MULTIFRACTAL ANALYSIS OF THE CONVERGENCE EXPONENT IN CONTINUED FRACTIONS

doi:10.1007/s10473-021-0607-1

Acta mathematica scientia,Series B ›› 2021, Vol. 41 ›› Issue (6): 1896-1910.doi: 10.1007/s10473-021-0607-1

• Articles • Previous Articles Next Articles

MULTIFRACTAL ANALYSIS OF THE CONVERGENCE EXPONENT IN CONTINUED FRACTIONS

Lulu FANG¹, Jihua MA², Kunkun SONG³, Min WU⁴

1. School of Science, Nanjing University of Science and Technology, Nanjing 210094, China;
2. School of Mathematics and Statistics, Wuhan University, Wuhan 430072, China;
3. Key Laboratory of Computing and Stochastic Mathematics(Ministry of Education), School of Mathematics and Statistics, Hunan Normal University, Changsha 410081, China;
4. School of Mathematics, South China University of Technology, Guangzhou 510640, China

Received:2021-03-16 Revised:2021-09-02 Online:2021-12-25 Published:2021-12-27
Supported by:
This research was supported by National Natural Science Foundation of China (11771153, 11801591, 11971195, 12171107), Guangdong Natural Science Foundation (2018B0303110005), Guangdong Basic and Applied Basic Research Foundation (2021A1515010056). Kunkun Song would like to thank China Scholarship Council (CSC) for financial support (201806270091).

Abstract

CLC Number:

11K50

Lulu FANG, Jihua MA, Kunkun SONG, Min WU. MULTIFRACTAL ANALYSIS OF THE CONVERGENCE EXPONENT IN CONTINUED FRACTIONS[J].Acta mathematica scientia,Series B, 2021, 41(6): 1896-1910.

Trendmd

References 28

[1]	Besicovitch A S, Taylor S J. On the complementary intervals of a linear closed set of zero Lebesgue measure. J London Math Soc, 1954, 29:449-459
[2]	Cusick T W. Hausdorff dimension of sets of continued fractions. Quart J Math Oxford, 1990, 41:277-286
[3]	Dodson M. Hausdorff dimension, lower order and Khintchine's theorem in metric Diophantine approximation. J Reine Angew Math, 1992, 432:69-76
[4]	Durand A. On randomly placed arcs on the circle. Recent developments in fractals and related fields//Appl Numer Harmon Anal. Boston, MA:Birkhäuser Boston, 2010:343-351
[5]	Falconer K. Fractal Geometry:Mathematical Foundations and Applications. Chichester:John Wiley & Sons, Ltd, 1990
[6]	Fan A H, Li M T, Ma J H. Generic points of shift-invariant measures in the countable symbolic space. Math Proc Cambridge Philos Soc, 2019, 166:381-413
[7]	Fan A H, Liao L M, Ma J H, Wang B W. Dimension of Besicovitch-Eggleston sets in countable symbolic space. Nonlinearity, 2010, 23:1185-1197
[8]	Fan A H, Liao L M, Wang B W, Wu J. On Khintchine exponents and Lyapunov exponents of continued fractions. Ergodic Theory Dynam Systems, 2009, 29:73-109
[9]	Fan A H, Liao L M, Wang B W, Wu J. On the fast Khintchine spectrum in continued fractions. Monatsh Math, 2013, 171:329-340
[10]	Fang L L, Ma J H, Song K K. Some exceptional sets of Borel-Bernstein theorem in continued fractions. Ramanujan J, 2020, https://doi.org/10.1007/s11139-020-00320-8
[11]	Fang L L, Wu M, Shang L. Large and moderate deviation principles for Engel continued fractions. J Theoret Probab, 2018, 31:294-318
[12]	Good I J. The fractional dimensional theory of continued fractions. Proc Cambridge Philos Soc, 1941, 37:199-228
[13]	Hawkes J. Hausdorff measure, entropy, and the independence of small sets. Proc London Math Soc, 1974, 28:700-724
[14]	Iosifescu M, Kraaikamp C. Metrical Theory of Continued Fractions. Mathematics and Its Applications 547. Dordrecht:Kluwer Academic Publishers, 2002
[15]	Jaffard S, Martin B. Multifractal analysis of the Brjuno function. Invent Math, 2018, 212:109-132
[16]	Jarník V. Zur metrischen Theorie der diopahantischen Approximationen. Proc Mat Fyz, 1928, 36:91-106
[17]	Jordan T, Rams M. Increasing digit subsystems of infinite iterated function systems. Proc Amer Math Soc, 2012, 140:1267-1279
[18]	Kesseböhmer M, Stratmann B. Fractal analysis for sets of non-differentiability of Minkowski's question mark function. J Number Theory, 2008, 128:2663-2686
[19]	Li B, Shieh N R, Xiao Y. Hitting probabilities of the random covering sets. Fractal Geometry and Dynamical Systems in Pure and Applied Mathematics. II. Fractals in Applied Mathematics, Contemp Math, 2013, 601:307-323
[20]	Liao L M, Rams M. Upper and lower fast Khintchine spectra in continued fractions. Monatsh Math, 2016, 180:65-81
[21]	Liao L M, Rams M. Big Birkhoff sums in d-decaying Gauss like iterated function systems. arXiv preprint, 2019, https://arxiv.org/pdf/1905.02547.pdf
[22]	Łuczak T. On the fractional dimension of sets of continued fractions. Mathematika, 1997, 44:50-53
[23]	Pollicott M, Weiss H. Multifractal analysis of Lyapunov exponent for continued fraction and MannevillePomeau transformations and applications to Diophantine approximation. Comm Math Phys, 1999, 207:145-171
[24]	Pólya G, Szegő G. Problems and Theorems in Analysis Vol I. Berlin:Springer-Verlag, 1972
[25]	Ramharter G. Eine Bemerkung über gewisse Nullmengen von Kettenbrüchen. Ann Univ Sci Budapest Eötvös Sect Math, 1985, 28:11-15
[26]	Tong X, Wang B W. How many points contain arithmetic progressions in their continued fraction expansion. Acta Arith, 2009, 139:369-376
[27]	Wang B W, Wu J. A problem of Hirst on continued fractions with sequences of partial quotients. Bull Lond Math Soc, 2008, 40:18-22
[28]	Wang B W, Wu J. Hausdorff dimension of certain sets arising in continued fraction expansions. Adv Math, 2008, 218:1319-1339

MULTIFRACTAL ANALYSIS OF THE CONVERGENCE EXPONENT IN CONTINUED FRACTIONS

PDF (PC)

Abstract

Cite this article

share this article

References 28

Related Articles 2

Metrics

Comments

Recommended 10

[1]	Changgui ZHANG. ON THETA-TYPE FUNCTIONS IN THE FORM (x;q)_∞ [J]. Acta mathematica scientia,Series B, 2021, 41(6): 2086-2106.
[2]	HU Dong-Gang, HU Xue-Hai. ARBITRARILY LONG ARITHMETIC PROGRESSIONS FOR CONTINUED FRACTIONS OF LAURENT SERIES [J]. Acta mathematica scientia,Series B, 2013, 33(4): 943-949.