Abstract
We consider the Anderson model in l 2(ℤd), d≥ 1, with potentials whose values at any site of the lattice are Markovian independent random functions of time. The upper and lower bounds for the moments |X|p (t, ο) with probability 1 are obtained. We obtain also upper and lower bounds for the averaged diffusion constant and upper bounds for the correlation function. The results present diffusive behaviour in dimensions d=1,2 up to logarithmic factors.
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