%I #7 Mar 30 2012 18:40:42
%S 5,3,9,5,0,4,2,8,6,7,7,9,6,3,5,8,7,6,6,1,1,5,6,6,0,3,2,4,4,5,9,1,7,8,
%T 7,3,1,0,9,4,5,0,3,6,7,6,0,2,7,1,1,9,9,1,3,9,0,9,7,8,8,5,4,3,5,4,0,3,
%U 1,4,7,3,1,2,2,1,0,5,0,5,4,2,5,2,8,9,5,5,8,4,1,9,6,7,4,8,0,5,0,2,6,6,4,6,8
%N Decimal expansion of the location of a maximum of a Fibonacci Hamiltonian function.
%C The abscissa x of a unique maximum of the f(x) in Theorem 1 of Damanik et al., arising in spectrum of a periodic operator of the one-dimensional Schrodinger equation.
%C The f(x) at the maximum is A091648.
%H David Damanik, Mark Embree, Anton Gorodetski, Serguei Tcheremchantsev, <a href="http://arXiv.org/abs/0705.0338">The Fractal Dimension of the Spectrum of the Fibonacci Hamiltonian</a>, arXiv:0705.0338, 2 May 2007, p. 3.
%F Decimal expansion of 2*(6 - sqrt(2))/17.
%e 0.5395042867...
%K easy,nonn,cons
%O 0,1
%A _Jonathan Vos Post_, May 04 2007
%E Offset corrected and more digits added by _R. J. Mathar_, Mar 23 2010