Prethermalization for Deformed Wigner Matrices
Abstract
We prove that a class of weakly perturbed Hamiltonians of the form Hλ = H0 + λ W, with W being a Wigner matrix, exhibits prethermalization. That is, the time evolution generated by Hλ relaxes to its ultimate thermal state via an intermediate prethermal state with a lifetime of order λ-2. Moreover, we obtain a general relaxation formula, expressing the perturbed dynamics via the unperturbed dynamics and the ultimate thermal state. The proof relies on a two-resolvent law for the deformed Wigner matrix Hλ.
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