Partitions of n where every element of the partition is different from 1 is p ( n )

Liberty Mack

Liberty Mack

Answered question

2022-05-21

Partitions of n where every element of the partition is different from 1 is p ( n ) p ( n 1 )
I am trying to prove that p(n| every element in the partition is different of 1 ) = p ( n ) p ( n 1 ), and I am quite lost... I have tried first giving a biyection between some sets, trying to draw an example in a Ferrers diagram and working on it... Nevertheless, I have not obtained significant results. Then, I have thought about generating functions; we know that the generating function of { p ( n ) } n N is i = 1 1 1 x i , so { p ( n 1 ) } n N will have i = 1 x 1 x i as generating function. So, what we have to prove is that i = 1 1 1 x i i = 1 x 1 x i = ( 1 -x). i = 1 1 1 x i is the generating function of p(n|every element in the partition is different of 1)... but i'm am not seeing why! Any help or hint will be appreciate it!

Answer & Explanation

sepolturamo

sepolturamo

Beginner2022-05-22Added 14 answers

Step 1
Totally: there are p(n) partitions of n.
You want to avoid the partitions which have a 1 in them. Do you see a natural bijection:
{ partitions of  n  with a  1 } { partitions of  n 1 } ??
(Hint: To go from the left to the right, simply delete a 1 from that partition.)
Step 2
Note that the set on the right has cardinality p ( n 1 ). Subtracting this from the total gives you the desired quantity.

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