Chemistry - Lindblad equation

The Lindblad equation or master equation in the Lindblad form is the most general type of master equation allowed by Quantum mechanics to describe non-unitary (dissipative) evolution of the density matrix $ρ$ (such as ensuring normalisation and hermiticity of $ρ$ ). It reads:

$\dot\rho=-{i\over\hbar}[H,\rho]-{1\over\hbar}\sum_{n,m}h_{n,m}\big(\rho L_m L_n+L_m L_n\rho-2L_n\rho L_m\Big)+\mathrm{h.c.}$

where $ρ$ is the density matrix, $H$ is the hamiltonian part, $L m$ are operators defined by the system to model as are the constants $h n, m$ .

The most common Lindblad equation is that describing the damping of a quantum harmonic oscillator, it has $L 0 = a$ , $L_1=a^{\dagger}$ , $h_{0,1}=-(\gamma/2)(\bar n+1)$ , $h_{1,0}=-(\gamma/2)\bar n$ with all others $h n, m = 0$ . Here $\bar n$ is the mean number of excitations in the reservoir damping the oscillator and $γ$ is the decay rate.

Categories: Quantum mechanics | Equations