Musings

What book would you recommend for undergraduate particle physics and similar level/beginner QFT?

So, instead of giving the Schroedinger equation solution Psi the meaning of multi-particle thing, you insist that in the relativistic case we can have a one-particle equation (and theory) too. Is one free particle something we understand the best?

By this approach you keep compatibility with non-relativistic physics and with the majority of intro books on QFT, but may I suggest as a counterpoint taking QFT in a Wightman-like way, as about operator-valued distributions, presented as smeared by test functions, as $\hat\phi_f$? For the free field, we construct $\hat\phi_f$ as $\hat\phi_f=a_{f^*}+a_f^\dagger$, with commutator $$[a_f,a_g^\dagger]=(f,g)=\hbar\int \tilde f^*(k)2\pi\delta(k{\cdot}k-m^2)\theta(k_0)\tilde g(k)\frac{\mathrm{d}^4k}{(2\pi)^4}$$ and with the vacuum vector as zero eigenstate of $a_f|0\rangle=0$. This is the same for any bosonic field, just the positive semi-definite form $(f,g)$, presented in a manifestly Poincaré invariant way, is adjusted as necessary. $(f,g)$ fixes the two-point VEV, which fixes the free theory; we can take the test function space to be square-integrable functions, but it’s enough to take it to be functions that are smooth in real-space and in wave-number space. This approach gives us a state over the algebra that is freely generated by the $\hat\phi_f$, which allows us to GNS-construct a Hilbert space for the free field, without having to mention tensor products or a 1-particle Hilbert space.

This is intended to adapt the rather high mathematics of, say, Lett Math Phys (2017) 107:201–222, DOI:10.1007/s11005-016-0931-x, at an elementary to intermediate level.

FWIW, I find it helpful to think of a test function approach as a signal analysis formalism, in which $\hat\phi_f$ operates on the vacuum or other states as a stochastic modulation that is fixed by the $f$. Hilbert spaces are already natural in signal analysis because of the prevalence of Fourier and other transforms. Since all QFT models ultimately are grounded in experimental datasets that are (lossily compressed digital) records of signals (CERN gives us thousands of simultaneous signals, and the compression is very lossy indeed), this gives an alternative to thinking of QFT as about particles (even mentioning the word “particle” is such a bad thing to do to students). QFT is about signals, je propose.

Dear Jacques, I think that you overreact and it may be due to your not appreciating something.

There is a good reason why people say that one-particle relativistic quantum mechanics is no good. There is a reason why people say so. In other words, there is a refined statement of that spirit that is right.

You may truncate the Hilbert space to the one-particle subspace, indeed. But the point is that the Hilbert space of this theory isn’t equivalent to the space of wave functions that evolve locally.

To separate the one-particle Hilbert space, you need to “distinguish” the creation operators from annihilation operators in a QFT, and you can only do it non-locally, by looking at all modes of the quantum field.

In other, more physical words, the combination of relativity and QM automatically implies some phenomena characteristic of multiparticle QFT such as particles and antiparticles and their pair production. When a field is localized to the Compton wavelength or more, such things do happen. That’s why it’s not really consistent to probe the one-particle truncated theory at distances shorter than the Compton wavelength - the decoupling limit doesn’t exist.

Do you agree?

I asked: “Is one free particle something we understand the best?” and I think it is something we understand the worst. Because, in Classical Mechanics (Physics, not Mathematics) a single particle is an approximation with the corresponding inequalities. I will mention two ones: an extended body size is much smaller than the other sizes of the problem, so we content ourself with a point-like approximation (description). And the second one is that the extended body is permanently observable, say, due to emitting light. In other words, the body in question changes, not stays the same, and the light implies multi-photon emission, i.e., an inclusive picture. That is what I meant while saying about factually multi-particle picture of one-particle description. In my opinion, only this understanding may help us describe correctly interactions, which are already switched on in a one-particle description.

Dear Distler,

Already single particle does not make sense since even the electron cannot actually have a charge unless it interacts. That is what Dirac equation(e does not appear in it) says AND QFT.

Jaques,

The crucial idea required to wed quantum mechanics and relativity is the idea of antiparticles, which arise naturally when you try to understand the positive and negative energies that arise out of E^2 - p^2 = m^2.

If you just define a hamiltonian with the positive square root, it is a violation of relativity and will lead to superluminal signals.

I suggest you read Feynman’s “the reason for antiparticles”, which explains this nicely.

A quote:
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“If a function f(t) can be fourier decomposed into positive frequencies only f(t) = int_0^inifinity exp(-iwt) F(w) dw, then f cannot be zero for any finite range of t unless it is zero everywhere”

So as long as all energies are only postive, you canont confine it within the lightcone. You absolutely must have antiparticles.

It appears (from the handful of inquiries I’ve gotten since this was published — I just got another one yesterday) that the set of people both willing and able to compute the probability density (that I left as an exercise) is $\emptyset$.

So let me just record the answer.

where I’ve abbreviated $\omega_k=\sqrt{\vec{k}^2+m^2}$. The probability density, $J^0(\vec{r},t)$, is manifestly positive and normalized ( $$1=\langle\phi|\phi\rangle= \int\frac{d^3\vec{k}}{(2\pi)^3 2\omega_k} |\phi(\vec{k})|^2$$ implies $\int d^3\vec{r} J^0(\vec{r},t)=1$) and obeys the conservation equation

Manifestly, from (1), the probability density spreads no faster than the speed of light.

What you can’t do (which many seem to want to do) is demand that $J^0(\vec{r},0)$ vanish outside of some compact region in $\mathbb{R}^3$. That’s just not compatible with the normalizability of $|\phi\rangle$ and finiteness of the energy: $\langle\phi|\phi\rangle=1$, $\langle\phi|H|\phi\rangle\lt\infty$.