Meson

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Short description: Subatomic particle; made of equal numbers of quarks and antiquarks
Mesons
Meson nonet - spin 0.svg
Mesons of spin 0 form a nonet
Compositioncomposite: quarks and antiquarks
Statisticsbosonic
Interactionsstrong, weak, electromagnetic and gravity
TheorizedHideki Yukawa (1935)
Discovered1947
Types~140 (List)
Massfrom 134.9 MeV/c2 (
π0
)
to 9.460 GeV/c2 (
ϒ
)
electric charge−1 e, 0 e, +1 e
Spinħ, 1 ħ

In particle physics, a meson (/ˈmzɒn, ˈmɛzɒn/) is a type of hadronic subatomic particle composed of an equal number of quarks and antiquarks, usually one of each, bound together by the strong interaction. Because mesons are composed of quark subparticles, they have a meaningful physical size, a diameter of roughly one femtometre (10−15 m),[1] which is about 0.6 times the size of a proton or neutron. All mesons are unstable, with the longest-lived lasting for only a few tenths of a nanosecond. Heavier mesons decay to lighter mesons and ultimately to stable electrons, neutrinos and photons.

Outside the nucleus, mesons appear in nature only as short-lived products of very high-energy collisions between particles made of quarks, such as cosmic rays (high-energy protons and neutrons) and baryonic matter. Mesons are routinely produced artificially in cyclotrons or other particle accelerators in the collisions of protons, antiprotons, or other particles.

Higher-energy (more massive) mesons were created momentarily in the Big Bang, but are not thought to play a role in nature today. However, such heavy mesons are regularly created in particle accelerator experiments that explore the nature of the heavier quarks that compose the heavier mesons.

Mesons are part of the hadron particle family, which are defined simply as particles composed of two or more quarks. The other members of the hadron family are the baryons: subatomic particles composed of odd numbers of valence quarks (at least 3), and some experiments show evidence of exotic mesons, which do not have the conventional valence quark content of two quarks (one quark and one antiquark), but 4 or more.

Because quarks have a spin 1/2, the difference in quark number between mesons and baryons results in conventional two-quark mesons being bosons, whereas baryons are fermions.

Each type of meson has a corresponding antiparticle (antimeson) in which quarks are replaced by their corresponding antiquarks and vice versa. For example, a positive pion (π+) is made of one up quark and one down antiquark; and its corresponding antiparticle, the negative pion (π), is made of one up antiquark and one down quark.

Because mesons are composed of quarks, they participate in both the weak interaction and strong interaction. Mesons with net electric charge also participate in the electromagnetic interaction. Mesons are classified according to their quark content, total angular momentum, parity and various other properties, such as C-parity and G-parity. Although no meson is stable, those of lower mass are nonetheless more stable than the more massive, and hence are easier to observe and study in particle accelerators or in cosmic ray experiments. The lightest group of mesons is less massive than the lightest group of baryons, meaning that they are more easily produced in experiments, and thus exhibit certain higher-energy phenomena more readily than do baryons. But mesons can be quite massive: for example, the J/Psi meson (J/ψ) containing the charm quark, first seen 1974,[2][3] is about three times as massive as a proton, and the upsilon meson (ϒ) containing the bottom quark, first seen in 1977,[4] is about ten times as massive.

History

From theoretical considerations, in 1934 Hideki Yukawa[5][6] predicted the existence and the approximate mass of the "meson" as the carrier of the nuclear force that holds atomic nuclei together.[7] If there were no nuclear force, all nuclei with two or more protons would fly apart due to electromagnetic repulsion. Yukawa called his carrier particle the meson, from μέσος mesos, the Greek word for "intermediate", because its predicted mass was between that of the electron and that of the proton, which has about 1,836 times the mass of the electron. Yukawa or Carl David Anderson, who discovered the muon, had originally named the particle the "mesotron", but he was corrected by the physicist Werner Heisenberg (whose father was a professor of Greek at the University of Munich). Heisenberg pointed out that there is no "tr" in the Greek word "mesos".[8]

The first candidate for Yukawa's meson, in modern terminology known as the muon, was discovered in 1936 by Carl David Anderson and others in the decay products of cosmic ray interactions. The "mu meson" had about the right mass to be Yukawa's carrier of the strong nuclear force, but over the course of the next decade, it became evident that it was not the right particle. It was eventually found that the "mu meson" did not participate in the strong nuclear interaction at all, but rather behaved like a heavy version of the electron, and was eventually classed as a lepton like the electron, rather than a meson. Physicists in making this choice decided that properties other than particle mass should control their classification.

