Mass, charge, momentum, angular momentum, moment of inertiaĬovariant phase space, Euler-Lagrange equationsĮxtended topological quantum field theory To understand something in the standard model, you have to understand something that isn't in the standard model, and is arguably in conflict with it.Physics, mathematical physics, philosophy of physics Surveys, textbooks and lecture notesĮxperiment, measurement, computable physics The standard model doesn't tell you anything about this, so you end up in something of a catch-22 situation. So the mass gap concerns the way in pair production you form an electromagnetic wave into a spin ½ standing-wave spinor called the electron. And that in atomic orbitals electrons exist as standing waves. In particular I'd say it's important to appreciate that space has particular properties associated with E=hf electromagnetic waves. Now, my question is, this property has been discovered experimentally and computationally but how can it be understood from a theoretical point of view?īy looking outside the standard model. However that isn't part of the standard model. Check out Hans Ohanian’s 1984 paper what is spin? Pair production works the way that it does and the electron has the mass it has for a good reason. But an electron isn't going past you at c like a photon. The wave nature of matter is not in doubt. It's not a good idea to make assumptions in physics. The energy of the vacuum is zero by definition and assuming that all energy states can be thought of as particles in plane-waves, the mass gap is the mass of the lightest". "the mass gap is the difference in energy between the lowest energy state, the vacuum, and the next lowest energy state. Think of the extra mass of the mirror-box as resistance to change of motion for a wave going round and round at c. Think of photon momentum as resistance to change of motion for a wave moving linearly at c.
See by van der Mark and (not the Nobel) 't Hooft.
When you open the box, it's a radiating body that loses mass. When you trap a massless photon in a mirror-box, you increase the mass of that system. As Einstein said, "the mass of a body is a measure of its energy-content". IMHO quantum particles such as the electron have a positive mass whilst electromagnetic waves are massless because of E=mc².
#Yang mills mass gap supersync free#
Especially when the gluons in ordinary hadrons are virtual, and we've never ever seen a free quark.ĭepends on a subtle quantum mechanical property called the "mass gap" as we know: the quantum particles have positive masses, even though the classical waves travel at the speed of light. Who says it's successful? The nuclear force remains one of the unsolved problems in physics: "What is the nature of the nuclear force that binds protons and neutrons into stable nuclei and rare isotopes? What is the origin of simple patterns in complex nuclei?" Forces between quarks and gluons doesn't make up for that.
The successful use of Yang-Mills theory to describe the strong interactions of elementary particles. Thus the mass gap can be understood not only physically in terms of the content of the field theory, but also in terms of the behaviour of correlations which have geometrical implications, namely the extension of the theory to other four-manifolds.įor an elaboration of the status of the problem and further insights, see here. $$|\langle \Omega, \mathcal O (\vec x) \mathcal O (\vec y) \Omega\rangle |\leq e^$$įor some $C < \Delta$. The mass gap itself can be understood that the Hamiltonian $H$ has no spectrum in $(0,\Delta)$. Whilst the problem is stated in some generality for any simple compact gauge group $G$, for the case of $SU(3)$, the strong interaction, a proof has not been shown yet.įor an understanding of the problem itself, see the official description. Prove that for any compact simple gauge group $G$, a non-trivial Yang-Mills theory exists on $\mathbb R^4$ and has a mass gap $\Delta >0$. A true theoretical understanding of the Yang-Mills mass gap is a major open problem in physics and mathematics in fact, it is one of the seven Millennium prize problems, stated as follows:
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