Название: Foundations of Quantum Field Theory
Автор: Klaus D Rothe
Издательство: Ingram
Жанр: Физика
Серия: World Scientific Lecture Notes In Physics
isbn: 9789811221941
isbn:
It is easy to see that the matrix
is not equal to one unless Λ represents a pure boost colinear with
. In general RW represents a pure rotation — the so-called Wigner rotation — in the rest frame of the particle. We may thus make use of the completeness relationvalid in the rest frame of the particle in order to write (2.44) in the form
where we have made the identification
with D(s)[RW] a (2s + 1)-dimensional irreducible representation of the rotation group. We thus finally have
At this point we can now firmly establish the correctness of our choice of normalization factor in (2.46). To this end we start from the completeness relation
and multiply this relation from the left with U[Λ], and from the right with U−1[Λ]:
We now make use of (2.46) in order to rewrite this relation as
Making use of the unitarity of the matrix representation of the rotation group, we have
Hence we obtain from above
Recalling the transformation property of the integration measure, Eq. (2.43), the above expression reduces to
showing that our choice of normalization is consistent with the Lorentz covariance of the completeness relation.
2.6Transformation properties of zero-mass 1-particle states
We are now in the position of discussing the Lorentz transformation properties of zero-mass particle states. The transformation rules have been completely worked out by E. Wigner.11
In the case of zero mass particles we can no longer go into the rest frame of the particle to define a general state in terms of a Lorentz boost. In fact, it is well known that a massless particle of spin j is polarized either along or opposite to its direction of motion, corresponding to two possible helicity states. If parity is not conserved, there may exist but one helicity state, as is exemplified by the neutrino (anti-neutrino) with negative (positive) helicity. Correspondingly we expect these helicity states to transform under a one-dimensional representation, independent of the spin of the particle. Following Wigner, we choose for our “standard” state a particle moving in the positive z-direction with four-momentum
, and helicity . These states replace the states |s, σ in the massive case. Whereas the states |s, σ belong to a representation of the rotation group, the helicity states furnish a representation of the little group, a subgroup of the Lorentz group consisting of all homogeneous proper Lorentz transformations leaving our standard 4-vector invariant.In analogy to the massive case, we define the state of a massless particle of arbitrary momentum
by “boosting” the standard state > into the desired new state:where
μ into pμ,and μ in (2.48) is an arbitrary parameter with the dimensions of a mass. There are various ways of defining
; we shall make the choice12Here
is a “boost” along the z-axis with non-zero components (compare with (2.16)
To determine ϕ(|
|) we observe thatso that
We choose R(
and the z-axis) into the unit vector