Add to ORKGWe present a stochastic theory of charges moving in an electromagnetic field using nonequilibrium quantum field theory. We give a first principles’ derivation of the Abraham-Lorentz-Dirac-Langevin equation which depicts the quantum expectation value for a particle’s trajectory and its stochastic fluctuations by combining the worldline path integral quantization with the Feynman-Vernon influence functional or closed-time-path effective action methods [1, 2]. At lowest order, the equations of motion are approximated by a stochastic Lorentz-Dirac equation
A quantum mechanical form of the Langevin equation is derived from an explicit consideration of the ...
The present work is concerned with the study of a generalized Langevin equation and its link to the ...
Different quantum Langevin equations obtained by coupling a particle to a field are examined. Instab...
We treat a relativistically moving particle interacting with a quantum field from an open system vie...
[[abstract]]We provide a quantum field theoretical derivation of the Abraham-Lorentz-Dirac (ALD) equ...
The longstanding question of how stochastic behaviour arises from deterministic Hamiltonian dynamics...
The general structure of electromagnetic interactions in the so-called response representation of qu...
In the path integral approach we describe evolution of interacting electromagnetic and fermionic fie...
We study the quantum Brownian motion of a charged particle in the presence of a magnetic field. From...
Classical dissipative and fluctuation phenomena have a long history beginning with the experimental ...
Stochastic electrodynamics is the classical electrodynamic theory of interacting point charges which...
The main contribution of this paper is to explain where the imaginary structure comes from in quantu...
The equation describing the stochastic motion of a classical particle in 1+1-dimensional space-time ...
We apply the projection operator method (POM) to φ4 theory and derive both quantum and semiclassical...
A linear quantum Brownian motion model with a general spectral density function is considered. In th...
A quantum mechanical form of the Langevin equation is derived from an explicit consideration of the ...
The present work is concerned with the study of a generalized Langevin equation and its link to the ...
Different quantum Langevin equations obtained by coupling a particle to a field are examined. Instab...
We treat a relativistically moving particle interacting with a quantum field from an open system vie...
[[abstract]]We provide a quantum field theoretical derivation of the Abraham-Lorentz-Dirac (ALD) equ...
The longstanding question of how stochastic behaviour arises from deterministic Hamiltonian dynamics...
The general structure of electromagnetic interactions in the so-called response representation of qu...
In the path integral approach we describe evolution of interacting electromagnetic and fermionic fie...
We study the quantum Brownian motion of a charged particle in the presence of a magnetic field. From...
Classical dissipative and fluctuation phenomena have a long history beginning with the experimental ...
Stochastic electrodynamics is the classical electrodynamic theory of interacting point charges which...
The main contribution of this paper is to explain where the imaginary structure comes from in quantu...
The equation describing the stochastic motion of a classical particle in 1+1-dimensional space-time ...
We apply the projection operator method (POM) to φ4 theory and derive both quantum and semiclassical...
A linear quantum Brownian motion model with a general spectral density function is considered. In th...
A quantum mechanical form of the Langevin equation is derived from an explicit consideration of the ...
The present work is concerned with the study of a generalized Langevin equation and its link to the ...
Different quantum Langevin equations obtained by coupling a particle to a field are examined. Instab...