Nonlinear approximation of 3D smectic liquid crystals: sharp lower bound and compactness
Abstract
We consider the 3D smectic energy Eε ( u) =12∫ 1 ( uz-( ux)2+( uy)22) 2+ ( uxx+uyy)2\,dx\,dy\,dz. The model contains as a special case the well-known 2D Aviles-Giga model. We prove a sharp lower bound on E as 0 by introducing 3D analogues of the Jin-Kohn entropies. The sharp bound corresponds to an equipartition of energy between the bending and compression strains and was previously demonstrated in the physics literature only when the approximate Gaussian curvature of each smectic layer vanishes. Also, for n→ 0 and an energy-bounded sequence \un \ with \|∇ un\|Lp(),\,\|∇ un\|L2(∂ )≤ C for some p>6, we obtain compactness of ∇ un in L2 assuming that xyun has constant sign for each n.
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