formed by concatenating all binary strings in shortlex order, clearly contains all the binary strings and so is disjunctive. (The spaces above are not significant and are present solely to make clear the boundaries between strings). The complexity function of a disjunctive sequence S over an alphabet of size k is pS(n) = kn.[1]
Any normal sequence (a sequence in which each string of equal length appears with equal frequency) is disjunctive, but the converse is not true. For example, letting 0n denote the string of length n consisting of all 0s, consider the sequence
obtained by splicing exponentially long strings of 0s into the shortlex ordering of all binary strings. Most of this sequence consists of long runs of 0s, and so it is not normal, but it is still disjunctive.
A disjunctive sequence is recurrent but never uniformly recurrent/almost periodic.
The following result[2][3] can be used to generate a variety of disjunctive sequences:
If a1, a2, a3, ..., is a strictly increasing infinite sequence of positive integers such that limn → ∞ (an+1 / an) = 1,
then for any positive integer m and any integer baseb ≥ 2, there is an an whose expression in base b starts with the expression of m in base b.
(Consequently, the infinite sequence obtained by concatenating the base-b expressions for a1, a2, a3, ..., is disjunctive over the alphabet {0, 1, ..., b-1}.)
Two simple cases illustrate this result:
an = nk, where k is a fixed positive integer. (In this case, limn → ∞ (an+1 / an) = limn → ∞ ( (n+1)k / nk ) = limn → ∞ (1 + 1/n)k = 1.)
A rich number or disjunctive number is a real number whose expansion with respect to some base b is a disjunctive sequence over the alphabet {0,...,b−1}. Every normal number in base b is disjunctive but not conversely. The real number x is rich in base b if and only if the set { x bn mod 1} is dense in the unit interval.[5]
A number that is disjunctive to every base is called absolutely disjunctive or is said to be a lexicon. Every string in every alphabet occurs within a lexicon. A set is called "comeager" or "residual" if it contains the intersection of a countable family of open dense sets. The set of absolutely disjunctive reals is residual.[6] It is conjectured that every real irrational algebraic number is absolutely disjunctive.[7]
^Calude, C.; Priese, L.; Staiger, L. (1997), Disjunctive sequences: An overview, University of Auckland, New Zealand, pp. 1–35, CiteSeerX10.1.1.34.1370
^Nakai, Yoshinobu; Shiokawa, Iekata (1992), "Discrepancy estimates for a class of normal numbers" (PDF), Acta Arithmetica, LXII.3 (3): 271–284, doi:10.4064/aa-62-3-271-284
Adamczewski, Boris; Bugeaud, Yann (2010). "8. Transcendence and diophantine approximation". In Berthé, Valérie; Rigo, Michael (eds.). Combinatorics, automata, and number theory. Encyclopedia of Mathematics and its Applications. Vol. 135. Cambridge: Cambridge University Press. pp. 410–451. ISBN978-0-521-51597-9. Zbl 1271.11073.
Calude, C.S.; Zamfirescu, T. (1999). "Most numbers obey no probability laws". Publicationes Mathematicae Debrecen. 54 (Supplement): 619–623.
