Generalized effective-potential Landau theory for a tunable state-dependent hexagonal optical lattice
Abstract
We analytically study the ground-state phase diagrams of ultracold bosons with various values of the effective magnetic quantum number m in a state-dependent hexagonal optical lattice by using the generalized effective-potential Landau theory, where the site-offset energy between the two triangular sublattice A and B is tunable. Our analytical calculations of third-order corrections are in reasonably good agreement with the previous cluster Gutzwiller calculations. Furthermore, we reveal the reason why the regions of the Mott lobes (n,n) in phase diagrams for m=0.02 are unexpectedly expanded with increasing J/U in deep lattice.
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