Momentum correlation in pair production by spacetime dependent fields from scattered wave functions

Abstract

We consider Sauter-Schwinger pair production by electric fields that depend on both time and space, E(t,z) and E(t,x,y). For space-independent fields, E(t), momentum conservation, δ( p+ p'), fixes the positron momentum, p', in terms of the electron momentum, p. For E(t,z), on the other hand, pz and p'z are independent. However, previous exact-numerical studies have considered only the probability as a function of a single momentum variable, P(pz), P(p'z) or P(p'z-pz), but not the correlation P(pz,p'z). In this paper, we show how to obtain P(pz,p'z) by solving the Dirac equation numerically. To do so, we split the wave function into a background and a scattered wave, (t, x)= back.(t, x)+ scat.(t, x), where back.( ipx+gauge term). scat. vanishes outside a past light cone and is obtained by solving (iγμ Dμ-m) scat.=-(iγμ Dμ-m) back. backwards in time starting with scat.(t+∞, x)=0.