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  Are elementary particles actually more elementary than quasiparticles?

+ 11 like - 0 dislike
4409 views

Quarks and leptons are considered elementary particles, while phonons, holes, and solitons are quasiparticles.

In light of emergent phenomena, such as fractionally charged particles in fractional quantum Hall effect and spinon and chargon in spin-charge separation, are elementary particles actually more elementary than quasiparticles?

Does the answer simply depend on whether one is adopting a reductionist or emergent point of view?

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user leongz
asked Mar 6, 2012 in Theoretical Physics by leongz (70 points) [ no revision ]
retagged Apr 4, 2014

4 Answers

+ 10 like - 0 dislike

They are more elementary in the sense that there is no accepted underlying theory from which they can be derived as an effective approximation.

On the other hand, what is elementaty changes with time. At some time, protons and neutrons were considered to be elementary particles, whily they are now considered to be composed of quarks. There are various hypothetical theories in which the particles currently viewed as elementary are considered to be composed of even more elementary particles. The latter are called preons. See http://en.wikipedia.org/wiki/Preon

Thus if one of the preon theories would gain major acceptance, the currently accepted elementary partricles would get the status of quasiparticles of an effective theory (that would be the current standard model) deduced by coarse graining from the underlying preon theory.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Arnold Neumaier
answered Mar 6, 2012 by Arnold Neumaier (15,787 points) [ no revision ]
In fractional quantum Hall effect, the collective behavior of electrons resulted in new particles. But at the same time, these particles having fractional charge seem to be constituents of electrons. So, it seems as if electrons and the quasiparticles are actually the same thing, and there is no distinction between elementary and quasiparticles. The same argument works for spin-charge separation, where an electron results in a spinon and a chargon, which can be viewed as constituents of an electron.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user leongz
elementary = given by a field in the Lagrangian of a field theory from which the other particles can be derived. I haven't seen a Lagrangian for fractional Hall particles from which one can construct electrons as a bound state. So how can these particles be elementary?

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Arnold Neumaier
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Elementary particles, like photons and electrons, are not more elementary in the sense that there are underlying theories, such as quantum spin model on lattice, from which they can be derived as an effective approximation (see for example arXiv:hep-th/0302201).

In particular, the string-net condensation provides a unified origin for gauge interactions and Fermi statistics: Both elementary gauge bosons (such as photons, gluons) and elementary fermions (such as electrons, quarks) can emerge as quasi-particles in a quantum spin model on lattice if the quantum spin model has a "string-net condensed state" as its ground state. An comparison between the string-net approach and the superstring approach can be found here.

There is a falsifiable prediction from the string-net theory: all fermions (elementary or composite) must carry gauge charges (see cond-mat/0302460). The standard model contain composite fermions that are neutral for $U(1)\times SU(2)\times SU(3)$ gauge theory. So according to the string-net theory, the standard model is incomplete. The correct model should contain extra gauge theory, such as a $Z_2$ gauge theory. So the string-net theory predicts extra discrete gauge theory and new cosmic strings associated with the new discrete gauge theory.

The emergence approach may also produce (linear) quantum gravity from quantum spin models (see arXiv:0907.1203). However, the emergence approach (such as the string-net theory), so far, fail to produce the chiral coupling between the $SU(2)$ weak interaction and the fermions.

Note added: We now know that the emergence approach (such as the string-net theory) CAN produce the chiral coupling between the $SU(2)$ weak interaction and the fermions. See  http://arxiv.org/abs/1305.1045http://arxiv.org/abs/1307.7480 , http://arxiv.org/abs/1402.4151 .


This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Xiao-Gang Wen

answered May 27, 2012 by Xiao-Gang Wen (3,485 points) [ revision history ]
edited Apr 4, 2014 by Xiao-Gang Wen
Comments on the linked paper (of which I assume you are co-author): already in 1960, Skyrme showed how to get Fermions from bosonic fields, using a soliton in a scalar theory stabilized with quartic derivative terms (so not well defined), but where there is an extra topological term which makes the soliton (Baryon) a fermion. Balachandran Rajeev Nair, then Witten showed that this emerges in large N QCD with quarks, but Skyrme's model has no fundamental Fermions. Emergent fermions include bound-states of monopole-electron, and 1d examples a-plenty.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Ron Maimon
You can have Fermions emerge without Bosons and without Gauge fields, as in the 2d sine-Gordon model. This type of Fermionization of bosonic actions is typical in 2d. It is weird to say there should be an additional discrete gauge theory, and there is no argument I could see in the linked paper that supports this. Also Z_2 gauge symmetry does not give cosmic strings. This gauge theory does not have a real continuum limit.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Ron Maimon
@Ron: (a)When we give Skyrme-model a non-perturbative definition by putting it on a lattice and treating it as a bosonic model on lattice, then fermion can only emerge as a gauge charge. (The topo. term must come from underlying fermions.) In the string-net theory, we assume that the underlying degrees of freedom are bosonic (such as qubits). In this case fermion can only emerge as a gauge charge. (b)In 1D space the distinction between boson and fermion is not well defined. (c)All physical theories have a cutoff at the Plank scale. With finite cutoff, Z2 gauge theory does give cosmic strings.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Xiao-Gang Wen
a) You can put the topological term in by hand in the lattice, so no gauge fields. b) The distinction is well defined in 1d--- a fermion obeys Fermi-Dirac statistics, a boson doesn't--- it only becomes ambiguous with infinite repulsive forces, like bosons with infinite delta-repulsion which are the same as Fermions, c) The "cutoff" exists, but it isn't a lattice, but some sort of infrared-ultraviolet mixing (as in string theory). You're right about the string--- it's the defect where there is the nontrivial Z2 bundle on the circle at large distances.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Ron Maimon
@Ron: Yes, you can put the topological term in by hand in the lattice without gauge fields at lattice scale. I claim that for such bosonic quantum lattice model, it either has emergent fermion together with emergent gauge theory at low energies, or it has no emergent fermion at low energies.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Xiao-Gang Wen
Hmm, I think when you say "emergent gauge field" you are thinking of the topological term like a nontrivial bundle structure on the particles, and so it's like a remnant discrete gauge field from some microscopic gauge field that's broken or something. This is a possible point of view, but discrete gauge fields don't have to have propagating modes. There is no emergent gauge theory in the skyrme model that I can see, all you get are fermionic solitons and massless pions. But this is still an interesting point of view. I'll read the paper again now that I get where you're coming from.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Ron Maimon
In order to have emergent fermions from a bosonic lattice model, the ground state of the bosonic lattice model must has a non-tivial topological order, (say with topological ground state degeneracy on 3D torus $T^3$). Having an emergent discrete gauge theory is one way to have non-trivial topological order.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Xiao-Gang Wen
Also see a discussion here.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Xiao-Gang Wen
+ 4 like - 0 dislike

