03236nam 2200649Ia 450 991078406420332120200520144314.01-281-12173-89786611121730981-277-061-5(CKB)1000000000334126(EBL)312345(OCoLC)476099822(SSID)ssj0000194691(PQKBManifestationID)11166565(PQKBTitleCode)TC0000194691(PQKBWorkID)10240563(PQKB)11502365(MiAaPQ)EBC312345(WSP)00006441(Au-PeEL)EBL312345(CaPaEBR)ebr10188748(CaONFJC)MIL112173(OCoLC)935264144(PPN)140761462(EXLCZ)99100000000033412620070608d2007 uy 0engur|n|---|||||txtccrLow-dimensional nanoscale systems on discrete spaces[electronic resource] /Erhardt Papp, Codrutza MicuSingapore ;Hackensack, NJ World Scientificc20071 online resource (277 p.)Description based upon print version of record.981-270-638-0 Includes bibliographical references (p. 241-257) and index.Preface; Contents; 1. Lattice Structures and Discretizations; 2. Periodic Quasiperiodic and Confinement Potentials; 3. Time Discretization Schemes; 4. Discrete Schrodinger Equations. Typical Examples; 5. Discrete Analogs and Lie-Algebraic Discretizations. Realizations of Heisenberg-Weyl Algebras; 6. Hopping Hamiltonians. Electrons in Electric Field; 7. Tight Binding Descriptions in the Presence of the Magnetic Field; 8. The Harper-Equation and Electrons on the 1D Ring; 9. The q-Symmetrized Harper Equation; 10. Quantum Oscillations and Interference Effects in Nanodevices; 11. ConclusionsAppendix A Dealing with polynomials of a discrete variableAppendix B The functional Bethe-ansatz solution; Bibliography; IndexThe area of low-dimensional quantum systems on discrete spaces is a rapidly growing research field lying at the interface between quantum theoretical developments, like discrete and q-difference equations, and tight binding superlattice models in solid-state physics. Systems on discrete spaces are promising candidates for applications in several areas. Indeed, the dynamic localization of electrons on the 1D lattice under the influence of an external electric field serves to describe time-dependent transport in quantum wires, linear optical absorption spectra, and the generation of higher harmoQuantum theorySchrödinger equationNanoelectromechanical systemsQuantum theory.Schrödinger equation.Nanoelectromechanical systems.530.12Papp E1539335Micu Codrutza1539336MiAaPQMiAaPQMiAaPQBOOK9910784064203321Low-dimensional nanoscale systems on discrete spaces3790213UNINA