Proof of Fekete’s subadditive lemma

If there is a $m$ such that $a_{m}=-\infty$ , then, by subadditivity, we have $a_{n}=-\infty$ for all $n>m$ . Then, both sides of the equality are $-\infty$ , and the theorem holds. So, we suppose that $a_{n}\in\textbf{R}$ for all $n$ . Let $L=\inf_{n}\frac{a_{n}}{n}$ and let $B$ be any number greater than $L$ . Choose $k\geq 1$ such that

\frac{a_{k}}{k}<B

For $n>k$ , we have, by the division algorithm there are integers $p_{n}$ and $q_{n}$ such that $n=p_{n}k+q_{n}$ , and $0\leq q_{n}\leq k-1$ . Applying the definition of subadditivity many times we obtain:

a_{n}=a_{p_{n}k+q_{n}}\leq a_{p_{n}k}+a_{q_{n}}\leq p_{n}a_{k}+a_{q_{n}}

So, dividing by $n$ we obtain:

\frac{a_{n}}{n}\leq\frac{p_{n}k}{n}\frac{a_{k}}{k}+\frac{a_{q_{n}}}{n}

When $n$ goes to infinity, $\frac{p_{n}k}{n}$ converges to $1$ and $\frac{a_{q_{n}}}{n}$ converges to zero, because the numerator is bounded by the maximum of $a_{i}$ with $0\leq i\leq k-1$ . So, we have, for all $B>L$ :

L\leq\lim_{n}\frac{a_{n}}{n}\leq\frac{a_{k}}{k}<B

Finally, let $B$ go to $L$ and we obtain

L=\inf_{n}\frac{a_{n}}{n}=\lim_{n}\frac{a_{n}}{n}

Title	Proof of Fekete’s subadditive lemma
Canonical name	ProofOfFeketesSubadditiveLemma
Date of creation	2014-03-18 14:41:50
Last modified on	2014-03-18 14:41:50
Owner	Filipe (28191)
Last modified by	Filipe (28191)
Numerical id	3
Author	Filipe (28191)
Entry type	Proof