V Tree -- Continued Fraction Expansion, Stern-Brocot Tree, Minkowski's ?(x) Function In Binary: Exponentially Faster

Abstract

The Stern-Brocot tree and Minkowki's question mark function ?(x) (or Conway's box function) are related to the continued fraction expansion of numbers from Q with unary encoding of the partial denominators. We first define binary encodings CI, CII of the natural numbers, adapted to the Gau-Kuz'min measure for the distribution of partial denominators. We then define the V1 tree as analogue to the Stern-Brocot tree, using the binary encondings CI, CII. We shall see that all numbers with denominator q are present in the first 3.442(q) levels, instead of 1/q appearing in level q in the Stern-Brocot tree. The extension of the V1 tree, the V tree, covers all numbers from Q exactly once. We also define the binary version of Minkowski's question mark function, ?V, and conjecture that it has no derivative at rational points (for the original, ?'(x)=0, x∈ Q).