Long-Time Behavior of Typical Pure States from Thermal Equilibrium Ensembles

Abstract

We consider an isolated macroscopic quantum system in a pure state t evolving unitarily in a separable Hilbert space H and take for granted that different macro states correspond to mutually orthogonal subspaces H⊂H. Let P be the projection to H. It was recently shown that for all Hamiltonians with no highly degenerate eigenvalues and gaps most 0∈Hμ are such that for most t≥ 0, \|P_t\|2 is close to a t- and 0-independent value Mμ provided that Mμ is not too small. Here, ``most'' refers to the uniform distribution on the sphere S(Hμ). In the present work, we generalize this result from the uniform distribution, corresponding to the micro-canonical ensemble, to the much more general class of Gaussian adjusted projected (GAP) measures. For any density matrix on H, GAP() is the most spread out distribution on S(H) with density matrix . We show that also for GAP()-most 0∈H for most t≥ 0, \|P_t\|2 is close to a fixed value M P (which must not be too small). Moreover, we prove a generalization for certain operators B instead of P and for finite times. Since certain GAP measures are quantum analogs of the (grand-)canonical ensemble, our result expresses a version of equivalence of ensembles.

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