Many fractional quantum Hall wave functions are known to be unique highest-density zero modes of certain “pseudopotential” Hamiltonians. While a systematic method to construct such parent Hamiltonians has been available for the infinite plane and sphere geometries, the generalization to manifolds where relative angular momentum is not an exact quantum number, i.e., the cylinder or torus, remains an open problem. This is particularly true for non-Abelian states, such as the Read-Rezayi series (in particular, the Moore-Read and Read-Rezayi Z 3 states) and more exotic nonunitary (Haldane-Rezayi and Gaffnian) or irrational (Haffnian) states, whose parent Hamiltonians involve complicated many-body interactions. Here, we develop a universal geometric approach for constructing pseudopotential Hamiltonians that is applicable to all geometries. Our method straightforwardly generalizes to the multicomponent SU ( n ) cases with a combination of spin or pseudospin (layer, subband, or valley) degrees of freedom. We demonstrate the utility of our approach through several examples, some of which involve non-Abelian multicomponent states whose parent Hamiltonians were previously unknown, and we verify the results by numerically computing their entanglement properties.
展开▼
机译:众所周知,许多分数量子霍尔波函数是某些“伪势”哈密顿量的唯一最高密度零模。虽然有一种构造这种母哈密顿量的系统方法可用于无限的平面和球面几何形状,但推广到相对角动量不是精确的量子数(即圆柱体或圆环面)的流形仍然是一个未解决的问题。这对于非阿贝尔州尤其如此,例如Read-Rezayi系列(特别是Moore-Read和Read-Rezayi Z 3个州)以及更奇特的非unit一族(Haldane-Rezayi和Gaffnian)或非理性(Haffnian)州,其父母汉密尔顿主义者涉及复杂的多体相互作用。在这里,我们开发了一种通用的几何方法来构造适用于所有几何的伪势哈密顿量。我们的方法将自旋或伪自旋(层,子带或谷)自由度的组合直接推广到多分量SU(n)情况。我们通过几个示例演示了该方法的实用性,其中一些示例涉及其父哈密顿量以前未知的非阿贝尔多分量状态,并且我们通过数值计算其纠缠特性来验证结果。
展开▼
