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Hypercharge:

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Flavour in particle physics v • d • e
Flavour quantum numbers: Baryon number: B Lepton number: L Strangeness: S Charmness: C Bottomness: B' Topness: T Isospin: I or I_z Weak isospin: T or T_z Electric charge: Q Combinations: Hypercharge: Y Y = 2 (Q − I_z) Weak hypercharge: Y_W Y_W = 2 (Q − T_z) X + 2Y_W = 5 (B − L) Related topics: CPT symmetry CKM matrix CP symmetry Chirality

In particle physics, the hypercharge (represented by Y) of a particle is related to the strong interaction, and is distinct from the similarly named weak hypercharge, which has an analogous role in the electroweak interaction. The concept of hypercharge combines and unifies isospin and flavour into a single charge.

1 Hypercharge
2 Relation with Electric charge and Isospin
3 SU(3) model in relation to hypercharge
4 Examples
5 Practical obsolescence
6 See also
7 References

[edit] Hypercharge

Hypercharge in particle physics is a quantum number relating the strong interactions of the Special Unitary of a 3*3 matrix algebraic structure or SU(3) model. Isospin is defined in the SU(2) model while the SU(3) model defines hypercharge.

SU(3) weight diagrams (see below) are 2 dimensional with the coordinates referring to two quantum numbers, I_z, which is the z-component of isospin and Y, which is the hypercharge (the sum of strangeness (S), charm (C), bottomness (B′), topness (T), and baryon number (B)). Mathematically, hypercharge is

$Y = \frac{1}{2} \left ( S+C+B^\prime+T+B \right )$

and conservation of hypercharge implies a conservations of flavours. Strong interactions conserve hypercharge, but weak interations do not.

[edit] Relation with Electric charge and Isospin

Main article: Gell-Mann-Nishijima formula

The Gell-Mann–Nishijima formula relates isospin and electric charge

$(1) \qquad Q = I_z + \frac{1}{2}Y,$

where I_z is the third component of isospin and Q is the particle's charge.

Isospin creates multiplets of particles whose average charge is related to the hypercharge by:

$(3) \qquad Y = 2 \bar Q.$

Since the hypercharge is the same for all members of a multiplet, and the average of the I_z values is 0.

[edit] SU(3) model in relation to hypercharge

The SU(2) model has multiplets characterized by a quantum number J, which is the total angular momentum. Each multiplet consists of 2J + 1 substates with equally spaced values of J_z, forming a symmetric arrangement seen in atomic spectra and isospin. This formalises the observation that certain strong baryon decay were not observed leading to the prediction of the mass, strangeness and charge of the Ω⁻ baryon.

The SU(3) has supermultiplets containing SU(2) multiplets. SU(3) now needs 2 numbers to specify all its sub-states which are denoted by λ₁ and λ₂.

(λ₁ + 1) specifies the number of points in the topmost side of the hexagon while (λ₂ + 1) specifies the number of points on the bottom side.

SU(3) weight diagram, where Y is Hypercharge and I_z is the third component of isospin

SU(3) weight diagram

Mesons of spin 0 form a nonet

The octet of light spin-1/2 baryons described in SU(3). n=neutron, p=proton, Λ, Σ and Ξ are hyperons

A combination of three u, d or s-quarks with a total spin of 3/2 form the so-called baryon decuplet. The lower six are hyperons. S=Strangeness, Q= Electric charge

[edit] Examples

The nucleon group (protons with Q = +1 and neutrons with Q = 0) have an average charge of +1/2, so they both have hypercharge Y = 1 (baryon number B = +1, S = C = B′ = T = 0). From the Gell-Mann–Nishijima formula we know that proton has isospin I_z = +1/2, while neutron has I_z = −1/2.
This also works for quarks: for the up quark, with a charge of +2/3, and an I_z of +1/2, we deduce a hypercharge of 1/3, due to its baryon number (since you need 3 quarks to make a baryon, a quark has baryon number of 1/3).
For a strange quark, with charge −1/3, a baryon number of 1/3 and strangeness of −1 we get a hypercharge Y = −1/3, so we deduce an I_z = 0. That means that a strange quark makes a singlet of its own (same happens with charm, bottom and top quarks), while up and down constitute an isospin doublet.

[edit] Practical obsolescence

Hypercharge was a concept developed in the 1960s, to organize groups of particles in the "subatomic zoo" and to develop ad-hoc conservation laws based on their observed transformations. With the advent of the quark model, it is now obvious that (if one only includes the up, down and strange quarks out of the total 6 quarks in the standard model), hypercharge Y is the following combination of the numbers of up, down and strange quarks ( $n u$ ) , ( $n d$ ), ( $n s$ ):

$(4) \qquad Y = {1 \over 3} (n_u + n_d - 2 n_s)$

In modern descriptions of hadron interaction, it has become more obvious to draw Feynman diagrams that trace through individual quarks composing the interacting baryons and mesons, rather than counting hypercharge quantum numbers. Weak hypercharge, however, remains of practical use in various theories of the electroweak interaction.