On the Gauss-Kuzmin-Lévy problem for nearest integer continued fractions
Abstract: This note provides an effective bound in the Gauss-Kuzmin-L\'evy problem for some Gauss type shifts associated with nearest integer continued fractions, acting on the interval $I_0=[0,\frac{1}{2}]$ or $I_0=[-\frac{1}{2},\frac{1}{2}]$. We prove asymptotic formulas $\lambda (T{-n}I) =\mu(I)(\vert I_0 \vert +O(qn))$ for such transformations $T$, where $\lambda$ is the Lebesgue measure on $\mathbb R$, $\mu$ the normalized $T$-invariant Lebesgue absolutely continuous measure, $I$ subinterval in $I_0$, and $q=0.288$ is smaller than the Wirsing constant $q_W=0.3036\ldots$
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