There were years of delays in the subatomic particle research during World War II (1939–1945), with most physicists working in applied projects for wartime necessities. When the war ended in August 1945, many physicists gradually returned to peacetime research. The first true meson to be discovered was what would later be called the "pi meson" (or pion). During 1939–1942, Debendra Mohan Bose and Bibha Chowdhuri exposed Ilford half-tone photographic plates in the high altitude mountainous regions of Darjeeling, and observed long curved ionizing tracks that appeared to be different from the tracks of alpha particles or protons. In a series of articles published in Nature, they identified a cosmic particle having an average mass close to 200 times the mass of electron.[9] This discovery was made in 1947 with improved full-tone photographic emulsion plates, by Cecil Powell, Hugh Muirhead, César Lattes, and Giuseppe Occhialini, who were investigating cosmic ray products at the University of Bristol in England , based on photographic films placed in the Andes mountains.[10] Some of those mesons had about the same mass as the already-known mu "meson", yet seemed to decay into it, leading physicist Robert Marshak to hypothesize in 1947 that it was actually a new and different meson. Over the next few years, more experiments showed that the pion was indeed involved in strong interactions. The pion (as a virtual particle) is also believed to be the primary force carrier for the nuclear force in atomic nuclei. Other mesons, such as the virtual rho mesons are involved in mediating this force as well, but to a lesser extent. Following the discovery of the pion, Yukawa was awarded the 1949 Nobel Prize in Physics for his predictions.

For a while in the past, the word meson was sometimes used to mean any force carrier, such as "the Z0 meson", which is involved in mediating the weak interaction.[11] However, this use has fallen out of favor, and mesons are now defined as particles composed of pairs of quarks and antiquarks.

Overview

Spin, orbital angular momentum, and total angular momentum

Spin (quantum number S) is a vector quantity that represents the "intrinsic" angular momentum of a particle. It comes in increments of 1/2 ħ.[upper-alpha 1]

Quarks are fermions—specifically in this case, particles having spin 1/2 ( S = 1/2 ). Because spin projections vary in increments of 1 (that is 1 ħ), a single quark has a spin vector of length 1/2, and has two spin projections, either ( Sz = +1/2 or Sz = +1/2 ). Two quarks can have their spins aligned, in which case the two spin vectors add to make a vector of length S = 1 , with three possible spin projections ( Sz = +1, Sz = 0, and Sz = −1), and their combination is called a vector meson or spin-1 triplet. If two quarks have oppositely aligned spins, the spin vectors add up to make a vector of length S = 0, and only one spin projection ( Sz = 0 ), called a scalar meson or spin-0 singlet. Because mesons are made of one quark and one antiquark, they are found in triplet and singlet spin states. The latter are called scalar mesons or pseudoscalar mesons, depending on their parity (see below).

There is another quantity of quantized angular momentum, called the orbital angular momentum (quantum number L), that is the angular momentum due to quarks orbiting each other, and also comes in increments of 1 ħ. The total angular momentum (quantum number J) of a particle is the combination of the two intrinsic angular momentums (spin) and the orbital angular momentum. It can take any value from J = |LS| up to J = |L + S| , in increments of 1.

Meson angular momentum quantum numbers for L = 0, 1, 2, 3
S L P J JP
0 0 0 0
1 + 1 1+
2 2 2
3 + 3 3+
1 0 1 1
1 + 2, 0 2+, 0+
2 3, 1 3, 1
3 + 4, 2 4+, 2+

Particle physicists are most interested in mesons with no orbital angular momentum (L = 0), therefore the two groups of mesons most studied are the S = 1; L = 0 and S = 0; L = 0, which corresponds to J = 1 and J = 0, although they are not the only ones. It is also possible to obtain J = 1 particles from S = 0 and L = 1. How to distinguish between the S = 1, L = 0 and S = 0, L = 1 mesons is an active area of research in meson spectroscopy.[12]

P-parity

Main page: Physics:Parity

P-parity is left-right parity, or spatial parity, and was the first of several "parities" discovered, and so is often called just “parity”. If the universe were reflected in a mirror, most laws of physics would be identical—things would behave the same way regardless of what we call "left" and what we call "right". This concept of mirror reflection is called parity (P). Gravity, the electromagnetic force, and the strong interaction all behave in the same way regardless of whether or not the universe is reflected in a mirror, and thus are said to conserve parity (P-symmetry). However, the weak interaction does distinguish "left" from "right", a phenomenon called parity violation (P-violation).

Based on this, one might think that, if the wavefunction for each particle (more precisely, the quantum field for each particle type) were simultaneously mirror-reversed, then the new set of wavefunctions would perfectly satisfy the laws of physics (apart from the weak interaction). It turns out that this is not quite true: In order for the equations to be satisfied, the wavefunctions of certain types of particles have to be multiplied by −1, in addition to being mirror-reversed. Such particle types are said to have negative or odd parity (P = −1, or alternatively P = −), whereas the other particles are said to have positive or even parity (P = +1, or alternatively P = +).

