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{{Short description|Self-adjoint operator that arises in physical transition problems}}
In [[mathematical physics]], the '''almost Mathieu operator'''
: <math> [H^{\lambda,\alpha}_\omega u](n) = u(n+1) + u(n-1) + 2 \lambda \cos(2\pi (\omega + n\alpha)) u(n), \, </math>
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For <math>\lambda = 1</math>, the almost Mathieu operator is sometimes called '''Harper's equation'''.
== The 'Ten Martini Problem' ==
The structure of this operator's spectrum was first conjectured by [[Mark Kac]], who offered ten martinis for the first proof of the following conjecture:
{{blockquote|text=
For all <math>\lambda \neq 0</math>, all irrational <math>a</math>, and all integers <math>n_l, n_2</math>, with <math>0 < n_l+ n_2a < 1</math>, there is a gap for the almost Mathieu operator on which <math>k(E) = n_l + n_2a</math>, where <math>k(E)</math> is the integrated [[density of states]].
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This problem was named the 'Dry Ten Martini Problem' by [[Barry Simon]] as it was [[Martini (cocktail)#Preparation|'stronger']] than the weaker problem which became known as the 'Ten Martini Problem'<ref name=simon1982almost></ref>:
{{blockquote|text=
For all <math>\lambda \neq 0</math>, all irrational <math>a</math>, and all <math>\omega</math>, the spectrum of the almost Mathieu operator is a [[Cantor set]].
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==The spectral type==
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[[Image:Hofstadter's_butterfly.png|thumb|Hofstadter's butterfly]]
Another striking characteristic of the almost Mathieu operator is that its spectrum is a [[Cantor set]] for all irrational <math>\alpha</math> and <math>\lambda > 0</math>. This was shown by [[Artur Avila|Avila]] and [[Svetlana Jitomirskaya|Jitomirskaya]] solving the by-then famous
Furthermore, the [[Lebesgue measure]] of the spectrum of the almost Mathieu operator is known to be
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