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Continuum limit for lattice Schr\"odinger operators

Mathematical Physics 2022-03-16 v1 math.MP Spectral Theory

Abstract

We study the behavior of solutions of the Helmholtz equation (Δdisc,hE)uh=fh(- \Delta_{disc,h} - E)u_h = f_h on a periodic lattice as the mesh size hh tends to 0. Projecting to the eigenspace of a characteristic root λh(ξ)\lambda_h(\xi) and using a gauge transformation associated with the Dirac point, we show that the gauge transformed solution uhu_h converges to that for the equation (P(Dx)E)v=g(P(D_x) - E)v = g for a continuous model on Rd{\bf R}^d, where λh(ξ)P(ξ)\lambda_h(\xi) \to P(\xi). For the case of the hexagonal and related lattices, {in a suitable energy region}, it converges to that for the Dirac equation. For the case of the square lattice, triangular lattice, {hexagonal lattice (in another energy region)} and subdivision of a square lattice, one can add a scalar potential, and the solution of the lattice Schr{\"o}dinger equation (Δdisc,h+Vdisc,hE)uh=fh( - \Delta_{disc,h} +V_{disc,h} - E)u_h = f_h converges to that of the continuum Schr{\"o}dinger equation (P(Dx)+V(x)E)u=f(P(D_x) + V(x) -E)u = f.

Keywords

Cite

@article{arxiv.2006.00854,
  title  = {Continuum limit for lattice Schr\"odinger operators},
  author = {Hiroshi Isozaki and Arne Jensen},
  journal= {arXiv preprint arXiv:2006.00854},
  year   = {2022}
}
R2 v1 2026-06-23T15:57:30.825Z