Originally posted by loop quantum gravity
does p.t concern also with the multiples of a number, for example: the multiples of 4 are 2*2 and 4*1 meaning two?
p.s
i know that partition theory is concerned in the sums of a number (the partition of 4 is 5).
Loop, could you simply just refresh our memories about ordinary ADDITION partition theory?
Like, how do you figure out how many ways there are to write the number seven as a sum?
You are jumping ahead too fast. I cannot even remember the addition part.
I think that you would call the multiplication analog of that a theory of "factorization"
like how many ways can you factorize the number 24?
and I think that the main results having to do with factorization are theorems about prime numbers and prime factorization.
It would be a separate thing from the additive business you call "partitioning".
Partitioning is interesting in its own right. Even if you allow zero as a number and even if you count 2+3 and 3+2 as two separate partitions of 5. That is, you take account of the the order. I assume you know the "binomial coefficient" written as two numbers N and k in parens
and pronounced "N choose k"
/N\
\k/
and calculated N!/(k!(N-k)!)
You say "the partition of 4 is 5". How do you calculate that?
I don't happen to know a formula. Am not altogether sure what is meant either
4, 1+3, 2+2, 1+1+2, 1+1+1+1
well that is 5 all right
1 partition into one piece
2 partition into 2 pieces
1 partition into 3 pieces
1 partition into 4 pieces
adds up to 5 in all
you happen to know a formula?
