User:IssaRice/Taking inf and sup separately

This page describes a trick that is sometimes helpful in analysis.

Satement

Let $A$ and $B$ be bounded subsets of the real line. Suppose that for every $a \in A$ and $b \in B$ we have $a \geq b$ . Then $inf (A) \geq sup (B)$ .

Actually, do $A$ and $B$ have to be bounded? I think they can even be empty!

Proof

Let $a \in A$ and $b \in B$ be arbitrary. We have by hypothesis $a \geq b$ . Since $b$ is arbitrary, we have that $a$ is an upper bound of the set $B$ , so taking the superemum over $b$ we have $a \geq sup (B)$ (remember, $sup (B)$ is the least upper bound, whereas $a$ is just another upper bound). Since $a$ was arbitrary, we see that $sup (B)$ is a lower bound of the set $A$ . Taking the infimum over $a$ , we have $inf (A) \geq sup (B)$ , as required.

Applications

liminf vs limsup

Let $(a_{n})_{n = m}^{\infty}$ be a sequence of real numbers. Let $L^{-} : = {lim inf}_{n \to \infty} a_{n}$ and let $L^{+} : = {lim sup}_{n \to \infty} a_{n}$ . Then we have $L^{-} \leq L^{+}$ .

Consider the sequences $(a_{N}^{-})_{N = m}^{\infty}$ and $(a_{N}^{+})_{N = m}^{\infty}$ defined by $a_{N}^{-} : = inf (a_{n})_{n = N}^{\infty}$ and $a_{N}^{+} : = sup (a_{n})_{n = N}^{\infty}$ .

Now consider the sets $A : = {a_{N}^{+} : N \geq m}$ and $B : = {a_{N}^{-} : N \geq m}$ . If we can show that $a_{j}^{+} \geq a_{k}^{-}$ for arbitrary $j, k \geq m$ , then we can apply the trick to these sets to conclude that $L^{+} = inf (a_{N}^{+})_{N = m} inf (A) \geq sup (B) = sup (a_{N}^{-})_{N = m} = L^{-}$ .

Satement

Proof

Applications

liminf vs limsup

Lower and upper Riemann integral