Simplification of expression (related to multinomial theorem). Is there a simplified way to write the following: sum_{r_1+r_2+cdots+r_n=t,r_k in mathbb{N}}(t!)/(r_1!r_2!cdots r_n!)prod_{k=1}^nf(k)^{r_k}

potrefilizx

potrefilizx

Answered question

2022-09-05

Simplification of expression (related to multinomial theorem)
Is there a simplified way to write the following:
r 1 + r 2 + + r n = t , r k N t ! r 1 ! r 2 ! r n ! k = 1 n f ( k ) r k
This is very similar to the multinomial theorem formula, however instead of r k being non-negative, r k is a natural number. In an expansion this is equivalent to just taking the values where every term is exponentiated to a power of one or greater, for example in the expansion of ( a + b + c ) 4 just taking 3 ( 2 a 2 b c + 2 a b 2 c + 2 a b c 2 ).

Answer & Explanation

esacefp

esacefp

Beginner2022-09-06Added 11 answers

Step 1
Obviously t > n, otherwise the sum is empty, so you could just take the multinomial coefficient
( t n r 1 , . . . , r n )
where each r i { 0 , 1 , 2 , . . . } and then you just add 1 to each exponent. That works as in the original question each ri is at least one, so we can just remove that and subtract n times 1 from the top of the multinomial coefficient. This yields the final formula
r 1 + . . . + r n = t n ( t n r 1 , . . . , r n ) k = 1 n f ( k ) r k + 1
Step 2
which simplifies using the multinomial theorem to
k = 1 n f ( k ) ( r 1 + . . . + r n = t n ( t n r 1 , . . . , r n ) k = 1 n f ( k ) r k ) = k = 1 n f ( k ) ( k = 1 n f ( k ) ) t n

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