Lochs's theorem

Lochs's theorem In number theory, Lochs's theorem concerns the rate of convergence of the continued fraction expansion of a typical real number. A proof of the theorem was published in 1964 by Gustav Lochs.[1] The theorem states that for almost all real numbers in the interval (0,1), the number of terms m of the number's continued fraction expansion that are required to determine the first n places of the number's decimal expansion behaves asymptotically as follows: {style d'affichage lim _{pas trop }{frac {m}{n}}={frac {6dans(2)dans(10)}{pi ^{2}}}environ 0.97027014} (sequence A086819 in the OEIS).[2] As this limit is only slightly smaller than 1, this can be interpreted as saying that each additional term in the continued fraction representation of a "typical" real number increases the accuracy of the representation by approximately one decimal place. The decimal system is the last positional system for which each digit carries less information than one continued fraction quotient; going to base-11 (changing {style d'affichage ln(10)} à {style d'affichage ln(11)} in the equation) makes the above value exceed 1.

The reciprocal of this limit, {style d'affichage {frac {pi ^{2}}{6dans(2)dans(10)}}environ 1.03064083} (sequence A062542 in the OEIS), is twice the base-10 logarithm of Lévy's constant.

Three typical numbers, and the golden ratio. The typical numbers follow an approximately 45° line, since each continued fraction coefficient yields approximately one decimal digit. The golden ratio, d'autre part, is the number requiring the most coefficients for each digit.

A prominent example of a number not exhibiting this behavior is the golden ratio—sometimes known as the "most irrational" number—whose continued fraction terms are all ones, the smallest possible in canonical form. On average it requires approximately 2.39 continued fraction terms per decimal digit.[3] References ^ Lochs, Gustav (1964), "Vergleich der Genauigkeit von Dezimalbruch und Kettenbruch", Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg (en allemand), 27: 142–144, est ce que je:10.1007/BF02993063, M 0162753 ^ Weistein, Eric W. "Lochs' Theorem". MathWorld. ^ Cooper, Harold. "Continued Fraction Streams". Récupéré 30 Août 2016. Catégories: Continued fractionsTheorems in number theory

Si vous voulez connaître d'autres articles similaires à Lochs's theorem vous pouvez visiter la catégorie Continued fractions.

Laisser un commentaire

Votre adresse email ne sera pas publiée.


Nous utilisons nos propres cookies et ceux de tiers pour améliorer l'expérience utilisateur Plus d'informations