schrödingerequatie

Schrödingerequatie is a fundamental equation in non-relativistic quantum mechanics that describes how the quantum state of a system evolves in time. It governs the evolution of the wavefunction ψ, a complex-valued function of position and time, from which probabilities of measurement outcomes are derived.

There are two common forms: the time-dependent and time-independent Schrödingerequatie. For a single non-relativistic particle of

The Hamiltonian operator H encodes total energy. The equation is linear, yielding deterministic evolution of ψ given

In the Schrödingerequatie, states evolve in time while operators may be time-independent; the equation relates to

Relativistic generalizations include the Dirac equation for spin-1/2 particles and the Klein-Gordon equation for spinless particles.