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Jakšić–Last theorem for higher rank perturbations

Authors:	Anish Mallick

Institution:	The Institute of Mathematical Sciences, Chennai, Tamil Nadu, India

Abstract:	We consider the generalized Anderson model $urn:x-wiley:0025584X:media:mana201400423:mana201400423-math-0001$ , where $urn:x-wiley:0025584X:media:mana201400423:mana201400423-math-0002$ is a countable set, $urn:x-wiley:0025584X:media:mana201400423:mana201400423-math-0003$ are i.i.d. random variables and the $urn:x-wiley:0025584X:media:mana201400423:mana201400423-math-0004$ are rank $urn:x-wiley:0025584X:media:mana201400423:mana201400423-math-0005$ projections. For these models we prove theorem analogous to that of Jak?i?–Last on the equivalence of the trace measure $urn:x-wiley:0025584X:media:mana201400423:mana201400423-math-0006$ for $urn:x-wiley:0025584X:media:mana201400423:mana201400423-math-0007$ a.e. ω. Our model covers the dimer and polymer models.

Keywords:	Spectral theory Anderson model perturbation theory 47A10 47A55 47B25 82B44 60H25 81Q10