For mesons, parity is related to the orbital angular momentum by the relation:[13][14]

[math]\displaystyle{ P = \left( -1 \right)^{L + 1} }[/math]

where the L is a result of the parity of the corresponding spherical harmonic of the wavefunction. The "+1" comes from the fact that, according to the Dirac equation, a quark and an antiquark have opposite intrinsic parities. Therefore, the intrinsic parity of a meson is the product of the intrinsic parities of the quark (+1) and antiquark (−1). As these are different, their product is −1, and so it contributes the "+1" that appears in the exponent.

As a consequence, all mesons with no orbital angular momentum (L = 0) have odd parity (P = −1).

C-parity

C-parity is only defined for mesons that are their own antiparticle (i.e. neutral mesons). It represents whether or not the wavefunction of the meson remains the same under the interchange of their quark with their antiquark.[15] If

[math]\displaystyle{ |q\bar{q}\rangle = |\bar{q}q\rangle }[/math]

then, the meson is "C even" (C = +1). On the other hand, if

[math]\displaystyle{ |q\bar{q}\rangle = -|\bar{q}q\rangle }[/math]

then the meson is "C odd" (C = −1).

C-parity rarely is studied on its own, but more commonly in combination with P-parity into CP-parity. CP-parity was originally thought to be conserved, but was later found to be violated on rare occasions in weak interactions.[16][17][18]

G-parity

Main page: Physics:G-parity

G-parity is a generalization of the C-parity. Instead of simply comparing the wavefunction after exchanging quarks and antiquarks, it compares the wavefunction after exchanging the meson for the corresponding antimeson, regardless of quark content.[19]

If

[math]\displaystyle{ |q_1\bar{q}_2\rangle = |\bar{q}_1 q_2\rangle }[/math]

then, the meson is "G even" (G = +1). On the other hand, if

[math]\displaystyle{ |q_1\bar{q}_2\rangle = -|\bar{q}_1 q_2\rangle }[/math]

then the meson is "G odd" (G = −1).

Isospin and charge

Main page: Physics:Isospin

Combinations of one u, d, or s quark and one u, d, or s antiquark in JP = 0 configuration form a nonet.
Combinations of one u, d, or s quark and one u, d, or s antiquark in JP = 1 configuration also form a nonet.

Original isospin model

The concept of isospin was first proposed by Werner Heisenberg in 1932 to explain the similarities between protons and neutrons under the strong interaction.[20] Although they had different electric charges, their masses were so similar that physicists believed that they were actually the same particle. The different electric charges were explained as being the result of some unknown excitation similar to spin. This unknown excitation was later dubbed isospin by Eugene Wigner in 1937.[21]

When the first mesons were discovered, they too were seen through the eyes of isospin and so the three pions were believed to be the same particle, but in different isospin states.

The mathematics of isospin was modeled after the mathematics of spin. Isospin projections varied in increments of 1 just like those of spin, and to each projection was associated a "charged state". Because the "pion particle" had three "charged states", it was said to be of isospin I = 1 . Its "charged states" π+, π0, and π, corresponded to the isospin projections I3 = +1 , I3 = 0 , and I3 = −1 respectively. Another example is the "rho particle", also with three charged states. Its "charged states" ρ+, ρ0, and ρ, corresponded to the isospin projections I3 = +1 , I3 = 0 , and I3 = −1 respectively.

Replacement by the quark model

This belief lasted until Murray Gell-Mann proposed the quark model in 1964 (containing originally only the u, d, and s quarks).[22] The success of the isospin model is now understood to be an artifact of the similar masses of the u and d quarks. Because the u and d quarks have similar masses, particles made of the same number of them also have similar masses.

The exact u and d quark composition determines the charge, because u quarks carry charge ++2/3 whereas d quarks carry charge +1/3. For example, the three pions all have different charges

but they all have similar masses (c. 140 MeV/c2) as they are each composed of a same total number of up and down quarks and antiquarks. Under the isospin model, they were considered a single particle in different charged states.

After the quark model was adopted, physicists noted that the isospin projections were related to the up and down quark content of particles by the relation

[math]\displaystyle{ I_3 = \frac{1}{2}\left[\left(n_\text{u} - n_\bar{\text{u}}\right) - \left(n_\text{d} - n_\bar{\text{d}}\right)\right], }[/math]

where the n-symbols are the count of up and down quarks and antiquarks.

In the "isospin picture", the three pions and three rhos were thought to be the different states of two particles. However, in the quark model, the rhos are excited states of pions. Isospin, although conveying an inaccurate picture of things, is still used to classify hadrons, leading to unnatural and often confusing nomenclature.

Because mesons are hadrons, the isospin classification is also used for them all, with the quantum number calculated by adding I3 = +1/2 for each positively charged up-or-down quark-or-antiquark (up quarks and down antiquarks), and I3 = −1/2 for each negatively charged up-or-down quark-or-antiquark (up antiquarks and down quarks).

