数理科学セミナー: Classification of Hamiltonians in neighborhoods of band crossings in terms of the theory of singularities

開催日時
2017年   7月 25日 17時 00分 ~ 2017年   7月 25日 18時 30分
場所
理学部3号館3-307号室 / Faculty of Science Build. #3 Room 307
講演者
寺本 央 (電子科学研究所) / Hiroshi Teramoto (RIES/Dept. of Math.)
 
Abstract : We classify two-by-two traceless Hamiltonians depending smoothly on a three-dimensional Bloch wavenumber and having a band crossing at the origin of the wavenumber space [1]. Recently these Hamiltonians attract much interest among researchers in the condensed matter field since they are found to be effective Hamiltonians describing the band structure of the exotic materials such as Weyl semimetals. In this classification, we regard two such Hamiltonians as equivalent if there are appropriate special unitary transformation of degree 2 and diffeomorphism in the wavenumber space fixing the origin such that one of the Hamiltonians transforms to the other [1,2]. Based on the equivalence relation, we obtain a complete list of classes up to a codimension 7. For each Hamiltonian in the list, we calculate multiplicity and Chern number, which are invariant under an arbitrary smooth deformation of the Hamiltonian. We also construct a universal unfolding for each Hamiltonian and demonstrate how they can be used for bifurcation analysis of band crossings.

In this talk, we present our classification along with some basics of singularity theory and how we can use it in physics. If time allows, we talk about how we can take symmetries of materials into account.

References:
[1] H. Teramoto, K. Kondo, S. Izumiya, M. Toda and T. Komatsuzaki, Classification of Hamiltonians in neighborhoods of band crossings in terms of the theory of singularities, to be appeared in J. Math. Phys..
[2] S. Izumiya, M. Takahashi, H. Teramoto, Geometric equivalence among smooth section germs of vector bundles with respect to structure groups, in preparation.


関連項目

研究集会・セミナー・集中講義の一覧へ