Eigenvalue estimates for bilayer graphene

© 2019, Springer Nature Switzerland AG. Recently, Ferrulli–Laptev–Safronov (2016) obtained eigenvalue estimates for an operator associated with bilayer graphene in terms of L q norms of the (possibly non-self-adjoint) potential. They proved that for 1 < q< 4 / 3 all nonembedded eigenvalues lie...

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Bibliographic Details
Main Author: Jean-Claude Cuenin
Format: Other Non-Article Part of Journal/Newspaper
Language:unknown
Published: 2019
Subjects:
Uncategorized
Bilayer graphene
Trigonal warping
Eigenvalue estimates
Complex potentials
Embedded eigenvalues
Science & Technology
Physical Sciences
Physics
Multidisciplinary
Particles & Fields
Mathematical
SCHRODINGER-OPERATORS
BOUNDS
INEQUALITIES
DIRAC
Mathematical Physics
Atomic
Molecular
Nuclear
Particle and Plasma Physics
laptev
Online Access:https://figshare.com/articles/journal_contribution/Eigenvalue_estimates_for_bilayer_graphene/13227638
Description
Summary:© 2019, Springer Nature Switzerland AG. Recently, Ferrulli–Laptev–Safronov (2016) obtained eigenvalue estimates for an operator associated with bilayer graphene in terms of L q norms of the (possibly non-self-adjoint) potential. They proved that for 1 < q< 4 / 3 all nonembedded eigenvalues lie near the edges of the spectrum of the free operator. In this note, we prove this for the larger range 1 ≤ q≤ 3 / 2. The latter is optimal if embedded eigenvalues are also considered. We prove similar estimates for a modified bilayer operator with so-called trigonal warping term. Here, the range for q is smaller since the Fermi surface has less curvature. The main tool is new uniform resolvent estimates that may be of independent interest and is collected in an appendix (in greater generality than needed).

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