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Article type: Research Article
Authors: Perelman, Galina
Affiliations: Centre de Mathématiques, Ecole Polytechnique, F-91128 Palaiseau cedex, France
Abstract: We consider the one-dimensional Stark–Wannier type operators \[H=-\dfrac{\mathrm{d}^{2}}{\mathrm{d}x^{2}}-Fx-q(x)+v(x),\quad F>0,\] where q is a smooth function slowly growing at infinity and v is periodic, \[$v\in L_{1}(\mathbb{T})$, with the Fourier coefficients of the form (ln |n|)−β, 0<β<1/2, as n→∞. We show that for suitable q and F the spectrum of the corresponding operator is purely singular continuous. This proves the sharpness of the a.c. spectrum stability result obtained in Comm. Math. Phys. 234 (2003), 359–381.
Journal: Asymptotic Analysis, vol. 44, no. 1-2, pp. 1-45, 2005
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