A stochastic quasi-classical wavefunction of the Universe from the third quantization procedure

Abstract

(abbreviated) We study quantized solutions of WdW equation describing a closed FRW universe with a term and a set of massless scalar fields. We show that when 1 in the natural units and the standard in-vacuum state is considered, either wavefunction of the universe, , or its derivative with respect to the scale factor, a, behave as random quasi-classical fields at sufficiently large values of a, when 1 a e2 3 or a e2 3, respectively. Statistical r.m.s value of the wavefunction is proportional to the Hartle-Hawking wavefunction for a closed universe with a term. Alternatively, the behaviour of our system at large values of a can be described in terms of a density matrix corresponding to a mixed state, which is directly determined by statistical properties of . It gives a non-trivial probability distribution over field velocities. We suppose that a similar behaviour of can be found in all models exhibiting copious production of excitations with respect to out-vacuum state associated with classical trajectories at large values of a. Thus, the third quantization procedure may provide a 'boundary condition' for classical solutions of WdW equation.