Weisskopf-Wigner Decay Theory for the Energy-Driven Stochastic Schrödinger Equation

We generalize the Weisskopf-Wigner theory for the line shape and transition rates of decaying states to the case of the energy-driven stochastic Schrödinger equation that has been used as a phenomenology for state vector reduction. Working to leading order in the perturbing potential inducing the decay, and assuming that the perturbing potential has vanishing matrix elements within the degenerate manifold containing the decaying state, the stochastic Schrödinger equation linearizes. Solving the linearized equations, and making the Weisskopf-Wigner approximation of evaluating the mass and decay matrices on energy shell, we find no change from the standard analysis in the line shape or the transition rate per unit time. The only effect of the stochastic terms is to alter the early time transient behavior of the decay, in a way that eliminates the quantum Zeno effect. We apply our results to estimate experimental bounds on the parameter governing the stochastic effects.