Weak-strong uniqueness of the full coupled Navier-Stokes and Q-tensor system in dimension three

Abstract

In this paper, we study the weak-strong uniqueness for the Leray-Hopf type weak solutions to the Beris-Edwards model of nematic liquid crystals in 3 with an arbitrary parameter ξ∈, which measures the ratio of tumbling and alignment effects caused by the flow. This result is obtained by proposing a new uniqueness criterion in terms of (ΔQ,∇ u) with regularity LtqLxp for 2q+3p=32 and 2≤ p≤ 6, which enables us to deal with the additional nonlinear difficulties arising from the parameter ξ. Compared with the known results, our finding reveals that the criterion of weak-strong uniqueness for ξ 0 is a sub-regime of the one for the corotational case. The associated regularity assumption rises with the nonlinearity of the model. Moreover, we establish the global well-posedness of this model for small initial data in Hs-framework.