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In physics, the algebra of physical space (APS) is the use of the Clifford or geometric algebra Cl_3,0(R) of the three-dimensional Euclidean space as a model for (3+1)-dimensional spacetime, representing a point in spacetime via a paravector (3-dimensional vector plus a 1-dimensional scalar).

The Clifford algebra Cl_3,0(R) has a faithful representation, generated by Pauli matrices, on the spin representation C²; further, Cl_3,0(R) is isomorphic to the even subalgebra Cl^[0]
_3,1(R) of the Clifford algebra Cl_3,1(R).

APS can be used to construct a compact, unified and geometrical formalism for both classical and quantum mechanics.

APS should not be confused with spacetime algebra (STA), which concerns the Clifford algebra Cl_1,3(R) of the four-dimensional Minkowski spacetime.

In APS, the spacetime position is represented as the paravector $${\displaystyle x=x^{0}+x^{1}\mathbf {e} _{1}+x^{2}\mathbf {e} _{2}+x^{3}\mathbf {e} _{3},}$$ where the time is given by the scalar part x⁰ = t, and e₁, e₂, e₃ are the standard basis for position space. Throughout, units such that c = 1 are used, called natural units. In the Pauli matrix representation, the unit basis vectors are replaced by the Pauli matrices and the scalar part by the identity matrix. This means that the Pauli matrix representation of the space-time position is $${\displaystyle x\rightarrow {\begin{pmatrix}x^{0}+x^{3}&&x^{1}-ix^{2}\\x^{1}+ix^{2}&&x^{0}-x^{3}\end{pmatrix}}}$$

The restricted Lorentz transformations that preserve the direction of time and include rotations and boosts can be performed by an exponentiation of the spacetime rotation biparavector W $${\displaystyle L=e^{W/2}.}$$

In the matrix representation, the Lorentz rotor is seen to form an instance of the SL(2, C) group (special linear group of degree 2 over the complex numbers), which is the double cover of the Lorentz group. The unimodularity of the Lorentz rotor is translated in the following condition in terms of the product of the Lorentz rotor with its Clifford conjugation $${\displaystyle L{\bar {L}}={\bar {L}}L=1.}$$

This Lorentz rotor can be always decomposed in two factors, one Hermitian B = B^†, and the other unitary R^† = R⁻¹, such that $${\displaystyle L=BR.}$$

The unitary element R is called a rotor because this encodes rotations, and the Hermitian element B encodes boosts.

The four-velocity, also called proper velocity, is defined as the derivative of the spacetime position paravector with respect to proper time τ: $${\displaystyle u={\frac {dx}{d\tau }}={\frac {dx^{0}}{d\tau }}+{\frac {d}{d\tau }}(x^{1}\mathbf {e} _{1}+x^{2}\mathbf {e} _{2}+x^{3}\mathbf {e} _{3})={\frac {dx^{0}}{d\tau }}\left[1+{\frac {d}{dx^{0}}}(x^{1}\mathbf {e} _{1}+x^{2}\mathbf {e} _{2}+x^{3}\mathbf {e} _{3})\right].}$$

This expression can be brought to a more compact form by defining the ordinary velocity as $${\displaystyle \mathbf {v} ={\frac {d}{dx^{0}}}(x^{1}\mathbf {e} _{1}+x^{2}\mathbf {e} _{2}+x^{3}\mathbf {e} _{3}),}$$ and recalling the definition of the gamma factor: $${\displaystyle \gamma (\mathbf {v} )={\frac {1}{\sqrt {1-{\frac {|\mathbf {v} |^{2}}{c^{2}}}}}},}$$ so that the proper velocity is more compactly: $${\displaystyle u=\gamma (\mathbf {v} )(1+\mathbf {v} ).}$$

The proper velocity is a positive unimodular paravector, which implies the following condition in terms of the Clifford conjugation $${\displaystyle u{\bar {u}}=1.}$$

The proper velocity transforms under the action of the Lorentz rotor L as $${\displaystyle u\rightarrow u^{\prime }=LuL^{\dagger }.}$$

The four-momentum in APS can be obtained by multiplying the proper velocity with the mass as $${\displaystyle p=mu,}$$ with the mass shell condition translated into $${\displaystyle {\bar {p}}p=m^{2}.}$$

