The finite duration of the collisions in Fermionic systems as expressed by
the retardation time in non-Markovian Levinson-type kinetic equations is
discussed in the quasiclassical limit. We separate individual contributions
included in the memory effect resulting in (i) off-shell tails of the Wigner
distribution, (ii) renormalization of scattering rates and (iii) of the
single-particle energy, (iv) collision delay and (v) related non-local
corrections to the scattering integral. In this way we transform the Levinson
equation into the Landau-Silin equation extended by the non-local corrections
known from the theory of dense gases. The derived nonlocal kinetic equation
unifies the Landau theory of quasiparticle transport with the classical kinetic
theory of dense gases. The space-time symmetry is discussed versus
particle-hole symmetry and a solution is proposed which transforms these two
exclusive pictures into each other.Comment: slightly revised, 19 page