ON SMALL BASES FOR WHICH 1 HAS COUNTABLY MANY EXPANSIONS. Issue 2 (22nd January 2016)

Record Type:: Journal Article
Title:: ON SMALL BASES FOR WHICH 1 HAS COUNTABLY MANY EXPANSIONS. Issue 2 (22nd January 2016)
Main Title:: ON SMALL BASES FOR WHICH 1 HAS COUNTABLY MANY EXPANSIONS
Authors:: Zou, Yuru
Wang, Lijin
Lu, Jian
Baker, Simon
Abstract:: Abstract : Let q ∈ ( 1, 2 ) . A q ‐expansion of a number x in [ 0, 1 / ( q ‐ 1 ) ] is a sequence ( δ i ) i = 1 ∞ ∈ { 0, 1 } N satisfying x = ∑ i = 1 ∞ δ i q i . Let B ℵ 0 denote the set of q for which there exists x with a countable number of q ‐expansions, and let B 1, ℵ 0 denote the set of q for which 1 has a countable number of q ‐expansions. In Erdős et al [On the uniqueness of the expansions 1 = ∑ i = 1 ∞ q ‐ n i . Acta Math. Hungar. 58 (1991), 333–342] it was shown that min B ℵ 0 = min B 1, ℵ 0 = ( 1 + 5 ) / 2, and in S. Baker [On small bases which admit countably many expansions. J. Number Theory 147 (2015), 515–532] it was shown that B ℵ 0 ∩ ( ( 1 + 5 ) / 2, q 1 ] = { q 1 }, where q 1 ( ≈ 1 . 64541 ) is the positive root of x 6 ‐ x 4 ‐ x 3 ‐ 2 x 2 ‐ x ‐ 1 = 0 . In this paper we show that the second smallest point of B 1, ℵ 0 is q 3 ( ≈ 1 . 68042 ), the positive root of x 5 ‐ x 4 ‐ x 3 ‐ x + 1 = 0 . En route to proving this result, we show that B ℵ 0 ∩ ( q 1, q 3 ] = { q 2, q 3 }, where q 2 ( ≈ 1 . 65462 ) is the positive root of x 6 ‐ 2 x 4 ‐ x 3 ‐ 1 = 0 .
Is Part Of:: Mathematika. Volume 62:Issue 2(2016)
Journal:: Mathematika
Issue:: Volume 62:Issue 2(2016)
Issue Display:: Volume 62, Issue 2 (2016)
Year:: 2016
Volume:: 62
Issue:: 2
Issue Sort Value:: 2016-0062-0002-0000
Page Start:: 362
Page End:: 377
Publication Date:: 2016-01-22
Subjects:: 11A63 (primary) -- 37A45 (secondary)
Mathematics -- Periodicals
510.5
Journal URLs:: http://journals.cambridge.org/action/displayJournal?jid=MTK ↗
https://londmathsoc.onlinelibrary.wiley.com/journal/20417942 ↗
http://onlinelibrary.wiley.com/ ↗
DOI:: 10.1112/S002557931500025X ↗
Languages:: English
ISSNs:: 0025-5793
Deposit Type:: Legaldeposit
View Content:: Available online (eLD content is only available in our Reading Rooms) ↗
Physical Locations:: British Library DSC - BLDSS-3PM
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Ingest File:: 14224.xml