Developing fractional quantum Hall states at even-denominator fillings 1/6 and 1/8
Abstract
In the extreme quantum limit, when the Landau level filling factor <1, the dominant electron-electron interaction in low-disorder two-dimensional electron systems leads to exotic many-body phases. The ground states at even-denominator = 1/2 and 1/4 are typically Fermi seas of composite fermions carrying two and four flux quanta, surrounded by the Jain fractional quantum Hall states (FQHSs) at odd-denominator fillings =p/(2p1) and =p/(4p1), where p is an integer. For < 1/5, an insulating behavior, which is generally believed to signal the formation of a pinned Wigner crystal, is seen. Our experiments on ultrahigh-quality, dilute, GaAs two-dimensional electron systems reveal developing FQHSs at =p/(6p1) and =p/(8p1), manifested by magnetoresistance minima superimposed on the insulating background. In stark contrast to = 1/2 and 1/4, however, we observe a pronounced, sharp minimum in magnetoresistance at = 1/6 and a somewhat weaker minimum at = 1/8, suggesting developing FQHSs, likely stabilized by the pairing of composite fermions that carry six and eight flux quanta. Our results signal the unexpected entry, in ultrahigh-quality samples, of FQHSs at even-denominator fillings 1/6 and 1/8, which are likely to harbor non-Abelian anyon excitations.
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