The Schrödinger equation forms the foundation of modern quantum mechanics, revealing the fundamental laws governing the motion of matter at the microscopic scale. Its significance in quantum mechanics is comparable to that of Newton’s three laws in classical mechanics and Maxwell’s equations in electromagnetism. The Schrödinger equation also plays a crucial role in various important applications, including plasma physics, nonlinear photonics, water waves, and bimolecular dynamics, among others.

错误:搜索内容不能为空,请输入英文关键词
错误:关键词超出字数限制,请精简
高级检索

Finite Difference Methods for the Schrödinger Equation

  • Zhi-Zhong Sun,
  • Qifeng Zhang,
  • Guang-hua Gao

摘要

The Schrödinger equation forms the foundation of modern quantum mechanics, revealing the fundamental laws governing the motion of matter at the microscopic scale. Its significance in quantum mechanics is comparable to that of Newton’s three laws in classical mechanics and Maxwell’s equations in electromagnetism. The Schrödinger equation also plays a crucial role in various important applications, including plasma physics, nonlinear photonics, water waves, and bimolecular dynamics, among others.