Difference between revisions of "Normal number"
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− | {{MSC|11K16}} | + | {{TEX|done}}{{MSC|11K16}} |
[[Category:Probabilistic number theory]] | [[Category:Probabilistic number theory]] | ||
− | A real number < | + | A real number $\alpha$, $0 < \alpha < 1$, having the following property: For every natural number $s$, any given $s$-tuple $\delta = (\delta_1,\ldots,\delta_s)$ consisting of the symbols $0,1,\ldots,g-1$ appears with asymptotic frequency $1/g^s$ in the sequence |
+ | $$\label{eq:a1} | ||
+ | \alpha_1,\ldots,\alpha_n,\ldots | ||
+ | $$ | ||
+ | obtained from the expansion of $\alpha$ as an infinite fraction in base $g$, | ||
+ | $$ | ||
+ | \alpha = \frac{\alpha_1}{g} + \cdots + \frac{\alpha_n}{g^n} + \cdots \ . | ||
+ | $$ | ||
− | + | In more detail, let $g>1$ be a natural number and let | |
+ | $$\label{eq:a2} | ||
+ | (\alpha_1,\ldots,\alpha_s), (\alpha_2,\ldots,\alpha_{s+1}), \ldots | ||
+ | $$ | ||
+ | be the infinite sequence of $s$-tuples corresponding to \ref{eq:a1}. Let $N(n,\delta)$ denote the number of occurrences of the tuple $\delta = (\delta_1,\ldots,\delta_s)$ among the first $n$ tuples of \ref{eq:a2}. The number | ||
+ | $$ | ||
+ | \alpha = \frac{\alpha_1}{g} + \cdots + \frac{\alpha_n}{g^n} + \cdots \ . | ||
+ | $$ | ||
+ | is said to be normal if for any number $s$ and any given $s$-tuple $\delta$ consisting of the symbols $0,\ldots,g-1$, | ||
+ | $$ | ||
+ | \lim_{n \rightarrow \infty} \frac{N(n,s)}{ n } = \frac{1}{g^s} \ . | ||
+ | $$ | ||
− | + | The concept of a normal number was introduced for $g=10$ by E. Borel (see {{Cite|B}}, {{Cite|B2}}, p. 197). He called a real number $\alpha$ ''weakly normal'' to the base $g$ if | |
+ | $$ | ||
+ | \lim_{n \rightarrow \infty} \frac{N(n,\delta)}{n} = \frac{1}{g} | ||
+ | $$ | ||
+ | where $N(n,\delta)$ is the number of occurrences of $\delta$, $0 \le \delta \le g-1$, among the first $n$ terms of the sequences $\alpha_1,\alpha_2,\ldots$ and normal if $\alpha, g\alpha, g^2\alpha, \ldots$ are weakly normal to the bases $g, g^2, \ldots$. He also showed that for a normal number | ||
+ | $$ | ||
+ | \lim_{n \rightarrow \infty} \frac{N(n,s)}{ n } = \frac{1}{g^s} | ||
+ | $$ | ||
+ | for any $s$ and any given $s$-tuple $\delta = (\delta_1,\ldots,\delta_s)$. Later it was proved (see {{Cite|Pi}}, {{Cite|NZ}}, and also {{Cite|Po}}) that the last relation is equivalent to Borel's definition of a normal number. | ||
− | + | A number $\alpha$ is called absolutely normal if it is normal with respect to every base $g$. The existence of normal and absolutely-normal numbers was established by Borel on the basis of measure theory. The construction of normal numbers in an explicit form was first achieved in {{Cite|C}}. Earlier (see {{Cite|S}}, {{Cite|L}}) an effective procedure for constructing normal numbers was indicated. For other methods for constructing normal numbers and for connections between the concepts of normality and randomness see {{Cite|Po}}. | |
− | + | [[Uniform distribution|Uniform distribution]] of the fractional parts $\{ \alpha g^x \}$, $x = 0, 1, \ldots$ on the interval $[0,1]$ is equivalent to $\alpha$ being normal. | |
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− | [[Uniform distribution|Uniform distribution]] of the fractional parts | ||
====References==== | ====References==== | ||
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====Comments==== | ====Comments==== | ||
− | Almost | + | Almost all numbers (with respect to [[Lebesgue measure]]) are normal with respect to every base $g$ (see e.g. Theorem 8.11 in {{Cite|N}} or section 9.13 of {{Cite|HW}}). It is not known whether familiar numbers like $\sqrt2,\,e,\,\pi$ are normal or not. Normal numbers are potentially interesting in the context of random number generators. A normal number to a base $g$ is necessarily irrational. The weakly-normal number (to base $10$) $0\cdot12345678901234567890\ldots$ is of course rational. The ''[[Champernowne number]]'' $x = 0\cdot1234567891011121314\ldots$, obtained as $x = 0 \cdot \alpha_1 \alpha_2 \alpha_3 \ldots$ where $\alpha_i$ stands for the group of digits representing $i$ to base $10$, is normal to base $10$ {{Cite|C}}. The same recipe works to obtain normal numbers to any given base. |
