0,4

This sequence shows the cycle type of each finite permutation (A195663) as the index number of the corresponding partition. (When a permutation has a 3-cycle and a 2-cycle, this corresponds to the partition 3+2, etc.) Partitions can be ordered, so each partition can be denoted by its index in this order, e.g. 6 for the partition 3+2. Compare A194602.

From the properties of A194602 follows:

Entries 1,2,4,6,10,14,21...     ( A000041(n)-1 from n=2 ) correspond to permutations with exactly one n-cycle (and no other cycles).

Entries 1,3,7,15,30,56,101...   ( A000041(2n-1) from n=1 ) correspond to permutations with exactly n 2-cycles (and no other cycles), so these are the symmetric permutations.

Entries n = 1,3,4,7,9,10,12...  ( A194602(n) has an even binary digit sum ) correspond to even permutations. This goes along with the fact, that a permutation is even when its partition contains an even number of even addends.

(Compare "Table for A194602" in section LINKS. Concerning the first two properties see especially the end of this file.)

Tilman Piesk, Table of n, a(n) for n = 0..5039

Tilman Piesk, Table including permutations of 8 elements and partitions written as sums for n = 0..40319

Tilman Piesk, Permutations by cycle type (Wikiversity article)

Tilman Piesk, Table for A194602

Cf. A195663, A195664, A055089 (ordered finite permutations).

Cf. A194602 (ordered partitions interpreted as binary numbers).

Cf. A181897 (number of n-permutations with cycle type k).

Sequence in context: A057431 A179541 A057060 * A152805 A064894 A003638

Adjacent sequences:  A198377 A198378 A198379 * A198381 A198382 A198383

nonn

Tilman Piesk, Oct 23 2011

Changed offset to 0 by Tilman Piesk, Jan 25 2012

approved