Interesting that the ratio of consecutive terms seems to be < 2, while the ratio for ordinary polyominos is (likely) > 4. Rich ----- Quoting Robert Munafo <mrob27@gmail.com>:
I forgot to give a link -- my web page for the sequence is here:
http://mrob.com/pub/math/seq-a181785.html
On Sun, May 8, 2011 at 01:59, Robert Munafo <mrob27@gmail.com> wrote:
I have now implemented the "disklike polyomino" algorithm [...]
1, 1, 2, 5, 10, 25, 48, 107, 193, 365, 621, 1082, 1715
I have submitted this sequence to OEIS as A181785<http://oeis.org/A181785> .
I have also created a web page for the sequence, which includes pictures of the "disklike" polyominoes for N=6 and N=7.
-- Robert Munafo -- mrob.com Follow me at: fb.com/mrob27 - twitter.com/mrob_27 - mrob27.wordpress.com- youtube.com/user/mrob143 - rilybot.blogspot.com _______________________________________________ math-fun mailing list math-fun@mailman.xmission.com http://mailman.xmission.com/cgi-bin/mailman/listinfo/math-fun