- #1
kregg87
- 5
- 1
Why are particle with half integer spins anti-symmetric while integer spin particles are symmetric? Or in other words, how does spin relate to the symmetry of indentical particles?
Spin is a fundamental property of particles, similar to mass or charge. It refers to the intrinsic angular momentum of a particle, which cannot be explained by its physical shape or movement. The symmetry of a particle is related to its spin because the spin value determines how the particle behaves under certain transformations, such as rotations or reflections.
Spin is measured in units of Planck's constant divided by 2𝜋, denoted as ħ. This unit is known as a spin number or spin quantum number. The spin of a particle can only take discrete values, meaning it is quantized. For example, electrons have a spin quantum number of 1/2, while photons have a spin of 1.
Spin is a form of angular momentum, but it is distinct from orbital angular momentum, which is associated with the movement of a particle. Spin is an intrinsic property of a particle and does not involve any physical movement, but it still contributes to the total angular momentum of a system.
The spin of a particle can affect its properties in several ways. For example, particles with half-integer spin, such as electrons, are fermions and follow the Pauli exclusion principle, which states that no two identical fermions can occupy the same quantum state. Particles with integer spin, such as photons, are bosons and do not follow this principle.
Symmetry breaking is a phenomenon in which the symmetry of a system is not preserved under certain conditions. In particle physics, the concept of symmetry breaking is closely related to spin. For instance, when a particle with zero spin decays into two particles with spin, the original symmetry of the system is broken. This allows for a better understanding of how particles behave and interact with each other.