

A192102


Number of distinct (unordered) pairs of partitions of a 9element set that have Rand distance n.


3



31572, 141624, 452508, 1341648, 3266172, 7234374, 12259368, 18992502, 23324140, 28129626, 26605908, 26190612, 21568932, 17119818, 13040280, 8948079, 6244308, 3679032, 2431044, 1250109, 640908, 315828, 197568, 57288, 46116, 30366, 25732, 7695, 4104, 2226, 3780, 2205, 1344, 378, 36, 1
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OFFSET

1,1


COMMENTS

The Rand distance of a pair of set partitions is the number of unordered pairs {x; y} such that there is a block in one partition containing both x and y, but x and y are in different blocks in the other partition.


LINKS

Table of n, a(n) for n=1..36.
F. Ruskey and J. Woodcock, The Rand and block distances of pairs of set partitions, Combinatorial algorithms, 287299, Lecture Notes in Comput. Sci., 7056, Springer, Heidelberg, 2011.


CROSSREFS

Cf. A192100 for set sizes 2..7. A192098 for set size 8.
Sequence in context: A321054 A234205 A236136 * A322123 A236062 A187728
Adjacent sequences: A192099 A192100 A192101 * A192103 A192104 A192105


KEYWORD

nonn,fini,full


AUTHOR

Frank Ruskey and Yuji Yamauchi (eugene.uti(AT)gmail.com), Aug 08 2011


STATUS

approved



