Rational approximations to ${\@root 3 \of {2}}$ and other algebraic numbers revisited

Paul M. Voutier

Rational approximations to $\sqrt[3]{2}$ and other algebraic numbers revisited

Paul M. Voutier^[1]

[1] London, UK

Journal de Théorie des Nombres de Bordeaux (2007)

Volume: 19, Issue: 1, page 263-288
ISSN: 1246-7405

Access Full Article

top

Access to full text

Full (PDF)

Access to full text

Abstract

top

In this paper, we establish improved effective irrationality measures for certain numbers of the form

\sqrt[3]{n}

, using approximations obtained from hypergeometric functions. These results are very close to the best possible using this method. We are able to obtain these results by determining very precise arithmetic information about the denominators of the coefficients of these hypergeometric functions.Improved bounds for the Chebyshev functions in arithmetic progressions

θ (k, l; x)

and

ψ (k, l; x)

for

k = 1, 3, 4, 6

are also presented.

How to cite

top

Voutier, Paul M.. "Rational approximations to ${\@root 3 \of {2}}$ and other algebraic numbers revisited." Journal de Théorie des Nombres de Bordeaux 19.1 (2007): 263-288. <http://eudml.org/doc/249947>.

@article{Voutier2007,
abstract = {In this paper, we establish improved effective irrationality measures for certain numbers of the form $\@root 3 \of \{n\}$, using approximations obtained from hypergeometric functions. These results are very close to the best possible using this method. We are able to obtain these results by determining very precise arithmetic information about the denominators of the coefficients of these hypergeometric functions.Improved bounds for the Chebyshev functions in arithmetic progressions $\theta (k,l;x)$ and $\psi (k,l;x)$ for $k=1,3,4,6$ are also presented.},
affiliation = {London, UK},
author = {Voutier, Paul M.},
journal = {Journal de Théorie des Nombres de Bordeaux},
keywords = {irrationality measure; algebraic number},
language = {eng},
number = {1},
pages = {263-288},
publisher = {Université Bordeaux 1},
title = {Rational approximations to $\{\@root 3 \of \{2\}\}$ and other algebraic numbers revisited},
url = {http://eudml.org/doc/249947},
volume = {19},
year = {2007},
}

TY - JOUR
AU - Voutier, Paul M.
TI - Rational approximations to ${\@root 3 \of {2}}$ and other algebraic numbers revisited
JO - Journal de Théorie des Nombres de Bordeaux
PY - 2007
PB - Université Bordeaux 1
VL - 19
IS - 1
SP - 263
EP - 288
AB - In this paper, we establish improved effective irrationality measures for certain numbers of the form $\@root 3 \of {n}$, using approximations obtained from hypergeometric functions. These results are very close to the best possible using this method. We are able to obtain these results by determining very precise arithmetic information about the denominators of the coefficients of these hypergeometric functions.Improved bounds for the Chebyshev functions in arithmetic progressions $\theta (k,l;x)$ and $\psi (k,l;x)$ for $k=1,3,4,6$ are also presented.
LA - eng
KW - irrationality measure; algebraic number
UR - http://eudml.org/doc/249947
ER -

References

top

A. Baker, Rational approximations to certain algebraic numbers. Proc. London. Math. Soc. (3) 14 (1964), 385–398. Zbl0131.29102 MR161825
A. Baker, Rational approximations to $\sqrt[3]{2}$ and other algebraic numbers. Quart. J. Math. Oxford 15 (1964), 375–383. Zbl0222.10036 MR171750
M. Bennett, Explicit lower bounds for rational approximation to algebraic numbers. Proc. London Math. Soc. 75 (1997), 63–78. Zbl0879.11038 MR1444313
Jianhua Chen, P. Voutier, Complete solution of the diophantine equation $X^{2} + 1 = d Y^{4}$ and a related family of quartic Thue equations. J. Number Theory 62 (1997), 71–99. Zbl0869.11025 MR1430002
G. V. Chudnovsky, The method of Thue-Siegel. Annals of Math. 117 (1983), 325–383. Zbl0518.10038 MR690849
D. Easton, Effective irrationality measures for certain algebraic numbers. Math. Comp. 46 (1986), 613–622. Zbl0586.10019 MR829632
N. I. Fel’dman, Yu. V. Nesterenko, Number Theory IV: Transcendental Numbers. Encyclopaedia of Mathematical Sciences 44, Springer, 1998. Zbl0885.11004
A. Heimonen, Effective irrationality measures for some values of Gauss hypergeometric function. Department of Mathematics, University of Oulu preprint, March 1996. Zbl0970.11029
A. N. Korobov, Continued fractions and Diophantine approximation. Candidate’s Dissertation, Moscow State University, 1990.
S. Lang, H. Trotter, Continued-fractions for some algebraic numbers. J. reine angew. Math. 255 (1972), 112–134. Zbl0237.10022 MR306131
G. Lettl, A. Pethő, P. M. Voutier, Simple Familiies of Thue Inequalities. Trans. Amer. Math. Soc. 351 (1999), 1871–1894. Zbl0920.11041 MR1487624
E. M. Nikishin, Arithmetic properties of the Markov function for the Jacobi weight. Anal. Math. 8 (1982), 39–46. Zbl0495.10022 MR662702
O. Ramaré, R. Rumely, Primes in arithmetic progressions. Math. Comp. 65 (1996), 397–425. Zbl0856.11042 MR1320898
M. Rubinstein, http://pmmac03.math.uwaterloo.ca/~mrubinst/L_function_public/ZEROS
A. Togbe, P. M. Voutier, P. G. Walsh, Solving a family of Thue equations with an application to the equation $x^{2} - D y^{4} = 1$ . Acta. Arith. 120 (2005), 39–58. Zbl1155.11318 MR2189717

NotesEmbed ?

top

You must be logged in to post comments.