Dispersion relations of periodic quantum graphs associated with Archimedean tiling (I)
| Autor: | Yu-Chen Luo, Chun-Kong Law, Eduardo O. Jatulan |
|---|---|
| Rok vydání: | 2018 |
| Předmět: |
Statistics and Probability
Square tiling Computation Truncated trihexagonal tiling Trihexagonal tiling General Physics and Astronomy Statistical and Nonlinear Physics 34B45 34L05 82D25 Combinatorics Mathematics - Spectral Theory Truncated hexagonal tiling Modeling and Simulation Quantum graph Dispersion relation FOS: Mathematics Spectral Theory (math.SP) Mathematical Physics Mathematics |
| DOI: | 10.48550/arxiv.1809.09581 |
| Popis: | There are totally 11 kinds of Archimedean tiling for the plane. Applying the Floquet-Bloch theory, we derive the dispersion relations of the periodic quantum graphs associated with a number of Archimedean tiling, namely the triangular tiling {$(3^6)$}, the elongated triangular tiling {$(3^3,4^2)$}, the trihexagonal tiling {$(3,6,3,6)$} and the truncated square tiling {$(4,8^2)$}. The derivation makes use of characteristic functions, with the help of the symbolic software Mathematica. The resulting dispersion relations are surprisingly simple and symmetric. They show that in each case the spectrum is composed of point spectrum and an absolutely continuous spectrum. We further analyzed on the structure of the absolutely continuous spectra. Our work is motivated by the studies on the periodic quantum graphs associated with hexagonal tiling in \cite{KP} and \cite{KL}. Comment: 33 pages, 5 figures, 1 table |
| Databáze: | OpenAIRE |
| Externí odkaz: |
|