“Wigner's classification”的意思、由来-开放百科全书

词条

Wigner's classification

释义

Massive scalar fields
The theory of projective representations
Further information
See also
References

In mathematics and theoretical physics, Wigner's classification

is a classification of the nonnegative (E ≥ 0) energy irreducible unitary representations of the Poincaré group which have sharp{{definition|date=October 2016}} mass eigenvalues. (Since this group is noncompact, these unitary representations are infinite-dimensional.)

It was introduced by Eugene Wigner, to classify particles and fields in physics—see the article particle physics and representation theory. It relies on the stabilizer subgroups of that group, dubbed the Wigner little groups of various mass states.

The Casimir invariants of the Poincaré group are {{math|C₁ {{=}} P^μP_μ}}, where {{mvar|P}} is the 4-momentum operator, and {{math|1=C₂ = W^αW_α}}, where {{mvar|W}} is the Pauli–Lubanski pseudovector. The eigenvalues of these operators serve to label the representations. The first is associated with mass-squared and the second with helicity or spin.

The physically relevant representations may thus be classified according to whether {{math|m > 0}} ; {{math|m {{=}} 0}} but {{math|P₀ > 0}}; and {{math|m {{=}} 0}} with {{math| P^μ {{=}} 0}}. Wigner found that massless particles are fundamentally different from massive particles.

For the first case, note that the eigenspace (see generalized eigenspaces of unbounded operators) associated with {{math|P {{=}}(m,0,0,0)}} is a representation of SO(3). In the ray interpretation, one can go over to Spin(3) instead. So, massive states are classified by an irreducible Spin(3) unitary representation that characterizes their spin, and a positive mass, {{mvar|m}}.
For the second case, look at the stabilizer of {{math|P {{=}}(k,0,0,-k)}}. This is the double cover of SE(2) (see unit ray representation). We have two cases, one where irreps are described by an integral multiple of 1/2 called the helicity, and the other called the "continuous spin" representation.
The last case describes the vacuum. The only finite-dimensional unitary solution is the trivial representation called the vacuum.

Massive scalar fields

As an example, let us visualize the irreducible unitary representation with {{math|m > 0}} and {{math|s {{=}} 0}}. It corresponds to the space of massive scalar fields.

Let {{mvar|M}} be the hyperboloid sheet defined by:

, .

The Minkowski metric restricts to a Riemannian metric on {{mvar|M}}, giving {{mvar|M}} the metric structure of a hyperbolic space, in particular it is the hyperboloid model of hyperbolic space, see geometry of Minkowski space for proof. The Poincare group {{mvar|P}} acts on {{mvar|M}} because (forgetting the action of the translation subgroup {{math|ℝ⁴}} with addition inside {{mvar|P}}) it preserves the Minkowski inner product, and an element {{mvar|x}} of the translation subgroup {{math|ℝ⁴}} of the Poincare group acts on {{math|L²(M)}} by multiplication by suitable phase multipliers {{math|exp(−i p·x)}}, where {{math|p ∈ M}}. These two actions can be combined in a clever way using induced representations to obtain an action

of {{mvar|P}} on {{math|L²(M)}} that combines motions of {{mvar|M}} and phase multiplication.

This yields an action of the Poincare group on the space of square-integrable functions defined on the hypersurface {{mvar|M}} in Minkowski space. These may be viewed as measures defined on Minkowski space that are concentrated on the set {{mvar|M}} defined by

,

The Fourier transform (in all four variables) of such measures yields positive-energy,{{clarify|reason=What does this mean?|date=October 2016}} finite-energy solutions of the Klein–Gordon equation defined on Minkowski space, namely

without physical units. In this way, the {{math|m > 0, s {{=}} 0}} irreducible representation of the Poincare group is realized by its action on a suitable space of solutions of a linear wave equation.

The theory of projective representations

Physically, one is interested in irreducible projective unitary representations of the Poincaré group. After all, two vectors in the quantum Hilbert space that differ by multiplication by a constant represent the same physical state. Thus, two unitary operators that differ by a multiple of the identity have the same action on physical states. Therefore the unitary operators that represent Poincaré symmetry are only defined up to a constant—and therefore the group composition law need only hold up to a constant.

