Computational methods for electromagnetic phenomena : electrostatics in solvation, scattering, and electron transport / Wei Cai.
By: Cai, WeiMaterial type: TextPublisher: Cambridge : Cambridge University Press, 2013Edition: 1st edDescription: xviii, 444 pages : illustrations ; 26 cmContent type: text Media type: unmediated Carrier type: volumeISBN: 9781107021051Subject(s): Electromagnetism -- Mathematical models | Electrostatics | Electron transport | TECHNOLOGY & ENGINEERING / Engineering (General)DDC classification: 537.0151 LOC classification: QC760.4.M37 | C35 2013Other classification: TEC009000 Online resources: Cover image | Contributor biographical information | Publisher description | Table of contents only
|Item type||Current location||Call number||Status||Date due||Barcode|
|Books||Centeral Library Second Floor - Engineering & Architecture||537.0151 C.W.C 2013 (Browse shelf)||Available||21746|
|Books||Centeral Library Second Floor - Engineering & Architecture||537.0151 C.W.C 2013 (Browse shelf)||Available||21747|
Includes bibliographical references and index.
Machine generated contents note: Part I. Electrostatics in Solvations: 1. Dielectric constant and fluctuation formulae for molecular dynamics; 2. Poisson-Boltzmann electrostatics and analytical approximations; 3. Numerical methods for Poisson-Boltzmann equations; 4. Fast algorithms for long-range interactions; Part II. Electromagnetic Scattering: 5. Maxwell equations, potentials, and physical/artificial boundary conditions; 6. Dyadic Green's functions in layered media; 7. High order methods for surface electromagnetic integral equations; 8. High order hierarchical Nedelec edge elements; 9. Time domain methods - discontinuous Galerkin method and Yee scheme; 10. Computing scattering in periodic structures and surface plasmons; 11. Solving Schrödinger equations in waveguides and quantum dots; Part III. Electron Transport: 12. Quantum electron transport in semiconductors; 13. Non-equilibrium Green's function (NEGF) methods for transport; 14. Numerical methods for Wigner quantum transport; 15. Hydrodynamics electron transport and finite difference methods; 16. Transport models in plasma media and numerical methods.
"A unique and comprehensive graduate text and reference on numerical methods for electromagnetic phenomena, from atomistic to continuum scales, in biology, micro-to-optical waves, photonics, nanoelectronics and plasmas. The state-of-the-art numerical methods described include: Statistical fluctuation formula for the dielectric constant; Particle-Mesh-Ewald, Fast-Multipole-Method and image-based reaction field method for long-range interactions; High order singular/hypersingular (Nyström collocation/Galerkin) boundary and volume integral methods in layered media for Poisson-Boltzmann electrostatics, electromagnetic wave scattering and electron density waves in quantum dots; Absorbing and UPML boundary conditions; High order hierarchical Nédélec edge elements; High order discontinuous Galerkin (DG) and Yee finite difference time-domain methods; Finite element and plane wave frequency-domain methods for periodic structures; Generalized DG beam propagation method for optical waveguides; NEGF(Non-equilibrium Green's function) and Wigner kinetic methods for quantum transport; High order WENO and Godunov and central schemes for hydrodynamics transport; Vlasov-Fokker-Planck and PIC and constrained MHD transport in plasmas"--