January 01, 1970
disjunctive, sequence, disjunctive, sequence, infinite, sequence, over, finite, alphabet, characters, which, every, finite, string, appears, substring, instance, binary, champernowne, sequence, displaystyle, ldots, formed, concatenating, binary, strings, short. A disjunctive sequence is an infinite sequence over a finite alphabet of characters in which every finite string appears as a substring For instance the binary Champernowne sequence 0 1 00 01 10 11 000 001 displaystyle 0 1 00 01 10 11 000 001 ldots formed by concatenating all binary strings in shortlex order clearly contains all the binary strings and so is disjunctive The spaces above are not significant and are present solely to make clear the boundaries between strings The complexity function of a disjunctive sequence S over an alphabet of size k is pS n kn 1 Any normal sequence a sequence in which each string of equal length appears with equal frequency is disjunctive but the converse is not true For example letting 0n denote the string of length n consisting of all 0s consider the sequence 0 0 1 1 0 2 00 0 4 01 0 8 10 0 16 11 0 32 000 0 64 displaystyle 0 0 1 1 0 2 00 0 4 01 0 8 10 0 16 11 0 32 000 0 64 ldots obtained by splicing exponentially long strings of 0s into the shortlex ordering of all binary strings Most of this sequence consists of long runs of 0s and so it is not normal but it is still disjunctive A disjunctive sequence is recurrent but never uniformly recurrent almost periodic Contents 1 Examples 2 Rich numbers 3 Notes 4 ReferencesExamples editThe following result 2 3 can be used to generate a variety of disjunctive sequences If a1 a2 a3 is a strictly increasing infinite sequence of positive integers such that lim n an 1 an 1 then for any positive integer m and any integer base b 2 there is an an whose expression in base b starts with the expression of m in base b Consequently the infinite sequence obtained by concatenating the base b expressions for a1 a2 a3 is disjunctive over the alphabet 0 1 b 1 Two simple cases illustrate this result an nk where k is a fixed positive integer In this case lim n an 1 an lim n n 1 k nk lim n 1 1 n k 1 E g using base ten expressions the sequences123456789101112 k 1 positive natural numbers 1491625364964 k 2 squares 182764125216343 k 3 cubes etc dd are disjunctive on 0 1 2 3 4 5 6 7 8 9 an pn where pn is the nth prime number In this case lim n an 1 an 1 is a consequence of pn n ln n E g the sequences23571113171923 using base ten 10111011111011110110001 using base two etc dd are disjunctive on the respective digit sets Another result 4 that provides a variety of disjunctive sequences is as follows If an floor f n where f is any non constant polynomial with real coefficients such that f x gt 0 for all x gt 0 then the concatenation a1a2a3 with the an expressed in base b is a normal sequence in base b and is therefore disjunctive on 0 1 b 1 E g using base ten expressions the sequences 818429218031851879211521610 with f x 2x3 5x2 11x 591215182124273034 with f x px e dd are disjunctive on 0 1 2 3 4 5 6 7 8 9 Rich numbers editA rich number or disjunctive number is a real number whose expansion with respect to some base b is a disjunctive sequence over the alphabet 0 b 1 Every normal number in base b is disjunctive but not conversely The real number x is rich in base b if and only if the set x bn mod 1 is dense in the unit interval 5 A number that is disjunctive to every base is called absolutely disjunctive or is said to be a lexicon Every string in every alphabet occurs within a lexicon A set is called comeager or residual if it contains the intersection of a countable family of open dense sets The set of absolutely disjunctive reals is residual 6 It is conjectured that every real irrational algebraic number is absolutely disjunctive 7 Notes edit Bugeaud 2012 p 91 Calude C Priese L Staiger L 1997 Disjunctive sequences An overview University of Auckland New Zealand pp 1 35 CiteSeerX 10 1 1 34 1370 Istrate G Păun Gh 1994 Some combinatorial properties of self reading sequences Discrete Applied Mathematics 55 83 86 doi 10 1016 0166 218X 94 90037 X Zbl 0941 68656 Nakai Yoshinobu Shiokawa Iekata 1992 Discrepancy estimates for a class of normal numbers PDF Acta Arithmetica LXII 3 3 271 284 doi 10 4064 aa 62 3 271 284 Bugeaud 2012 p 92 Calude amp Zamfirescu 1999 Adamczewski amp Bugeaud 2010 p 414References editAdamczewski Boris Bugeaud Yann 2010 8 Transcendence and diophantine approximation In Berthe Valerie Rigo Michael eds Combinatorics automata and number theory Encyclopedia of Mathematics and its Applications Vol 135 Cambridge Cambridge University Press pp 410 451 ISBN 978 0 521 51597 9 Zbl 1271 11073 Bugeaud Yann 2012 Distribution modulo one and Diophantine approximation Cambridge Tracts in Mathematics Vol 193 Cambridge Cambridge University Press ISBN 978 0 521 11169 0 Zbl 1260 11001 Calude C S Zamfirescu T 1999 Most numbers obey no probability laws Publicationes Mathematicae Debrecen 54 Supplement 619 623 Retrieved from https en wikipedia org w index php title Disjunctive sequence amp oldid 1187771705, wikipedia, wiki, book, books, library,