Flavour quantum numbers

The strangeness quantum number S (not to be confused with spin) was noticed to go up and down along with particle mass. The higher the mass, the lower (more negative) the strangeness (the more s quarks). Particles could be described with isospin projections (related to charge) and strangeness (mass) (see the uds nonet figures). As other quarks were discovered, new quantum numbers were made to have similar description of udc and udb nonets. Because only the u and d mass are similar, this description of particle mass and charge in terms of isospin and flavour quantum numbers only works well for the nonets made of one u, one d and one other quark and breaks down for the other nonets (for example ucb nonet). If the quarks all had the same mass, their behaviour would be called symmetric, because they would all behave in exactly the same way with respect to the strong interaction. However, as quarks do not have the same mass, they do not interact in the same way (exactly like an electron placed in an electric field will accelerate more than a proton placed in the same field because of its lighter mass), and the symmetry is said to be broken.

It was noted that charge (Q) was related to the isospin projection (I3), the baryon number (B) and flavour quantum numbers (S, C, B′, T) by the Gell-Mann–Nishijima formula:[23]

[math]\displaystyle{ Q = I_3 + \frac{1}{2}(B + S + C + B^\prime + T), }[/math]

where S, C, B′, and T represent the strangeness, charm, bottomness and topness flavour quantum numbers respectively. They are related to the number of strange, charm, bottom, and top quarks and antiquark according to the relations:

[math]\displaystyle{ \begin{align} S &= -(n_\text{s} - n_\bar{\text{s}}) \\ C &= +(n_\text{c} - n_\bar{\text{c}}) \\ B^\prime &= -(n_\text{b} - n_\bar{\text{b}}) \\ T &= +(n_\text{t} - n_\bar{\text{t}}), \end{align} }[/math]

meaning that the Gell-Mann–Nishijima formula is equivalent to the expression of charge in terms of quark content:

[math]\displaystyle{ Q=\frac{2}{3}[(n_\text{u}-n_\bar{\text{u}})+(n_\text{c}-n_\bar{\text{c}})+(n_\text{t}-n_\bar{\text{t}})]-\frac{1}{3}[(n_\text{d}-n_\bar{\text{d}})+(n_\text{s}-n_\bar{\text{s}})+(n_\text{b}-n_\bar{\text{b}})]. }[/math]

Classification

Mesons are classified into groups according to their isospin (I), total angular momentum (J), parity (P), G-parity (G) or C-parity (C) when applicable, and quark (q) content. The rules for classification are defined by the Particle Data Group, and are rather convoluted.[24] The rules are presented below, in table form for simplicity.

Types of meson

Mesons are classified into types according to their spin configurations. Some specific configurations are given special names based on the mathematical properties of their spin configuration.

Types of mesons[25]
Type S L P J JP
Pseudoscalar meson 0 0 0 0
Pseudovector meson 0, 1 1 + 1 1+
Vector meson 1 0, 2 1 1
Scalar meson 1 1 + 0 0+
Tensor meson 1 1, 3 + 2 2+

Nomenclature

Flavourless mesons

Flavourless mesons are mesons made of pair of quark and antiquarks of the same flavour (all their flavour quantum numbers are zero: S = 0, C = 0, B′ = 0, T = 0).[lower-roman 1] The rules for flavourless mesons are:[24]

Nomenclature of flavourless mesons
qq content   I   JPC [lower-roman 2]
0−+, 2−+, 4−+, ... 1+−, 3+−, 5+−, ... 1−−, 2−−, 3−−, ... 0++, 1++, 2++, ...
ud
[math]\displaystyle{ \mathrm{\tfrac{u\bar{u} - d\bar{d}}{\sqrt{2}}} }[/math]
du
1 pion+
pion0
pion-
b+
b0
b
rho+
rho0
rho-
a+
a0
a
Mix of
uu, dd, ss
0 Eta
Eta prime
h
h′
omega meson
phi meson
f
f′
cc 0 Charmed Eta hc ψ[lower-roman 3] χc
bb 0 Bottom Eta hb Upsilon χb
tt 0 Top Eta ht Theta meson χt
  1. For the purpose of nomenclature, the isospin projection I3 is treated as if it were not a flavour quantum number. This means that the charged pion-like mesons (π±, a±, b±, and ρ± mesons) follow the rules of flavourless mesons, even if they aren't truly "flavourless".
  2. C-parity is only relevant for neutral mesons.
  3. For the special case JPC=1−−, the ψ is called the J/Psi
In addition
  • When the spectroscopic state of the meson is known, it is added in parentheses.
  • When the spectroscopic state is unknown, mass (in MeV/c2) is added in parentheses.
  • When the meson is in its ground state, nothing is added in parentheses.

