Dirac spinor

A Dirac spinor is a mathematical term that is named after Paul Dirac . Dirac spinors are an element of the fundamental representation of the complexized Clifford algebra and are therefore a specific genus of spinors . They are a useful concept in quantum physics . ${\ displaystyle \ Delta}$ ${\ displaystyle \ mathrm {Cliff} (p, q)}$

Solutions of the Dirac equation are often referred to as Dirac spinors . These are Dirac spinor fields , which means that a four-dimensional Dirac spinor is assigned to each point in spacetime.

Be . The complexified Clifford algebra is isomorphic to the matrix algebra if is even, or isomorphic to if is odd. In any case, it has a canonical dimensional representation of that so for all signatures with exists and also a representation of the spin group is. This representation is called the spinor representation , the vectors of this representation space are called Dirac spinors . ${\ displaystyle n = p + q}$ ${\ displaystyle \ mathrm {Cliff} (p, q)}$ ${\ displaystyle Mat_ {2 ^ {k}} (\ mathbb {C})}$${\ displaystyle n = 2k}$${\ displaystyle Mat_ {2 ^ {k-1}} (\ mathbb {C}) \ oplus Mat_ {2 ^ {k-1}} (\ mathbb {C})}$${\ displaystyle n = 2k-1}$${\ displaystyle 2 ^ {k}}$${\ displaystyle (p, q)}$${\ displaystyle n = p + q}$ ${\ displaystyle \ mathrm {Spin} (p, q)}$

In odd dimensions , this representation, viewed as a representation of , is reducible. Available in two so-called Weyl spinors of dimension are broken: . ${\ displaystyle n}$${\ displaystyle \ mathrm {Spin} (p, q)}$${\ displaystyle 2 ^ {k-1}}$${\ displaystyle \ Delta = \ Delta _ {+} \ oplus \ Delta _ {-}}$

Dirac spinors in 3 + 1 space-time dimensions, i.e. to , are used in the context of quantum electrodynamics for the mathematical description of fermions with spin 1/2. In the Standard Model of particle physics, these Dirac fermions include all fundamental fermions. In this case the Dirac spinors are four-dimensional, belong to a representation of the Lorentz group and are solutions of the Dirac equation . ${\ displaystyle \ mathrm {Cliff} (3,1)}$