Mathematical Methods of Physics/Riesz representation theorem

In this chapter, we will more formally discuss the bra ${\displaystyle |⟩}$ and ket ${\displaystyle ⟨|}$ notation introduced in the previous chapter.

Let ${\displaystyle \mathscr{H}}$ be a Hilbert space and let ${\displaystyle \ell :\mathscr{H}\to ℂ}$ be a continuous linear transformation. Then ${\displaystyle \ell }$ is said to be a linear functional on ${\displaystyle \mathscr{H}}$.

The space of all linear functionals on ${\displaystyle \mathscr{H}}$ is denoted as ${\displaystyle {\mathscr{H}}^{*}}$. Notice that ${\displaystyle {\mathscr{H}}^{*}}$ is a normed vector space on ${\displaystyle ℂ}$ with ${\displaystyle \Vert \ell \Vert =\sup \{\frac{|\ell (x)|}{\Vert x\Vert }:x\in \mathscr{H};\Vert x\Vert \ne 0\}}$

We also have the obvious definition, ${\displaystyle 𝐚,𝐛\in \mathscr{H}}$ are said to be orthogonal if ${\displaystyle 𝐚\cdot 𝐛=0}$. We write this as ${\displaystyle 𝐚\perp 𝐛}$. If ${\displaystyle A\subset \mathscr{H}}$ then we write ${\displaystyle 𝐛\perp A}$ if ${\displaystyle 𝐛\perp 𝐚\mathrm{\forall }𝐚\in A}$

Let ${\displaystyle \mathscr{H}}$ be a Hilbert space, let ${\displaystyle ℳ}$ be a closed subspace of ${\displaystyle \mathscr{H}}$ and let ${\displaystyle {ℳ}^{\perp }=\{x\in \mathscr{H}:(x\cdot a)=0\mathrm{\forall }a\in ℳ\}}$. Then, every ${\displaystyle z\in \mathscr{H}}$ can be written ${\displaystyle z=x+y}$ where ${\displaystyle x\in ℳ,y\in {ℳ}^{\perp }}$

Proof

Let ${\displaystyle \mathscr{H}}$ be a Hilbert space. Then, every ${\displaystyle \ell \in {\mathscr{H}}^{*}}$ (that is ${\displaystyle \ell }$ is a linear functional) can be expressed as an inner product.

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