Origin of conical dispersion relations

Authors

  • Sergio A. Hojman

Keywords:

Quantum mechanics, modified Dirac-Kronig-Penney potential, conical dispersion relations

Abstract

A mechanism that produces conical dispersion relations is presented. A Kronig Penney one dimensional array with two different strengths delta function potentials gives rise to both the gap closure and the dispersion relation observed in graphene and other materials. The Schrödinger eigenvalue problem is locally invariant under the infinite dimensional Virasoro algebra near conical dispersion points in reciprocal space, thus suggesting a possible relation to string theory.

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Published

2014-01-01

How to Cite

[1]
S. A. Hojman, “Origin of conical dispersion relations”, Rev. Mex. Fís., vol. 60, no. 5 Sept-Oct, pp. 336–0, Jan. 2014.

Issue

Vol. 60 No. 5 Sept-Oct (2014): Revista Mexicana de Física.

Section

Articles

License

Authors retain copyright and grant the Revista Mexicana de Física right of first publication with the work simultaneously licensed under a CC BY-NC-ND 4.0 that allows others to share the work with an acknowledgement of the work's authorship and initial publication in this journal.