English

Singular Fermi Surfaces II. The Two--Dimensional Case

Mathematical Physics 2009-11-13 v1 Strongly Correlated Electrons math.MP

Abstract

We consider many--fermion systems with singular Fermi surfaces, which contain Van Hove points where the gradient of the band function ke(k)k \mapsto e(k) vanishes. In a previous paper, we have treated the case of spatial dimension d3d \ge 3. In this paper, we focus on the more singular case d=2d=2 and establish properties of the fermionic self--energy to all orders in perturbation theory. We show that there is an asymmetry between the spatial and frequency derivatives of the self--energy. The derivative with respect to the Matsubara frequency diverges at the Van Hove points, but, surprisingly, the self--energy is C1C^1 in the spatial momentum to all orders in perturbation theory, provided the Fermi surface is curved away from the Van Hove points. In a prototypical example, the second spatial derivative behaves similarly to the first frequency derivative. We discuss the physical significance of these findings.

Keywords

Cite

@article{arxiv.0706.1788,
  title  = {Singular Fermi Surfaces II. The Two--Dimensional Case},
  author = {Joel Feldman and Manfred Salmhofer},
  journal= {arXiv preprint arXiv:0706.1788},
  year   = {2009}
}
R2 v1 2026-06-21T08:37:46.844Z