Abstract
In this paper we study the asymptotic expansion of the spectral shift function for the slowly varying perturbations of periodic Schrodinger operators. We give a weak and pointwise asymptotic expansions in powers of h of the derivative of the spectral shift function corresponding to the pair P(h) =P0 +'(hx);P0 = - +V(x) ; where '(x) 2 C 1 (R n ;R) is a decreasing function, O(jxj - ) for some > n and h is a small positive parameter. Here the potential V is real, smooth and periodic with respect to a lattice in R n . To prove the pointwise asymptotic expansion of the spectral shift function, we establish a limiting absorption Theorem for P(h).
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