According to Bargmann's theorem, every projective unitary representation of the Poincaré group comes for an ordinary unitary representation of its universal cover, which is a double cover. (Bargmann's theorem applies because the double cover of the Poincaré group admits no non-trivial one-dimensional central extensions.)

Passing to the double cover is important because it allows for fractional spin cases. In the positive mass case, for example, the little group is SU(2) rather than SO(3); the representations of SU(2) then include both integer and fractional spin cases.

Since the general criterion in Bargmann's theorem was not known when Wigner did his classification, he needed to show by hand (Section 5 of the paper) that the phases can be chosen in the operators to reflect the composition law in the group, up to a sign, which is then accounted for by passing to the double cover of the Poincaré group.

Further information

Left out from this classification are tachyonic solutions, solutions with no fixed mass, infraparticles with no fixed mass, etc. Such solutions are of physical importance, when considering virtual states. A celebrated example is the case of Deep inelastic scattering, in which a virtual space-like photon is exchanged between the incoming lepton and the incoming hadron. This justifies the introduction of transversely and longitudinally-polarized photons, and of the related concept of transverse and longitudinal structure functions, when considering these virtual states as effective probes of the internal quark and gluon contents of the hadrons. From a mathematical point of view, one considers the SO(2,1) group instead of the usual SO(3) group encountered in the usual massive case discussed above. This explain the occurrence of two transverse polarization vectors and

which satisfy and , to be compared with the usual case of a free boson which has three polarization vectors , each of them satisfying .

References

{{cite journal|ref=harv|last1=Bargmann|first1= V.|authorlink1=Valentine Bargmann|last2=Wigner|first2=E. P.|authorlink2=E. P. Wigner|year=1948|title=Group theoretical discussion of relativistic wave equations|journal=Proc. Natl. Acad. Sci. U.S.A.|volume=34|issue=5|pages=211–23|url=https://www.ncbi.nlm.nih.gov/pmc/articles/PMC1079095/pdf/pnas01706-0041.pdf|doi=

10.1073/pnas.34.5.211|bibcode=1948PNAS...34..211B|pmc=1079095|pmid=16578292}}

{{cite book|ref=harv|first=George|last=Mackey|authorlink=George Mackey|title=Unitary Group Representations in Physics, Probability and Number Theory|series=Mathematics Lecture Notes Series|volume=55|year=1978|isbn=978-0805367034|publisher=The Benjamin/Cummings Publishing Company}}.
{{cite book|ref=harv|first=Shlomo|last=Sternberg|authorlink=Shlomo Sternberg|title=Group Theory and Physics|year=1994|at=Section 3.9. (Wigner classification)|publisher=Cambridge University Press|isbn=978-0521248709}}
{{cite book|ref=harv|first=Wu-Ki|last=Tung|title=Group Theory in Physics|year=1985|at=Chapter 10. (Representations of the Lorentz group and of the Poincare group; Wigner classification)|publisher=World Scientific Publishing Company|isbn=978-9971966577}}
{{citation|last=Weinberg|first=S|authorlink=Steven Weinberg|year=2002|title=The Quantum Theory of Fields, vol I|isbn=0-521-55001-7|at=Chapter 2 (Relativistic quantum mechanics)|publisher=Cambridge University Press}}
{{citation|first=E. P.|last=Wigner|authorlink=Eugene Wigner|title=On unitary representations of the inhomogeneous Lorentz group|journal=Annals of Mathematics|issue=1|volume=40|pages=149–204|year=1939|doi=10.2307/1968551|mr=1503456 |bibcode = 1939AnMat..40..149W }}

3 : Representation theory of Lie groups|Quantum field theory|Mathematical physics

随便看

开放百科全书收录14589846条英语、德语、日语等多语种百科知识，基本涵盖了大多数领域的百科知识，是一部内容自由、开放的电子版国际百科全书。

Massive scalar fields

The theory of projective representations

Further information

See also

References