====References==== | ====References==== | ||
{| | {| | ||
+ | |valign="top"|{{Ref|HW}}|| Hardy, G. H.; Wright, E. M. "An Introduction to the Theory of Numbers", Revised by D. R. Heath-Brown and J. H. Silverman. Foreword by Andrew Wiles. (6th ed.), Oxford: Oxford University Press (2008) [1938] {{ISBN|978-0-19-921986-5}} {{ZBL|1159.11001}} | ||
+ | |- | ||
|valign="top"|{{Ref|N}}|| I. Niven, "Irrational numbers" , Math. Assoc. Amer. (1956) {{MR|1570844}} {{MR|0080123}} {{ZBL|0070.27101}} | |valign="top"|{{Ref|N}}|| I. Niven, "Irrational numbers" , Math. Assoc. Amer. (1956) {{MR|1570844}} {{MR|0080123}} {{ZBL|0070.27101}} | ||
+ | |} | ||
+ | |||
+ | ====Comments==== | ||
+ | The example of Champernowne's number as an explicitly normal number in base 10 was generalised by Copeland and Erdős [CE] who showed that if $a_n$ is an increasing sequence of natural numbers with the property that for every $\theta > 1$ then $a_n < n^\theta$ for sufficiently large $n$, then the number $0 \cdot \alpha_1 \alpha_2 \ldots$ is normal in base $g$ where $\alpha_n$ is the base $g$ expression of $a_n$. See also [B] pp.86-87. | ||
+ | |||
+ | ====References==== | ||
+ | {| | ||
+ | |valign="top"|{{Ref|CE}}|| Copeland, A. H.; Erdős, P. "Note on normal numbers", ''Bulletin of the American Mathematical Society'' '''52''' (1946) 857–860, {{DOI|10.1090/S0002-9904-1946-08657-7}} {{ZBL|0063.00962}} | ||
+ | |- | ||
+ | |valign="top"|{{Ref|B}}|| Bugeaud, Yann. ''Distribution modulo one and Diophantine approximation'', Cambridge Tracts in Mathematics 193, Cambridge: Cambridge University Press (2012) {{ISBN|978-0-521-11169-0}}, {{ZBL|1260.11001}} | ||
|} | |} |
Latest revision as of 08:11, 4 November 2023
2020 Mathematics Subject Classification: Primary: 11K16 [MSN][ZBL]
A real number $\alpha$, $0 < \alpha < 1$, having the following property: For every natural number $s$, any given $s$-tuple $\delta = (\delta_1,\ldots,\delta_s)$ consisting of the symbols $0,1,\ldots,g-1$ appears with asymptotic frequency $1/g^s$ in the sequence $$\label{eq:a1} \alpha_1,\ldots,\alpha_n,\ldots $$ obtained from the expansion of $\alpha$ as an infinite fraction in base $g$, $$ \alpha = \frac{\alpha_1}{g} + \cdots + \frac{\alpha_n}{g^n} + \cdots \ . $$
In more detail, let $g>1$ be a natural number and let $$\label{eq:a2} (\alpha_1,\ldots,\alpha_s), (\alpha_2,\ldots,\alpha_{s+1}), \ldots $$ be the infinite sequence of $s$-tuples corresponding to \ref{eq:a1}. Let $N(n,\delta)$ denote the number of occurrences of the tuple $\delta = (\delta_1,\ldots,\delta_s)$ among the first $n$ tuples of \ref{eq:a2}. The number $$ \alpha = \frac{\alpha_1}{g} + \cdots + \frac{\alpha_n}{g^n} + \cdots \ . $$ is said to be normal if for any number $s$ and any given $s$-tuple $\delta$ consisting of the symbols $0,\ldots,g-1$, $$ \lim_{n \rightarrow \infty} \frac{N(n,s)}{ n } = \frac{1}{g^s} \ . $$
The concept of a normal number was introduced for $g=10$ by E. Borel (see [B], [B2], p. 197). He called a real number $\alpha$ weakly normal to the base $g$ if $$ \lim_{n \rightarrow \infty} \frac{N(n,\delta)}{n} = \frac{1}{g} $$ where $N(n,\delta)$ is the number of occurrences of $\delta$, $0 \le \delta \le g-1$, among the first $n$ terms of the sequences $\alpha_1,\alpha_2,\ldots$ and normal if $\alpha, g\alpha, g^2\alpha, \ldots$ are weakly normal to the bases $g, g^2, \ldots$. He also showed that for a normal number $$ \lim_{n \rightarrow \infty} \frac{N(n,s)}{ n } = \frac{1}{g^s} $$ for any $s$ and any given $s$-tuple $\delta = (\delta_1,\ldots,\delta_s)$. Later it was proved (see [Pi], [NZ], and also [Po]) that the last relation is equivalent to Borel's definition of a normal number.
