Kummer's theorem

In mathematics, Kummer's theorem is a formula for the exponent of the highest power of a prime number p that divides a given binomial coefficient. In other words, it gives the p-adic valuation of a binomial coefficient. The theorem is named after Ernst Kummer, who proved it in a paper, (Kummer 1852).

Statement[edit]

Kummer's theorem states that for given integers n ≥ m ≥ 0 and a prime number p, the p-adic valuation $\nu _{p}\!{\tbinom {n}{m}}$ of the binomial coefficient ${\tbinom {n}{m}}$ is equal to the number of carries when m is added to n − m in base p.

An equivalent formation of the theorem is as follows:

Write the base- $p$ expansion of the integer $n$ as $n=n_{0}+n_{1}p+n_{2}p^{2}+\cdots +n_{r}p^{r}$ , and define $S_{p}(n):=n_{0}+n_{1}+\cdots +n_{r}$ to be the sum of the base- $p$ digits. Then

\nu _{p}\!{\binom {n}{m}}={\dfrac {S_{p}(m)+S_{p}(n-m)-S_{p}(n)}{p-1}}.

The theorem can be proved by writing ${\tbinom {n}{m}}$ as ${\tfrac {n!}{m!(n-m)!}}$ and using Legendre's formula.^[1]

Examples[edit]

To compute the largest power of 2 dividing the binomial coefficient ${\tbinom {10}{3}}$ write $m = 3$ and $n - m = 7$ in base $p = 2$ as $3 = 11 2$ and $7 = 111 2$ . Carrying out the addition $112 + 111 2 = 1010 2$ in base 2 requires three carries:

	₁	₁	₁
			1	1 ₂
+		1	1	1 ₂
	1	0	1	0 ₂

Therefore the largest power of 2 that divides ${\tbinom {10}{3}}=120=2^{3}\cdot 15$ is 3.

Alternatively, the form involving sums of digits can be used. The sums of digits of 3, 7, and 10 in base 2 are $S_{2}(3)=1+1=2$ , $S_{2}(7)=1+1+1=3$ , and $S_{2}(10)=1+0+1+0=2$ respectively. Then