Excellent, did you use a program or just debug my attempt by eye? On Wed, Dec 7, 2011 at 3:26 PM, Veit Elser <ve10@cornell.edu> wrote:
For n=8 you left out 1223. I got a(8)=16 and a(9)=23. This sequence is not in OEIS.
Veit
On Dec 7, 2011, at 2:28 PM, Allan Wechsler wrote:
Define a(n) as the number of "necklace partitions" of n with elements not exceeding 3.
If my calculations are right, then OEIS does not contain this sequence. I have:
[1]: a(1) = 1
[11, 2]: a(2) = 2
[111, 12, 3]: a(3) = 3
[1111, 112, 13, 22]: a(4) = 4
[11111, 1112, 113, 122, 23]: a(5) = 5
[111111, 11112, 1113, 1122, 1212, 123, 222, 33]: a(6) = 8
[1111111, 111112, 11113, 11122, 11212, 1123, 1213, 1222, 133, 223]: a(7) = 10
[11111111, 1111112, 111113, 111122, 111212, 11123, 112112, 11213, 11222, 1133, 12122, 1232, 1313, 2222, 233]: a(8) = 15
[111111111, 11111112, 1111113, 1111122, 1111212, 111123, 1112112, 111213, 111222, 11133, 112113, 112122, 11232, 11313, 121212, 12132, 12213, 12222, 1233, 1323, 2223, 333]: a(9) = 22
And OEIS returns no hits for 1,2,3,4,5,8,10,15,22. Perhaps I've miscounted, and I would appreciate confirmation before we submit a new sequence.
On Wed, Dec 7, 2011 at 12:31 PM, Dan Asimov <dasimov@earthlink.net> wrote:
Another math-fun member, using a brief Mathematica program, also found 88. It looks as though that's the correct answer.
(Though, I haven't yet compared the two sets of output, the other of which is in terms of 1's, 2's, and 3's.)
--Dan
Tom Duff wrote:
<< On Tue, 6 Dec 2011, math-fun-request@mailman.xmission.com wrote:
Date: Tue, 6 Dec 2011 16:17:33 -0800 (GMT-08:00) From: Dan Asimov <dasimov@earthlink.net> To: math-fun <math-fun@mailman.xmission.com> Subject: Re: [math-fun] Counting problem Message-ID: <
10736092.1323217054054.JavaMail.root@elwamui-norfolk.atl.sa.earthlink.net>
Content-Type: text/plain; charset=UTF-8
Ha -- and in my spare moments today I counted 87 (by hand).
So, can we split the difference and agree on 86 ?
--Dan
Allan wrote:
<< As luck would have it, this afternoon I had a boring staff meeting in
which
I enumerated all of them ... I think. And the answer is 85 ... I think.
I found 88. Here they are. Where is my mistake? (Each string has 3 for a 30 degree angle, 6 for 60, 9 for 90. These are the lexicographically smallest representatives of their equivalence classes.)
It goes without saying that .
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