Propagation of a hole on a Neel background
E.Mueller-Hartmann, C.I.Ventura
TL;DR
This paper introduces a new resummation approach to analyze the motion of a hole on a Neel antiferromagnetic background, providing near-quantitative insights across different dimensions and aligning well with recent numerical results.
Contribution
A novel resummation method for the Nagaoka expansion that improves understanding of hole propagation in various lattice dimensions.
Findings
Density of states mostly matches retraceable-path approximation.
No band tails extending to Nagaoka energy in studied lattices.
Good agreement with recent Lanczos spectra decoding results.
Abstract
We analyze the motion of a single hole on a N\'eel background, neglecting spin fluctuations. Brinkman and Rice studied this problem on a cubic lattice, introducing the retraceable-path approximation for the hole Green's function, exact in a one-dimensional lattice. Metzner et al. showed that the approximationalso becomes exact in the infinite-dimensional limit. We introduce a new approach to this problem by resumming the Nagaoka expansion of the propagator in terms of non-retraceable skeleton-paths dressed by retraceable-path insertions. This resummation opens the way to an almost quantitative solution of the problemin all dimensions and, in particular sheds new light on the question of the position of the band-edges. We studied the motion of the hole on a double chain and a square lattice, for which deviations from the retraceable-path approximation are expected to be most pronounced.…
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