Self consistent solution of a multi-band k.p Hamiltonian and Poisson's equation using a plane wave expansion method

机译：使用平面波扩建方法自一致的多频段K.P Hamiltonian和Poisson方程的解决方案

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Conventionally finite difference methods are used to solve a multi-band k.p Hamiltonian in quantum well and heterostructure systems where a self consistent solution of Poisson's equation is important, due e.g. to the presence of a Type II band line-up, with electrons and holes confined in separate layers. Following similar methods to density functional theory we describe a plane wave expansion method to efficiently solve a multi-band k.p Hamiltonian self consistently, including a fast Fourier space solution of Poisson's equation. We demonstrate the efficiency of the method by considering the potential in an InGaAs/InGaAsP/InP 1.5 /spl mu/m laser.

机译：传统上有限差分方法用于在量子阱和异质结构系统中解决多频段K.P Hamiltonian，其中泊松方程的自一致性解决方案是重要的，因此对于II型带线的存在，电子和孔限制在单独的层中。在类似的密度函数理论的方法之后，我们描述了一种平面波扩展方法，以有效地始终如一地解决多频段K.P Hamiltonian自我，包括泊松方程的快速傅里叶空间解决方案。我们通过考虑InGaAs / InGaAsp / InP 1.5 / SPL MU / M激光器的潜力来证明该方法的效率。

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《International Conference on Numerical Simulation of Optoelectronic Devices》|2005年||共2页
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Healy S.B.; OReilly E.P.;
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中图分类自动化技术、计算机技术;
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III-V semiconductors; Poisson equation; density functional theory; fast Fourier transforms; finite difference methods; gallium arsenide; gallium compounds; indium compounds; k.p calculations; quantum well lasers; 1.5 micron; InGaAs-InGaAsP-InP; InGaAs-InGaAsP-InP la;

机译：III-V半导体;泊松方程;密度函数理论;快速傅里叶变换;有限差异方法;砷化镓;镓化合物;铟化合物;kp计算;量子阱激光;1.5微米;Ingaas-IngaAsp-inp;Ingaas-IngaAsp-Inp LA.;

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7. Solution of Poisson's equation for finite systems using plane-wave methods [O] . Castro, Alberto, Rubio, Angel, Stott, M. J. 2014

机译：用平面波方法求解有限系统的泊松方程

Self consistent solution of a multi-band k.p Hamiltonian and Poisson's equation using a plane wave expansion method

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