem to the three dimensional heat conducting compressible nematic liquid crystal system in the presence of vacuum and with vacuum far fields. Global well-posedness of strong solutions is established under the condition that the scaling invariant quantity $ (\|\rho_0\|_\infty+1)\big[\|\rho_0\|_3+(\|\rho_0\|_\infty+1)^2(\|\sqrt{\rho_0}u_0\|_2^2+ \|\nabla d_0\|_2^2)\big] \big[\|\nabla u_0\|_2^2+(\|\rho_0\|_\infty+1)(\|\sqrt{\rho_0}E_0\|_2^2 + \|\nabla^2 d_0\|_2^2)\big]$ is sufficiently small with the smallness depending only on the parameters appeared in the system.

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