A number $\alpha$ is called absolutely normal if it is normal with respect to every base $g$. The existence of normal and absolutely-normal numbers was established by Borel on the basis of measure theory. The construction of normal numbers in an explicit form was first achieved in [C]. Earlier (see [S], [L]) an effective procedure for constructing normal numbers was indicated. For other methods for constructing normal numbers and for connections between the concepts of normality and randomness see [Po].
Uniform distribution of the fractional parts $\{ \alpha g^x \}$, $x = 0, 1, \ldots$ on the interval $[0,1]$ is equivalent to $\alpha$ being normal.
References
[B] | E. Borel, "Les probabilités dénombrables et leurs applications arithmétiques" Rend. Circ. Math. Palermo , 27 (1909) pp. 247–271 Zbl 40.0283.01 |
[B2] | E. Borel, "Leçons sur la théorie des fonctions" , Gauthier-Villars (1928) MR0033328 Zbl 54.0327.02 |
[Pi] | S. Pillai, "On normal numbers" Proc. Indian Acad. Sci. Sect. A , 12 (1940) pp. 179–184 MR0002324 Zbl 0025.30802 Zbl 66.1212.02 |
[NZ] | I. Niven, H. Zuckerman, "On the definition of normal numbers" Pacific J. Math. , 1 (1951) pp. 103–109 MR0044560 Zbl 0042.26902 |
[C] | D.G. Champernowne, "The construction of decimals normal in the scale of ten" J. London Math. Soc. , 8 (1933) pp. 254–260 Zbl 0007.33701 Zbl 59.0214.01 |
[S] | W. Sierpiński, "Démonstration élémentaire d'un théorème de M. Borel sur les nombres absolument normaux et détermination effective d'un tel nombre" Bull. Soc. Math. France , 45 (1917) pp. 127–132 MR0073664 MR0055398 MR0021058 MR1550055 |
[L] | H. Lebesgue, "Sur certaines démonstrations d'existence" Bull. Soc. Math. France , 45 (1917) pp. 132–144 MR1504765 |
[Po] | A.G. Postnikov, "Arithmetic modelling of random processes" Trudy Mat. Inst. Steklov. , 57 (1960) (In Russian) |
Comments
Almost all numbers (with respect to Lebesgue measure) are normal with respect to every base $g$ (see e.g. Theorem 8.11 in [N] or section 9.13 of [HW]). It is not known whether familiar numbers like $\sqrt2,\,e,\,\pi$ are normal or not. Normal numbers are potentially interesting in the context of random number generators. A normal number to a base $g$ is necessarily irrational. The weakly-normal number (to base $10$) $0\cdot12345678901234567890\ldots$ is of course rational. The Champernowne number $x = 0\cdot1234567891011121314\ldots$, obtained as $x = 0 \cdot \alpha_1 \alpha_2 \alpha_3 \ldots$ where $\alpha_i$ stands for the group of digits representing $i$ to base $10$, is normal to base $10$ [C]. The same recipe works to obtain normal numbers to any given base.
References
[HW] | Hardy, G. H.; Wright, E. M. "An Introduction to the Theory of Numbers", Revised by D. R. Heath-Brown and J. H. Silverman. Foreword by Andrew Wiles. (6th ed.), Oxford: Oxford University Press (2008) [1938] ISBN 978-0-19-921986-5 Zbl 1159.11001 |
[N] | I. Niven, "Irrational numbers" , Math. Assoc. Amer. (1956) MR1570844 MR0080123 Zbl 0070.27101 |
Comments
The example of Champernowne's number as an explicitly normal number in base 10 was generalised by Copeland and Erdős [CE] who showed that if $a_n$ is an increasing sequence of natural numbers with the property that for every $\theta > 1$ then $a_n < n^\theta$ for sufficiently large $n$, then the number $0 \cdot \alpha_1 \alpha_2 \ldots$ is normal in base $g$ where $\alpha_n$ is the base $g$ expression of $a_n$. See also [B] pp.86-87.
References
[CE] | Copeland, A. H.; Erdős, P. "Note on normal numbers", Bulletin of the American Mathematical Society 52 (1946) 857–860, DOI 10.1090/S0002-9904-1946-08657-7 Zbl 0063.00962 |
[B] | Bugeaud, Yann. Distribution modulo one and Diophantine approximation, Cambridge Tracts in Mathematics 193, Cambridge: Cambridge University Press (2012) ISBN 978-0-521-11169-0, Zbl 1260.11001 |
Normal number. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Normal_number&oldid=33566