Flavoured mesons

Flavoured mesons are mesons made of pair of quark and antiquarks of different flavours. The rules are simpler in this case: The main symbol depends on the heavier quark, the superscript depends on the charge, and the subscript (if any) depends on the lighter quark. In table form, they are:[24]

Nomenclature of flavoured mesons
Quark Antiquark
   up     down   charm  strange    top    bottom
up N/A [lower-roman 1] AntiD0 Kaon+ AntiT0 B+
down [lower-roman 1] N/A D- Kaon0 T- B0
charm D0 D+ N/A Strange D+ Charmed AntiT0 Charmed B+
strange Kaon- AntiKaon0 Strange D- N/A Strange T- Strange B0
top T0 T+ Charmed T0 Strange T+ N/A Bottom T+
bottom B- antiB0 Charmed B- Strange AntiB0 Bottom T- N/A
  1. 1.0 1.1 For the purpose of nomenclature, the isospin projection I3 is treated as if it were not a flavour quantum number. This means that the charged pion-like mesons (π±, a±, b±, and ρ± mesons) follow the rules of flavourless mesons, even if they aren't truly "flavourless".
In addition
  • If JP is in the "normal series" (i.e., JP = 0+, 1, 2+, 3, ...), a superscript ∗ is added.
  • If the meson is not pseudoscalar (JP = 0) or vector (JP = 1), J is added as a subscript.
  • When the spectroscopic state of the meson is known, it is added in parentheses.
  • When the spectroscopic state is unknown, mass (in MeV/c2) is added in parentheses.
  • When the meson is in its ground state, nothing is added in parentheses.

Exotic mesons

Main page: Physics:Exotic meson

There is experimental evidence for particles that are hadrons (i.e., are composed of quarks) and are color-neutral with zero baryon number, and thus by conventional definition are mesons. Yet, these particles do not consist of a single quark/antiquark pair, as all the other conventional mesons discussed above do. A tentative category for these particles is exotic mesons.

There are at least five exotic meson resonances that have been experimentally confirmed to exist by two or more independent experiments. The most statistically significant of these is the Z(4430), discovered by the Belle experiment in 2007 and confirmed by LHCb in 2014. It is a candidate for being a tetraquark: a particle composed of two quarks and two antiquarks.[26] See the main article above for other particle resonances that are candidates for being exotic mesons.

List

Main page: Physics:List of mesons

Pseudoscalar mesons

Particle name Particle
symbol
Antiparticle
symbol
Quark
content
Rest mass (MeV/c2) IG JPC S C B' Mean lifetime (s) Commonly decays to
(>5% of decays)
Pion[27] Pion+ Pion- Up quarkDown antiquark 0139.57018 139.57018±0.00035


1 0 0 0 0 -08.2 (2.6033±0.0005)×10−8


Antimuon + Muon neutrino
Pion[28] Pion0 Self [math]\displaystyle{ \mathrm{\tfrac{u\bar{u} - d\bar{d}}{\sqrt{2}}}\, }[/math][a] 0134.9766 134.9766±0.0006


1 0−+ 0 0 0 -17 (8.4±0.6)×10−17


Photon + Photon
Eta meson[29] Eta Self [math]\displaystyle{ \mathrm{\tfrac{u\bar{u} + d\bar{d} - 2s\bar{s}}{\sqrt{6}}}\, }[/math][a] 0547.853 547.853±0.024


0+ 0−+ 0 0 0 -19 (5.0±0.3)×10−19[b]


Photon + Photon or
Pion0 + Pion0 + Pion0 or
Pion+ + Pion0 + Pion-
Eta prime meson[30] Eta prime(958) Self [math]\displaystyle{ \mathrm{\tfrac{u\bar{u} + d\bar{d} + s\bar{s}}{\sqrt{3}}}\, }[/math][a] 0957.66 957.66±0.24


0+ 0−+ 0 0 0 -21 (3.2±0.2)×10−21[b]


Pion+ + Pion- + Eta or
(rho0 + Photon) / (Pion+ + Pion- + Photon) or
Pion0 + Pion0 + Eta
Charmed eta meson[31] Charmed eta(1S) Self charm quarkcharm antiquark 2980.3±1.2 0+ 0−+ 0 0 0 -23 (2.5±0.3)×10−23[b]


See ηc decay modes
Bottom eta meson[32] Bottom eta(1S) Self bBottom antiquark 9300±40 0+ 0−+ 0 0 0 Unknown See ηb decay modes
Kaon[33] Kaon+ Kaon- Up quarkStrange antiquark 0493.677 493.677±0.016


12 0 1 0 0 -08.3 (1.2380±0.0021)×10−8


Antimuon + Muon neutrino or

pion+ + pion0 or
pion0 + positron + Electron neutrino or
Pion+ + Pion0

Kaon[34] Kaon0 Antikaon0 Down quarkStrange antiquark 0497.614 497.614±0.024


12 0 1 0 0 [c] [c]
K-Short[35] K-short0 Self [math]\displaystyle{ \mathrm{\tfrac{d\bar{s} + s\bar{d}}{\sqrt{2}}}\, }[/math][e] 0497.614 497.614±0.024

[d]

