On the derivative of the Minkowski question mark function ?(x)
Abstract
Let x = [0;a1,a2,...] be the decomposition of the irrational number x ∈ [0,1] into regular continued fraction. Then for the derivative of the Minkowski function ?(x) we prove that ?'(x) = +∞ provided t ∞a1+...+att <1 =2 λ1 2 = 1.388+, and ?'(x) = 0 provided t ∞a1+...+att >2 = 4L5-5L4L5-L4= 4.401+ (here Lj = (j+j2+42) - j· 22). Constants 1,2 are the best possible. Also we prove that ?'(x) = +∞ holds for all x with partial quotients bounded by 4.
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