Supersymmetric Embedding of the Quantum Hall Matrix Model

Abstract

We develop a supersymmetric extension of the Susskind-Polychronakos matrix theory for the quantum Hall fluids. This is done by considering a system combining two sets of different particles and using both a component field method as well as world line superfields. Our construction yields a class of models for fractional quantum Hall systems with two phases U and D involving, respectively N1 bosons and N2 fermions. We build the corresponding supersymmetric matrix action, derive and solve the supersymmetric generalization of the Susskind-Polychronakos constraint equations. We show that the general U(N) gauge invariant solution for the ground state involves two configurations parameterized by the bosonic contribution k1 (integer) and in addition a new degree of freedom k2, which is restricted to 0 and 1. We study in detail the two particular values of k2 and show that the classical (Susskind) filling factor receives no quantum correction. We conclude that the Polychronakos effect is exactly compensated by the opposite fermionic contributions.

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