12 0 (*) 0 0 -11 (8.953±0.005)×10−11


pion+ + pion- or
pion0 + pion0
K-Long[36] K0L Self [math]\displaystyle{ \mathrm{\tfrac{d\bar{s} - s\bar{d}}{\sqrt{2}}}\, }[/math][e] 0497.614 497.614±0.024

[d]

12 0 (*) 0 0 -08.1 (5.116±0.020)×10−8


Pion+- + electron-+ + Electron neutrino or
Pion+- + muon-+ + Muon neutrino or
Pion0 + Pion0 + Pion0 or
Pion+ + Pion0 + Pion-
D meson[37] D+ D- Charm quarkDown antiquark 1869.62±0.20 12 0 0 +1 0 -12.4 (1.040±0.007)×10−12


See D+ decay modes
D meson[38] D0 AntiD0 Charm quarkup antiquark 1864.84±0.17 12 0 0 +1 0 -13.3 (4.101±0.015)×10−13


See D0 decay modes
strange D meson[39] Strange D+ Strange D- Charm quarkstrange antiquark 1968.49±0.34 0 0 +1 +1 0 -13.1 (5.00±0.07)×10−13


See D+s decay modes
B meson[40] B+ B- up quarkbottom antiquark 5279.15±0.31 12 0 0 0 +1 -12.1 (1.638±0.011)×10−12


See B+ decay modes
B meson[41] B0 AntiB0 Down quarkBottom antiquark 5279.53±33 12 0 0 0 +1 -12.2 (1.530±0.009)×10−12


See B0 decay modes
Strange B meson[42] Strange B0 Strange AntiB0 strange quarkBottom antiquark 5366.3±0.6 0 0 −1 0 +1 -12.3 1.470+0.026
−0.027
×10−12


See B0s decay modes
Charmed B meson[43] Charmed B+ Charmed B- Charm quarkbottom antiquark 6276±4 0 0 0 +1 +1 -13.2 (4.6±0.7)×10−13


See B+c decay modes

[a] ^ Makeup inexact due to non-zero quark masses.
[b] ^ PDG reports the resonance width (Γ). Here the conversion τ = ​ħΓ is given instead.
[c] ^ Strong eigenstate. No definite lifetime (see kaon notes below)
[d] ^ The mass of the K0L and K0S are given as that of the K0. However, it is known that a difference between the masses of the K0L and K0S on the order of 2.2×10−11 MeV/c2 exists.[36]
[e] ^ Weak eigenstate. Makeup is missing small CP–violating term (see notes on neutral kaons below).

Vector mesons

Particle
name
Particle
symbol
Antiparticle
symbol
Quark
content
Rest mass (MeV/c2) IG JPC S C B' Mean lifetime (s) Commonly decays to
(>5% of decays)
Charged rho meson[44] Rho+(770) Rho-(770) Up quarkDown antiquark 0775.4 775.4±0.4


1+ 1 0 0 0 -24 ~4.5×10−24[f][g]


Pion+- + Pion0
Neutral rho meson[44] Rho0(770) Self [math]\displaystyle{ \mathrm{\tfrac{u\bar{u}-d\bar{d}}{\sqrt 2}} }[/math] 0775.49 775.49±0.34


1+ 1−− 0 0 0 -24 ~4.5×10−24[f][g]


Pion+ + Pion-
Omega meson[45] omega meson(782) Self [math]\displaystyle{ \mathrm{\tfrac{u\bar{u} + d\bar{d}}{\sqrt{2}}} }[/math] 782.65±0.12 0 1−− 0 0 0 -23 (7.75±0.07)×10−23[f]


Pion+ + Pion0 + Pion- or
Pion0 + Photon
Phi meson[46] Phi meson(1020) Self Strange quarkStrange antiquark 1019.445±0.020 0 1−− 0 0 0 -22.3 (1.55±0.01)×10−22[f]


Kaon+ + Kaon- or
K-short0 + K0L or
(rho + pion) / (pion+ + pion0 + pion-)
J/Psi[47] J/Psi Self Charm quarkCharm antiquark 3096.916±0.011 0 1−− 0 0 0 -21.1 (7.1±0.2)×10−21[f]


See J/ψ(1S) decay modes
Upsilon meson[48] Upsilon(1S) Self bbottom antiquark 9460.30±0.26 0 1−− 0 0 0 -20.3 (1.22±0.03)×10−20[f]


See ϒ(1S) decay modes
Kaon[49] Kaon*+ Kaon*- Up quarkStrange antiquark 891.66±0.026 12 1 1 0 0 -20.1 ~7.35×10−20[f][g]


See Error no symbol defined(892) decay modes
Kaon[49] Kaon*0 Antikaon*0 Down quarkStrange antiquark 896.00±0.025 12 1 1 0 0 -20.2 (7.346±0.002)×10−20[f]


See Error no symbol defined(892) decay modes
D meson[50] D*+(2010) D*-(2010) Charm quarkDown antiquark 2010.27±0.17 12 1 0 +1 0 -21.2 (6.9±1.9)×10−21[f]


