E-catalog        

Библиогр.: 46 назв.

A new exactly solvable case in strong-field quantum electrodynamics with a time-dependent external electric field is presented. The corresponding field is given by one component of the electromagnetic vector potential, which is the analytic function Ax(t)=σE0[1+exp(t/σ)]−1/2, where sigma is a time-scale parameter. In contrast to Sauter-like electric field, this field is asymmetric with respect to the time instant, where it reaches its maximum value, that is why we call it the analytic asymmetric electric field. We managed to exactly solve the Dirac equation with such a field, which made it possible to calculate characteristics of the corresponding vacuum instability nonperturbatively. We construct the so-called {in}- and {out}-solutions and with their help calculate mean differential and total numbers of created charged particles, probability of the vacuum to remain a vacuum, vacuum mean values of current density and energy-momentum tensor of the particles. We study the vacuum instability in regimes of rapidly and slowly changing analytic asymmetric electric field, and compare the obtained results with corresponding ones obtained earlier for the case of the symmetric Sauter-like electric field. We also compare exact results in the regime of slowly changing field with corresponding results obtained within the slowly varying field approximation proposed by two of the authors in PRD 95, 076013 (2017), thus demonstrating the effectiveness of such an approximation.