Electrostatic-field-induced dynamics in an ultrathin quantum well

Abstract

We consider the time evolution of a particle subjected to both a uniform electrostatic field F and a one-dimensional delta-function potential well. We derive the propagator KF(x,t|x',0) of this system, directly leading to the wavefunction psiF(x,t), in which its essential ingredient KF(0,t|0,0), accounting for the ionization-recombination in the bound-continuum transition, is exactly expressed in terms of the multiple hypergeometric functions F(z1,z2,...,zn). And then we obtain the ingredient KF(0,t|0,0) in an appropriate approximation scheme, expressed in terms of the generalized hypergeometric functions pFq(z) being much more transparent to physically interpret and much more accessible in their numerical evaluation than the functions F(z1,z2,...,zn).