Generalizing the Heisenberg uncertainty relation

Chisolm, Eric D.

doi:10.1119/1.1317561

Cited by 20 publications

(36 citation statements)

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“…The correlation (72), and therefore γ, vanish for the wave function (112) with A = Q, B = P . In our case the parameter γ here describes the correlations (98). A combination of γ and s, namely |σ| 2 = γ 2 + s 2 determines the squeezing properties of the distribution [see Eq.…”

Section: ] [1])mentioning

confidence: 99%

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Quantization of the canonically conjugate pair angle and orbital angular momentum

Kastrup¹

2006

Phys. Rev. A

162

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The question how to quantize a classical system where an angle ϕ is one of the basic canonical variables has been controversial since the early days of quantum mechanics. The problem is that the angle is a multivalued or discontinuous variable on the corresponding phase space. The remedy is to replace ϕ by the smooth periodic functions cos ϕ and sin ϕ. In the case of the canonical pair (ϕ, p ϕ ) , p ϕ : orbital angular momentum (OAM), the phase space S ϕ,pϕ = {ϕ ∈ R mod 2π, p ϕ ∈ R} has the global topological structure S 1 × R of a cylinder on which the Poisson brackets of the three functions cos ϕ, sin ϕ and p ϕ obey the Lie algebra of the euclidean group E(2) in the plane. This property provides the basis for the quantization of the system in terms of irreducible unitary representations of the group E(2) or of its covering groups. A crucial point is that -due to the fact that the subgroup SO(2) ∼ = S 1 is multiply connected -these representations allow for fractional OAM l = (n + δ), n ∈ Z, δ ∈ [0, 1). Such δ = 0 have already been observed in cases like the Aharonov-Bohm and the fractional quantum Hall effects and they correspond to the quasi-momenta of Bloch waves in ideal crystals. The proposal of the present paper is to look for fractional OAM in connection with the quantum optics of Laguerre-Gaussian laser modes in external magnetic fields. The quantum theory of the phase space S ϕ,pϕ in terms of unitary representations of E(2) allows for two types of "coherent" states the properties of which are discussed in detail: Non-holomorphic minimal uncertainty states and holomorphic ones associated with Bargmann-Segal Hilbert spaces.PACS number(s): 03.65. Fd, 78.20.Ls

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Section: ] [1])mentioning

confidence: 99%

“…Finally, there seems to be no chance to derive the existence of quasi-OAM δ by starting from finite dimensional vector spaces! Other authors [98][99][100] discussed related problems associated with uncertainty relations for wave functions on the circle.…”

Section: Appendices a The "Fault" Of The Anglementioning

confidence: 99%

Quantization of the canonically conjugate pair angle and orbital angular momentum

Kastrup¹

2006

Phys. Rev. A

162

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“…whereφ is a mean value of the observable. Using the Cauchy inequality | Ψ 1 |Ψ 2 | |Ψ 1 | · |Ψ 2 |, one gets [4,11]:…”

Section: One-dimensional Manifoldmentioning

confidence: 99%

“…In the case of two dimensions one can write: are written down in terms of old variables, ϑ and ϕ. Commutational relations η ,p η = i , ξ ,p ξ = i , p η ,p ξ = 0 can be verified directly but, as in section 2, one has to remember that the lhs of these equations are not defined for the majority of states (it is again a question of periodicity). One may derive uncertainty relations in two different ways: either using the δ-function approach and a relation analogous to (4) or applying the inequality (3). In any case the result is ∆η · ∆p η 0, ∆ξ · ∆p ξ 0.…”

Section: Coordinates On Spherementioning

confidence: 99%