D0 + Pion+ or
D+ + Pion0
D meson[51] D*0(2007) AntiD*0(2007) Charm quarkup antiquark 2006.97±0.19 12 1 0 +1 0 -22.2 >3.1×10−22[f]


D0 + Pion0 or
D0 + Photon
strange D meson[52] Strange D*+ Strange D*- Charm quarkstrange antiquark 2112.3±0.5 0 1 +1 +1 0 -22.1 >3.4×10−22[f]


D*+ + Photon or
D*+ + Pion0
B meson[53] B*+ B*- up quarkbottom antiquark 5325.1±0.5 12 1 0 0 +1 Unknown B+ + Photon
B meson[53] B*0 AntiB*0 Down quarkBottom antiquark 5325.1±0.5 12 1 0 0 +1 Unknown B0 + Photon
Strange B meson[54] Strange B*0 Strange AntiB*0 strange quarkBottom antiquark 5412.8±1.3 0 1 −1 0 +1 Unknown Strange B0+Photon
Charmed B meson Charmed B*+ Charmed B*- Charm quarkbottom antiquark Unknown 0 1 0 +1 +1 Unknown Unknown

[f] ^ PDG reports the resonance width (Γ). Here the conversion τ = ​ħΓ is given instead.
[g] ^ The exact value depends on the method used. See the given reference for detail.

Notes on neutral kaons

There are two complications with neutral kaons:[55]

Note that these issues also exist in principle for other neutral, flavored mesons; however, the weak eigenstates are considered separate particles only for kaons because of their dramatically different lifetimes.[55]

See also

Footnotes

  1. The ħ is often dropped because it is the "fundamental" unit of spin, and it is implied that "spin 1" means "spin 1 ħ". In some systems of natural units, ħ is chosen to be 1, and therefore drops out of equations. The remainder of this article uses the "assume ħ units" convention for all types of spin.

