Measure Theory/L2 Inner Product Space

We have defined, in Lesson 0, the inner product for ${\displaystyle L^2(E)}$. However, when calling something by the name "inner product" we mean to communicate a few properties. We should ensure that our inner product,

${\displaystyle ⟨f,g⟩=\underset{E}{\int }fg}$

deserves the name.

Besides justifying the name, out of a sense of principle, these properties will also be useful common manipulations in the proofs of the theorems that we care about -- the most important, for this section, being completeness.

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Recall that you have already decided what ${\displaystyle \overrightarrow{0}}$ is when the vector space in question is ${\displaystyle L^2(E)}$, in the previous lesson, Lesson 1.

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Show that the ${\displaystyle L^2(E)}$ inner product is symmetric and linear. (This should be trivial.)

Also show that for every ${\displaystyle \overrightarrow{v}\in V}$, we have ${\displaystyle \Vert \overrightarrow{v}{\Vert }_2\ge 0}$.

Also show that ${\displaystyle \Vert \overrightarrow{0}{\Vert }_2=0}$.

Now consider proving that if ${\displaystyle \Vert \overrightarrow{v}\Vert =0}$ then ${\displaystyle \overrightarrow{v}=\overrightarrow{0}}$. First show that, in fact, there is a function ${\displaystyle f\in {ℒ}^2(E)}$ for which ${\displaystyle \underset{E}{\int }{f}^2=0}$ even though ${\displaystyle f\ne 0}$.

Next recall that, technically, ${\displaystyle L^2(E)}$ is a set of equivalence classes. Recalling also a result from a previous section, prove that if ${\displaystyle \Vert \overrightarrow{v}{\Vert }_2=0}$ then as an equality of equivalence classes, it follows that ${\displaystyle \overrightarrow{v}=\overrightarrow{0}}$.

Conclude that the ${\displaystyle L^2(E)}$ inner product, is an inner product on ${\displaystyle L^2(E)}$.

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Show that every inner product space is a normed space, and infer that ${\displaystyle L^2(E)}$ is a normed space with norm ${\displaystyle \Vert \overrightarrow{v}{\Vert }_2=⟨\overrightarrow{v},\overrightarrow{v}⟩}$.

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Prove that every normed space is a metric space, and infer that ${\displaystyle L^2(E)}$ is a metric space with metric ${\displaystyle d(\overrightarrow{v},\overrightarrow{w})=\Vert \overrightarrow{v}-\overrightarrow{w}{\Vert }_2}$.

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