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Revision History for A188068 (Bold, blue-underlined text is an addition; faded, red-underlined text is a deletion.)

Showing entries 1-10 | older changes
[nr]-[kr]-[nr-kr], where r=sqrt(3), k=1, [ ]=floor.
(history; published version)
#24 by Bruno Berselli at Tue Feb 07 02:45:48 EST 2017
STATUS

reviewed

approved

#23 by Joerg Arndt at Tue Feb 07 02:44:41 EST 2017
STATUS

proposed

reviewed

#22 by Michel Dekking at Tue Feb 07 01:05:00 EST 2017
STATUS

editing

proposed

#21 by Michel Dekking at Tue Feb 07 01:03:11 EST 2017
COMMENTS

A275855(n) = R(a(n)) for n>1, where R is the mirror morphism R(0)=1, R(1)=0, This can be shown by induction on the iterates of the two morphisms generating the sequences. - Michel Dekking, Feb 07 2017

STATUS

proposed

editing

Discussion
Tue Feb 07
01:04
Michel Dekking: Yes, I think it is enough to have it in the xrefs!
P.S. Note that I added another connection to a recently submitted sequence.
#20 by Michel Marcus at Tue Feb 07 00:19:16 EST 2017
STATUS

editing

proposed

#19 by Michel Marcus at Tue Feb 07 00:16:22 EST 2017
REFERENCES

REFERENCES J.-P. Allouche and J. Shallit, Automatic Sequences, Cambridge Univ. Press, 2003, p. 286.

STATUS

proposed

editing

Discussion
Tue Feb 07
00:19
Michel Marcus: Maybe "See also A188014." could go, since it is in the xrefs ?
#18 by Michel Dekking at Tue Feb 07 00:05:10 EST 2017
STATUS

editing

proposed

#17 by Michel Dekking at Mon Feb 06 23:55:08 EST 2017
COMMENTS

Sturmian word with slope alpha = sqrt(3)-1, and offset 0. Since alpha has a periodic continued fraction expansion with period 12, (a(n+1)) is the unique fixed point of the morphism 0 -> 110, 1 -> 1101. - Michel Dekking, Feb 06 2017

See also A188014.

REFERENCES

REFERENCES J.-P. Allouche and J. Shallit, Automatic Sequences, Cambridge Univ. Press, 2003, p. 286.

STATUS

approved

editing

Discussion
Mon Feb 06
23:58
Michel Dekking: I did put my comment BEFORE  the original "See also A188014. ", since this original comment is not really to the point for this sequence.
#16 by N. J. A. Sloane at Sat Oct 08 16:58:11 EDT 2016
STATUS

reviewed

approved

#15 by Joerg Arndt at Sat Oct 08 02:00:50 EDT 2016
STATUS

proposed

reviewed

Discussion
Sat Oct 08
03:11
Michel Marcus: Using a new formula ?