Zk(r)-Algebras, FQH Ground States, and Invariants of Binary Forms

Abstract

A prominent class of model FQH ground states is those realized as correlation functions of Zk(r)-algebras. In this paper, we study the interplay between these algebras and their corresponding wavefunctions. In the hopes of realizing these wavefunctions as a unique densest zero energy state, we propose a generalization for the projection Hamiltonians. Finally, using techniques from invariants of binary forms, an ansatz for computation of correlations (z1)·s(z2k) Πi<j(zi-zj)2r/k is devised. We provide some evidence that, at least when r=2, our proposed Hamiltonian realizes Zk(2)-wavefunctions as a unique ground state.