Instantons and the spectral function of electrons in the half-filled Landau level

Abstract

We calculate the instanton-anti-instanton action SM M (τ) in the gauge theory of the half-filled Landau level. It is found that SM M (τ) = (3 - η) [ 0 (η) \ τ ]1 / (3 - η) for a class of interactions v ( q) = V0 / qη \ ( 0 ≤ η < 2 ) between electrons. This means that the instanton-anti-instanton pairs are confining so that a well defined `charged' composite fermion can exist. It is also shown that SM M (τ) can be used to calculate the spectral function of electrons from the microscopic theory within a semiclassical approximation. The resulting spectral function varies as e - [ 0 (η) / ω ]1 / ( 2 - η ) at low energies.

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