Talk:Gelfand–Naimark–Segal construction

The article doesn't define what a cyclic representation is, though it defines a cyclic vector and its relation to a cyclic representation...

how about one with a cyclic vector, :-)? Mct mht 07:51, 9 July 2007 (UTC)

Non-degeneracy

Hello,

I was confused at first, because I thought that non-degeneracy means that no vector should vanish under all ${\displaystyle \pi (x)}$. But I think that this is equivalent to the definition given in the article, since

${\displaystyle \bigcap _{x}\ker \pi (x)=\bigcap _{x}(\operatorname {im} \pi (x^{*}))^{\bot }=\left(\bigcup _{x}\operatorname {im} \pi (x^{*})\right)^{\bot }=\left(\bigcup _{x}\operatorname {im} \pi (x)\right)^{\bot }}$

So the intersection of the kernels is trivial iff the union of the images is dense, or am I missing something? Functor salad 19:26, 19 July 2007 (UTC)

that doesn't look right. why does the last equality hold? non-degeneracy means the Hilbert space is as small as can be. your condition that all operators ${\displaystyle \pi (x)}$ be injective is much more restrictive. take a full concrete algebra of bounded operators on some Hilbert space. this is already a nondegenerate representation but fails to satisfy your requirement. Mct mht 04:48, 24 July 2007 (UTC)

Hi,

I didn't require all ${\displaystyle \pi (x)}$ to be injective , just that for all nonzero ${\displaystyle v\in H}$, there exists an ${\displaystyle x\in A}$ such that ${\displaystyle \pi (x)v\neq 0}$ (This is already satisfied if at least one of the ${\displaystyle \pi (x)}$ is injective.)

The last equality holds because the union of something over all ${\displaystyle x\in A}$ is the same as the union over all ${\displaystyle x^{*}\in A}$, since ${\displaystyle \ ^{*}}$ is a bijection from ${\displaystyle A}$ to itself. Functor salad 11:05, 24 July 2007 (UTC)

ok, you're right. if there is some v that vanishes under all ${\displaystyle \pi (x)}$, then span{v} violates non-degeneracy. Mct mht 17:33, 24 July 2007 (UTC)

late late comment: what you wanna say is

${\displaystyle \bigcap _{x}\ker \pi (x)=\left(\bigvee _{x}\operatorname {im} \pi (x)\right)^{\bot },}$

where the V denotes the linear span. Mct mht 16:24, 13 October 2007 (UTC)

That's the same thing as what I said, since the orthogonal subspace is a linear subspace anyway. Functor salad 20:43, 13 October 2007 (UTC)

States and representations

Equivalence

The above shows that there is a bijective correspondence between positive linear functionals and cyclic representations. Two cyclic representations πφ and πψ with corresponding positive functionals φ and ψ are unitarily equivalent if and only if φ = α ψ for some positive number α.

This is definitely wrong. If u is a unitary element of A then for ${\displaystyle \psi (a):=\varphi (u^{*}au)}$ the representation ${\displaystyle \pi _{\psi }}$ is equivalent to ${\displaystyle \pi _{\varphi }}$ but in general ${\displaystyle \psi }$ will not be a multiple of ${\displaystyle \varphi }$. --- Matthias Lesch, Bonn.