The Chern character of the Laughlin vector bundle in the Fractional Quantum Hall Effect

Abstract

We begin by explaining how a physical problem of studying the quantum Hall effect on a closed surface C leads, via Laughlin's approach, to a mathematical question of describing the rank and the first Chern class of a particular vector bundle on the Picard group Picg(C). Then we formulate and solve the problem mathematically, proving several important conjectures made by physicists, in particular the Wen-Niu topological degeneracy conjecture and the Wen-Zee shift formula. Let C be a closed Riemann surface of genus~g and SNC its Nth symmetric power. The product C × Picd(C) carries a universal line bundle. On the product CN × Picd(C) we consider the product of N pull-backs of this universal line bundle and twist it by a power of the diagonal on CN. The resulting line bundle descends onto SNC × Picd(C). Its push-forward (as a sheaf) to Picd(C) is a vector bundle that we call Laughlin's vector bundle. We determine all the Chern characters of the Laughlin vector bundle via a Grothendieck-Riemann-Roch calculation.