[seqfan] Re: Patterns of congruence classes modulo 2^n in reduced Collatz sequences

[M. F. Hasler]

Bob,
You may save the file in PDF and add it as A-file.
But personally I think it would be nice if such complements would be
written as pages on the OEIS wiki. (If it is too long for a wiki page (but
the are which have more than 10 pages on paper), then it can often divided
up in subtopics which may merit their own pagee.)
It avoids the need to upload revised versions and allows anyone to fix bugs
and add complements and improvements.
At the bottom of the wiki pages, due credit is given to contibutors but in
particular to the author of the original version.

Maximilian
Le 25 avr. 2015 01:41, "Bob Selcoe" <rselcoe at entouchonline.net> a écrit :

> Hi Seqfans,
>
> I recently found (what I think are) some interesting patterns in reduced
> Collatz sequences (i.e. rows in A256598).  The patterns are not obvious,
> but they appear to be quite regular.  Namely, the starting terms (S) can be
> treated as unique members of congruence classes modulo 2^n.  Membership
> determines how many steps it takes from S to reach the first term < its
> preimage (D), and how many halving steps it takes from that preimage to
> reach D.   There's an easy method for determining membership, and a way to
> streamline calculations.  The least residues are easily put into array and
> triangle forms for analysis.
>
> This all may be well-understood (does any of this sound familiar??) or old
> hat; but even if so, I think the array is worth contributing to OEIS.  The
> problem is, there's a bit more information needed to describe how the
> residues are calculated and how to interpret them than easily fits into an
> OEIS entry.  I started to create the entry and ended up writing a brief
> outline of a paper (about 3 pages in Word) which I may be able to edit
> down, but it's still a bit much.  So, I was hoping there might be a way to
> put the outline on the OEIS somewhere, and use it as a linked reference.
>
> Is that possible?  If so, how?  If not, are there any suggestions on how I
> might proceed?  Or, is anyone familiar with any papers that specifically
> discuss the main idea about this type of congruence relation, which might
> serve as a link??  I've done my best to decipher some online sources by
> Jeff Lagarias and others, but I couldn't find anything on the subject (or
> perhaps I did and couldn't understand it!).   Anyway, I just want to
> contribute the entry, so any help is greatly appreciated.
>
> Thanks in advance,
> Bob Selcoe
>
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