Order by Disorder and by Doping in Quantum Hall Valley Ferromagnets


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We examine the Si(111) multi-valley quantum Hall system and show that it exhibits an exceptionally rich interplay of broken symmetries and quantum Hall ordering already near integer fillings $ u$ in the range $ u=0-6$. This six-valley system has a large $[SU(2)]^3rtimes D_3$ symmetry in the limit where the magnetic length is much larger than the lattice constant. We find that the discrete ${D}_3$ factor breaks over a broad range of fillings at a finite temperature transition to a discrete nematic phase. As $T rightarrow 0$ the $[SU(2)]^3$ continuous symmetry also breaks: completely near $ u =3$, to a residual $[U(1)]^2times SU(2)$ near $ u=2$ and $4$ and to a residual $U(1)times [SU(2)]^2$ near $ u=1$ and $5$. Interestingly, the symmetry breaking near $ u=2,4$ and $ u=3$ involves a combination of selection by thermal fluctuations known as order by disorder and a selection by the energetics of Skyrme lattices induced by moving away from the commensurate fillings, a mechanism we term order by doping. We also exhibit modestly simpler analogs in the four-valley Si(110) system.

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