References

  1. Griffiths, D. (2008). Introduction to Elementary Particles (2nd ed.). Wiley-VCH. ISBN 978-3-527-40601-2. 
  2. Aubert, J.J.; Becker, U.; Biggs, P.; Burger, J.; Chen, M.; Everhart, G. et al. (1974). "Experimental observation of a Heavy Particle J". Physical Review Letters 33 (23): 1404–1406. doi:10.1103/PhysRevLett.33.1404. Bibcode1974PhRvL..33.1404A. 
  3. Augustin, J.E.; Boyarski, A.; Breidenbach, M.; Bulos, F.; Dakin, J.; Feldman, G. et al. (1974). "Discovery of a narrow resonance in e+e annihilation". Physical Review Letters 33 (23): 1406–1408. doi:10.1103/PhysRevLett.33.1406. Bibcode1974PhRvL..33.1406A. 
  4. Herb, S. W.; Hom, D.; Lederman, L.; Sens, J.; Snyder, H.; Yoh, J. et al. (1977). "Observation of a di-muon resonance at 9.5 GeV in 400 GeV proton-nucleus collisions". Physical Review Letters 39 (5): 252–255. doi:10.1103/PhysRevLett.39.252. Bibcode1977PhRvL..39..252H. 
  5. "Nobel Prize in Physics 1949". The Noble Foundation. 1949. https://www.nobelprize.org/nobel_prizes/physics/laureates/1949/press.html. 
  6. Yukawa, H. (1935). "On the Interaction of Elementary Particles". Proc. Phys.-Math. Soc. Jpn. 17 (48). http://web.ihep.su/dbserv/compas/src/yukawa35/eng.pdf. 
  7. Yukawa, Hideki (1935). "On the Interaction of Elementary Particles. I". Nippon Sugaku-Buturigakkwai Kizi Dai 3 Ki (日本物理学会、日本数学会) 17: 48–57. doi:10.11429/ppmsj1919.17.0_48. https://www.jstage.jst.go.jp/article/ppmsj1919/17/0/17_0_48/_pdf/-char/en. 
  8. Gamow, G. (1988). The Great Physicists from Galileo to Einstein (Reprint ed.). Dover Publications. p. 315. ISBN 978-0-486-25767-9. https://archive.org/details/greatphysicistsf0000gamo. 
  9. "D. M. Bose: A Scientist Incognito (editorial)". Science and Culture 76 (11–12). November–December 2010. http://www.scienceandculture-isna.org/Nov-Dec-10/Editorial.pdf. Retrieved 5 February 2011. 
  10. Lattes, C.; Occhialini, G.; Muirhead, H.; Powell, C. (1947). "Processes involving charged mesons". Nature 159: 694–698. doi:10.1007/s00016-014-0128-6. 
  11. Steinberger, J. (1989). "Experiments with high-energy neutrino beams". Reviews of Modern Physics 61 (3): 533–545. doi:10.1103/RevModPhys.61.533. PMID 17747881. Bibcode1989RvMP...61..533S. https://cds.cern.ch/record/193654. 
  12. "Particles of the Standard Model" (in en). https://pdfslide.net/documents/particles-of-the-standard-model.html. 
  13. Amsler, C. (2008). "Quark Model". Lawrence Berkeley Laboratory. http://pdg.lbl.gov/2008/reviews/quarkmodrpp.pdf. 
  14. Amsler, C. (2008). "Review of Particle Physics". Physics Letters B 667 (1): 1–1340. doi:10.1016/j.physletb.2008.07.018. PMID 10020536. Bibcode2008PhLB..667....1A. http://scipp.ucsc.edu/%7Ehaber/pubs/Review_of_Particle_Physics_2014.pdf. 
  15. Sozzi, M. S. (2008b). "Charge Conjugation". Discrete Symmetries and CP Violation: From Experiment to Theory. Oxford University Press. pp. 88–120. ISBN 978-0-19-929666-8. https://archive.org/details/discretesymmetri00msoz. 
  16. Cronin, J.W. (1980). "CP Symmetry Violation—The Search for its origin". The Nobel Foundation. http://nobelprize.org/nobel_prizes/physics/laureates/1980/cronin-lecture.pdf. 
  17. Fitch, V.L. (1980). "The Discovery of Charge—Conjugation Parity Asymmetry". The Nobel Foundation. http://nobelprize.org/nobel_prizes/physics/laureates/1980/fitch-lecture.pdf. 
  18. Sozzi, M. S. (2008c). "CP-Symmetry". Discrete Symmetries and CP Violation: From Experiment to Theory. Oxford University Press. pp. 231–275. ISBN 978-0-19-929666-8. https://archive.org/details/discretesymmetri00msoz. 
  19. Gottfried, K.; Weisskopf, V.F. (1986). "Hadronic spectroscopy: G-parity". Concepts of Particle Physics. 2. Oxford University Press. pp. 303–311. ISBN 0-19-503393-0. https://archive.org/details/conceptsofpartic01kurt. 
  20. "Über den Bau der Atomkerne" (in de). Zeitschrift für Physik 77 (1–2): 1–11. 1932. doi:10.1007/BF01342433. Bibcode1932ZPhy...77....1H. 
  21. Wigner, E. (1937). "On the Consequences of the Symmetry of the Nuclear Hamiltonian on the Spectroscopy of Nuclei". Physical Review 51 (2): 106–119. doi:10.1103/PhysRev.51.106. Bibcode1937PhRv...51..106W. 
  22. Gell-Mann, M. (1964). "A Schematic of Baryons and Mesons". Physics Letters 8 (3): 214–215. doi:10.1016/S0031-9163(64)92001-3. Bibcode1964PhL.....8..214G. 
  23. Wong, S.S.M. (1998). "Nucleon Structure". Introductory Nuclear Physics (2nd ed.). New York: John Wiley & Sons. pp. 21–56. ISBN 0-471-23973-9. 
  24. 24.0 24.1 24.2 Amsler, C. (2008). "Naming scheme for hadrons". Lawrence Berkeley Laboratory. http://pdg.lbl.gov/2008/reviews/namingrpp.pdf. 
  25. Burcham, W. E.; Jobes, M. (1995). Nuclear and Particle Physics (2nd ed.). Longman Publishing. ISBN 0-582-45088-8. 
  26. LHCb collaborators (2014): Observation of the resonant character of the Z(4430)− state
  27. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  28. C. Amsler et al. (2008): Particle listings – π0
  29. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  30. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  31. C. Amsler et al. (2008): Particle listings – ηc
  32. C. Amsler et al. (2008): Particle listings – ηb
  33. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  34. C. Amsler et al. (2008): Particle listings – K0
  35. C. Amsler et al. (2008): Particle listings – K0S
  36. 36.0 36.1 C. Amsler et al. (2008): Particle listings – K0L
  37. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  38. C. Amsler et al. (2008): Particle listings – D0
  39. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  40. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  41. C. Amsler et al. (2008): Particle listings – B0
  42. C. Amsler et al. (2008): Particle listings – B0s
  43. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  44. 44.0 44.1 C. Amsler et al. (2008): Particle listings – Error no symbol defined
  45. C. Amsler et al. (2008): Particle listings – Error no symbol defined(782)
  46. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  47. C. Amsler et al. (2008): Particle listings – J/Ψ
  48. C. Amsler et al. (2008): Particle listings – ϒ(1S)
  49. 49.0 49.1 C. Amsler et al. (2008): Particle listings – Error no symbol defined(892)
  50. C. Amsler et al. (2008): Particle listings – Error no symbol defined(2010)
  51. C. Amsler et al. (2008): Particle listings – Error no symbol defined(2007)
  52. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  53. 53.0 53.1 C. Amsler et al. (2008): Particle listings – Error no symbol defined
  54. C. Amsler et al. (2008): Particle listings – Error no symbol defined
  55. 55.0 55.1 J.W. Cronin (1980)


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