Almost Mathieu operator mathematical physics , the almost Mathieu operator arises in the study of the quantum Hall effect . It is given byself-adjoint operator on the Hilbert space . Here are parameters. In pure mathematics , its importance comes from the fact of being one of the best-understood examples of an ergodic Schrödinger operator . For example, three problems of Barry Simon's fifteen problems about Schrödinger operators "for the twenty-first century" featured the almost Mathieu operator.Harper's equation .If is a rational number , then Floquet theory its spectrum is purely absolutely continuous .irrational .On the other hand , by ergodicity , the supports of absolutely continuous, singular continuous, and pure point parts of the spectrum are almost surely independent of.lower bound on the Lyapunov exponent given bybound was proved independently by Avron , Simon and Michael Herman , after an earlier almost rigorous argument of Aubry and André. In fact, when belongs to the spectrum, the inequality becomes an equality, proved by Jean Bourgain and Svetlana Jitomirskaya .The structure of the spectrum Another striking characteristic of the almost Mathieu operator is that its spectrum is a Cantor set for all irrational and. This was shown by Avila and Jitomirskaya solving the by-then famous "ten martini problem" after several earlier results.Lebesgue measure of the spectrum of the almost Mathieu operator is known to bezero measure . For, the formula was discovered numerically by Aubry and André and proved by Jitomirskaya and Krasovsky .Hofstadter's butterfly , where the spectrum is shown as a set.
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