An Elementary Characterization of the Gauss--Kuzmin Measure in the Theory of Continued Fractions

Abstract

By a classical result of Gauss and Kuzmin, the frequency with which a string a=(a1,…,an) of positive integers appears in the continued fraction expansion of a random real number is given by μGK(I(a)), where I(a) is the set of real numbers in [0,1) whose continued fraction expansion begins with the string a and μGK is the Gauss--Kuzmin measure, defined by μGK(I)= 1 2∫I 11+x dx, for any interval I⊂eq[0,1]. % It is known that the Gauss--Kuzmin measure satisfies the symmetry property (*) μGK(I(a))=μGK(I(a)), where a=(an,…,a1) is the reverse of the string a. We show that this property in fact characterizes the Gauss--Kuzmin measure: If μ is any probability measure with continuous density function on [0,1] satisfying μ(I(a))=μ(I(a)) for all finite strings a, then μ=μGK. % We also consider the question whether symmetries analogous to (*) hold for permutations of a other than the reverse a; we call such a symmetry nontrivial. We show that strings a of length 3 have no nontrivial symmetries, while for each n 4 there exists an infinite family of strings a of length n that do have nontrivial symmetries. Finally we present numerical data supporting the conjecture that, in an appropriate asymptotic sense, ``almost all'' strings a have no nontrivial symmetries.

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