Comparison of the lengths of the continued fractions of √𝐷 and \frac12(1+√𝐷)

Williams, Kenneth S.; Buck, Nicholas

doi:10.1090/S0002-9939-1994-1169053-7

Comparison of the lengths of the continued fractions of $\sqrt D$ and $\frac 12(1+\sqrt D)$
HTML articles powered by AMS MathViewer

by Kenneth S. Williams and Nicholas Buck PDF

Proc. Amer. Math. Soc. 120 (1994), 995-1002 Request permission

Abstract:

Let $D$ denote a positive nonsquare integer such that $D \equiv 1 (\bmod 4)$. Let $l(\sqrt D )$ (resp. $l(\tfrac {1} {2}(1 + \sqrt D ))$) denote the length of the period of the continued fraction expansion of $\sqrt D$ (resp. $\tfrac {1} {2}(1 + \sqrt D ))$). Recently Ishii, Kaplan, and Williams (On Eisenstein’s problem, Acta Arith. 54 (1990), 323-345) established inequalities between $l(\sqrt D )$ and $l(\tfrac {1} {2}(1 + \sqrt D ))$. In this note it is shown that these inequalities are best possible in a strong sense.

References

The continued fraction for certain

with applications to units and classnumbers

F. Halter-Koch, Einige periodische Kettenbruchentwicklungen und Grundeinheiten quadratischer Ordnungen, Abh. Math. Sem. Univ. Hamburg 59 (1989), 157–169 (German). MR 1049893, DOI 10.1007/BF02942326
Noburo Ishii, Pierre Kaplan, and Kenneth S. Williams, On Eisenstein’s problem, Acta Arith. 54 (1990), no. 4, 323–345. MR 1058895, DOI 10.4064/aa-54-4-323-345
Claude Levesque and Georges Rhin, A few classes of periodic continued fractions, Utilitas Math. 30 (1986), 79–107. MR 864813
Claude Levesque, Continued fraction expansions and fundamental units, J. Math. Phys. Sci. 22 (1988), no. 1, 11–44. MR 940385
Oskar Perron, Die Lehre von den Kettenbrüchen. Bd I. Elementare Kettenbrüche, B. G. Teubner Verlagsgesellschaft, Stuttgart, 1954 (German). 3te Aufl. MR 0064172
H. C. Williams, A note on the period length of the continued fraction expansion of certain $\sqrt D$, Utilitas Math. 28 (1985), 201–209. MR 821957