On the derivative of the Minkowski question-mark function

Abstract

The Minkowski question-mark function ?(x) is a continuous strictly increasing function defined on [0,1] interval. It is well known fact that the derivative of this function, if exists, can take only two values: 0 and +∞. It is also known that the value of the derivative ?'(x) at the point x=[0;a1,a2,…,at,…] is connected with the limit behavior of the arithmetic mean (a1+a2+…+at)/t. Particularly, N. Moshchevitin and A. Dushistova showed that if a1+a2+…+at<1 t, where 1 = 2(1+52)/2= 1.3884…, then ?'(x)=+∞. They also proved that the constant 1 is non-improvable. We consider a dual problem: how small can be the quantity a1+a2+…+at-1 t if ?'(x)=0? We obtain the non-improvable estimates of this quantity.