Topological invariant responsible for the integer QHE and non-commutative geometry

Abstract

We consider a wide class of 2D tight - binding models of solid state physics. These models are, in the most general case, non - homogeneous. The topological invariant N3 responsible for the quantization of the Hall conductivity, for the specific case of the integer quantum Hall effect in 2D, is expressed through the Wigner transformation of the two-point electron Matsubara Green function. We express this invariant as a pairing of the element of the K-1 group (generated by the Green function) with the specific element of the cyclic cohomology group HC3. According to a set of local index theorems the values of N3 can be shown to be integer for a limited class of tight - binding models.