As you mention fractional quantum Hall effect, let me consider a system of $N$ electrons typical of a condensed matter system. Now think of your Hamiltonian as having two parts

$\hat{H} =\hat{H}_0+\hat{H}_{int}e^{-\zeta t}$ with $t >0$

so that you gradually switch-off the interacting part so that at large times you can map your complete Hamiltonian (with interactions) to your free Hamiltonian. If you can do that, the matrix elements of the interacting and non-interacting case will be identical.

In the Fermi liquid theory, the quasiparticles are understood as the excitations of an interacting many-body system. They correspond to the creation or annihilation of particles [electrons] and can be labeled by the same quantum numbers as the non-interacting states provided that:

  • The adiabatic procedure is valid (that is the energy of the state larger than the rate of change, $\varepsilon_{\mathbf{k}\sigma} \ll \zeta $, which is equivalent to assuming that $T\ll\zeta$ since typically $\varepsilon_{\mathbf{k}\sigma}\simeq T$.
  • The interactions do not induce transitions of the states in question, or in other words the life-time of the state must satisfy $\tau_{\text{life}} \gg \zeta^{-1}$.

Thus the quasiparticle concept only makes sense on time scales shorter than the quasiparticle life time and we must not thought of them as the exact eigenstates. On the other hand, electrons have infinite life time (understand infinite by very very large $\tau_{\text{life,e}}\simeq10^{26}$ years). The proper "elementary" particles are the electrons, not the quasiparticles. Again, quasiparticles refers just to the excitations of the system. Obviously, some properties of your system will be described only via the excitations of the whole system, these are the emergent properties you were talking about (fractional charge, fractional statistics...).

D.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user DaniH
answered Mar 6, 2012 by DaniH (60 points) [ no revision ]
This is not specific to quasiparticle. The concept of the top quark, say, also makes sense only on time scales shorter than its life-time. On longer scales, it is only a resonance. If only infinitely stable particles were considered elementary, we would just have up, down, the electron, and the neutrinos - not even photons.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Arnold Neumaier
I agree with you, I had in mind more the theory of Fermi liquids and electronic quasiparticles in the answer.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user DaniH
@DaniH: I have to admit a prejudice up-front--- I hate "adiabatic switching", it's a useless and obsolete tool of the 1950s that never seems to go away. There is rarely a case where it is done properly, it is never physical, and it's only purpose is to regulate infinite time integrals. There is no physical effect which depends on it, in particular your "lifetime>tau" is a nonsense condition. No downvote, but please fix.

This post imported from StackExchange Physics at 2014-04-04 16:13 (UCT), posted by SE-user Ron Maimon
+ 1 like - 0 dislike

Quasiparticles seem less elementary than elementary particles because they are excitations of a substrate made of elementary particles. If you remove the substrate, the quasiparticles disappear.

At the same time, to the extent that they are described by equivalent mathematical equations, quasiparticles seem elementary particles in their own right. If you only look at the mathematics of phonons, you can't tell that phonons are not elementary particles.

I think it's plausible that what we consider as elementary particles could be excitations of a more fundamental substrate, and what we consider as fundamental field theories could be effective field theories. See Volovik's "The Universe in a Helium Droplet" (a really fascinating book). But then, new research could show that the new fundamental particles and fields can be derived from the physics of a new even more fundamental layer, and so forth in an endless fractal descent.

Yes, I think the answer depends on one's point of view.

answered Feb 25, 2018 by Giulio Prisco (190 points) [ revision history ]

I would go further with saying that all "elementary particles" are some collective excitations since they are interacting particles and cannot be thought of as non-interacting ones. Non-interacting means non-observable, and we do not deal with non-observable phenomena in physics.

Interacting particle properties depend on what they interact with. I may say, they depend on the environment, which is factually a "source" and a "sink" for an interacting particle. Another wording for that is that the environment is a medium whose collective excitations we take for interacting particles.

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