quantum mechanics Quantum mechanics is a fundamental theory in physics that provides a description of the physical properties of nature at the scale of atoms and subatomic particles. It is the foundation of all quantum physics including quantum chemistry, ...

, a triplet is a quantum state of a system with a

spin Spin or spinning most often refers to: * Spinning (textiles), the creation of yarn or thread by twisting fibers together, traditionally by hand spinning * Spin, the rotation of an object around a central axis * Spin (propaganda), an intentionally ...

of quantum number =1, such that there are three allowed values of the spin component, = −1, 0, and +1.

Spin Spin or spinning most often refers to: * Spinning (textiles), the creation of yarn or thread by twisting fibers together, traditionally by hand spinning * Spin, the rotation of an object around a central axis * Spin (propaganda), an intentionally ...

, in the context of quantum mechanics, is not a mechanical rotation but a more abstract concept that characterizes a particle's intrinsic angular momentum. It is particularly important for systems at atomic length scales, such as individual

atoms Every atom is composed of a nucleus and one or more electrons bound to the nucleus. The nucleus is made of one or more protons and a number of neutrons. Only the most common variety of hydrogen has no neutrons. Every solid, liquid, gas ...

protons A proton is a stable subatomic particle, symbol , H+, or 1H+ with a positive electric charge of +1 ''e'' elementary charge. Its mass is slightly less than that of a neutron and 1,836 times the mass of an electron (the proton–electron m ...

, or

electrons The electron ( or ) is a subatomic particle with a negative one elementary electric charge. Electrons belong to the first generation of the lepton particle family, and are generally thought to be elementary particles because they have n ...

. Almost all molecules encountered in daily life exist in a

singlet state In quantum mechanics, a singlet state usually refers to a system in which all electrons are paired. The term 'singlet' originally meant a linked set of particles whose net angular momentum is zero, that is, whose overall spin quantum number s=0. A ...

, but

molecular oxygen There are several known allotropes of oxygen. The most familiar is molecular oxygen (O2), present at significant levels in Earth's atmosphere and also known as dioxygen or triplet oxygen. Another is the highly reactive ozone (O3). Others are ...

is an exception. At

room temperature Colloquially, "room temperature" is a range of air temperatures that most people prefer for indoor settings. It feels comfortable to a person when they are wearing typical indoor clothing. Human comfort can extend beyond this range depending on ...

, O₂ exists in a triplet state, which can only undergo a chemical reaction by making the forbidden transition into a singlet state. This makes it kinetically nonreactive despite being thermodynamically one of the strongest oxidants. Photochemical or thermal activation can bring it into the

, which makes it kinetically as well as thermodynamically a very strong oxidant. __TOC__

Two spin-1/2 particles

In a system with two spin-1/2 particlesfor example the proton and electron in the ground state of hydrogenmeasured on a given axis, each particle can be either spin up or spin down so the system has four basis states in all :

\uparrow\uparrow,\uparrow\downarrow,\downarrow\uparrow,\downarrow\downarrow

using the single particle spins to label the basis states, where the first arrow and second arrow in each combination indicate the spin direction of the first particle and second particle respectively. More rigorously :

, s_1,m_1\rangle, s_2,m_2\rangle = , s_1,m_1\rangle \otimes , s_2,m_2\rangle,

where

s_1

and

s_2

are the spins of the two particles, and

m_1

and

m_2

are their projections onto the z axis. Since for spin-1/2 particles, the

\left, \frac,m\right\rangle

basis states span a 2-dimensional space, the

\left, \frac,m_1\right\rangle\left, \frac,m_2\right\rangle

basis states span a 4-dimensional space. Now the total spin and its projection onto the previously defined axis can be computed using the rules for adding angular momentum in

using the

Clebsch–Gordan coefficients In physics, the Clebsch–Gordan (CG) coefficients are numbers that arise in angular momentum coupling in quantum mechanics. They appear as the expansion coefficients of total angular momentum eigenstates in an uncoupled tensor product basis. In ...

. In general :

, s,m\rangle = \sum_ C_^, s_1 m_1\rangle, s_2 m_2\rangle

substituting in the four basis states :

\begin
  \left, \frac,+\frac\right\rangle\ \otimes \left, \frac,+\frac\right\rangle\ &\text (\uparrow\uparrow), \\
  \left, \frac,+\frac\right\rangle\ \otimes \left, \frac,-\frac\right\rangle\ &\text (\uparrow\downarrow), \\
  \left, \frac,-\frac\right\rangle\ \otimes \left, \frac,+\frac\right\rangle\ &\text (\downarrow\uparrow), \\
  \left, \frac,-\frac\right\rangle\ \otimes \left, \frac,-\frac\right\rangle\ &\text (\downarrow\downarrow)\end

returns the possible values for total spin given along with their representation in the

\left, \frac,m_1\right\rangle\left, \frac,m_2\right\rangle

basis. There are three states with total spin angular momentum 1:Spin and Spin–Addition
/ref> :

\left.\begin
, 1,1\rangle &=\; \uparrow\uparrow \\
, 1,0\rangle &=\; \frac(\uparrow\downarrow + \downarrow\uparrow) \\
, 1,-1\rangle &=\; \downarrow\downarrow
\end\right\}\quad s = 1\quad \mathrm

which are symmetric and a fourth state with total spin angular momentum 0: :

\left., 0,0\rangle = \frac(\uparrow\downarrow - \downarrow\uparrow)\;\right\}\quad s=0\quad\mathrm

which is antisymmetric. The result is that a combination of two spin-1/2 particles can carry a total spin of 1 or 0, depending on whether they occupy a triplet or singlet state.

A mathematical viewpoint

In terms of

representation theory Representation theory is a branch of mathematics that studies abstract algebraic structures by ''representing'' their elements as linear transformations of vector spaces, and studies modules over these abstract algebraic structures. In essen ...

, what has happened is that the two conjugate 2-dimensional spin representations of the spin group SU(2) = Spin(3) (as it sits inside the 3-dimensional Clifford algebra) have tensored to produce a 4 dimensional representation. The 4 dimensional representation descends to the usual orthogonal group SO(3) and so its objects are tensors, corresponding to the integrality of their spin. The 4 dimensional representation decomposes into the sum of a one-dimensional trivial representation (singlet, a scalar, spin zero) and a three-dimensional representation (triplet, spin 1) that is nothing more than the standard representation of SO(3) on

R^3

. Thus the "three" in triplet can be identified with the three rotation axes of physical space.

References

* *{{cite book , author=Shankar, R. , title=Principles of Quantum Mechanics , edition=2nd , publisher=Springer, date=1994 , isbn=978-0-306-44790-7 , chapter=chapter 14-Spin Quantum mechanics Rotational symmetry Spectroscopy

Two spin-1/2 particles

A mathematical viewpoint

See also

References