The electromagnetic field is represented as a bi-paravector F: $${\displaystyle F=\mathbf {E} +i\mathbf {B} ,}$$ with the Hermitian part representing the electric field E and the anti-Hermitian part representing the magnetic field B. In the standard Pauli matrix representation, the electromagnetic field is: $${\displaystyle F\rightarrow {\begin{pmatrix}E_{3}&E_{1}-iE_{2}\\E_{1}+iE_{2}&-E_{3}\end{pmatrix}}+i{\begin{pmatrix}B_{3}&B_{1}-iB_{2}\\B_{1}+iB_{2}&-B_{3}\end{pmatrix}}\,.}$$

The source of the field F is the electromagnetic four-current: $${\displaystyle j=\rho +\mathbf {j} \,,}$$ where the scalar part equals the electric charge density ρ, and the vector part the electric current density j. Introducing the electromagnetic potential paravector defined as: $${\displaystyle A=\phi +\mathbf {A} \,,}$$ in which the scalar part equals the electric potential ϕ, and the vector part the magnetic potential A. The electromagnetic field is then also: $${\displaystyle F=\partial {\bar {A}}.}$$ The field can be split into electric $${\displaystyle E=\langle \partial {\bar {A}}\rangle _{V}}$$ and magnetic $${\displaystyle B=i\langle \partial {\bar {A}}\rangle _{BV}}$$ components. Here, $${\displaystyle \partial =\partial _{t}+\mathbf {e} _{1}\,\partial _{x}+\mathbf {e} _{2}\,\partial _{y}+\mathbf {e} _{3}\,\partial _{z}}$$ and F is invariant under a gauge transformation of the form $${\displaystyle A\rightarrow A+\partial \chi \,,}$$ where ${\displaystyle \chi }$ is a scalar field.

The electromagnetic field is covariant under Lorentz transformations according to the law $${\displaystyle F\rightarrow F^{\prime }=LF{\bar {L}}\,.}$$

The Maxwell equations can be expressed in a single equation: $${\displaystyle {\bar {\partial }}F={\frac {1}{\epsilon }}{\bar {j}}\,,}$$ where the overbar represents the Clifford conjugation.

The Lorentz force equation takes the form $${\displaystyle {\frac {dp}{d\tau }}=e\langle Fu\rangle _{R}\,.}$$

The electromagnetic Lagrangian is $${\displaystyle L={\frac {1}{2}}\langle FF\rangle _{S}-\langle A{\bar {j}}\rangle _{S}\,,}$$ which is a real scalar invariant.

The Dirac equation, for an electrically charged particle of mass m and charge e, takes the form: $${\displaystyle i{\bar {\partial }}\Psi \mathbf {e} _{3}+e{\bar {A}}\Psi =m{\bar {\Psi }}^{\dagger },}$$ where e₃ is an arbitrary unitary vector, and A is the electromagnetic paravector potential as above. The electromagnetic interaction has been included via minimal coupling in terms of the potential A.

The differential equation of the Lorentz rotor that is consistent with the Lorentz force is $${\displaystyle {\frac {d\Lambda }{d\tau }}={\frac {e}{2mc}}F\Lambda ,}$$ such that the proper velocity is calculated as the Lorentz transformation of the proper velocity at rest $${\displaystyle u=\Lambda \Lambda ^{\dagger },}$$ which can be integrated to find the space-time trajectory ${\displaystyle x(\tau )}$ with the additional use of $${\displaystyle {\frac {dx}{d\tau }}=u.}$$

• Paravector
• Multivector
• wikibooks:Physics Using Geometric Algebra
• Dirac equation in the algebra of physical space
• Algebra

• Baylis, William (2002). Electrodynamics: A Modern Geometric Approach (2nd ed.). Springer. ISBN 0-8176-4025-8.
• Baylis, William, ed. (1999) [1996]. Clifford (Geometric) Algebras: with applications to physics, mathematics, and engineering. Springer. ISBN 978-0-8176-3868-9.
• Doran, Chris; Lasenby, Anthony (2007) [2003]. Geometric Algebra for Physicists. Cambridge University Press. ISBN 978-1-139-64314-6.
• Hestenes, David (1999). New Foundations for Classical Mechanics (2nd ed.). Kluwer. ISBN 0-7923-5514-8.

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• Baylis, W. E.; Yao, Y. (1 July 1999). "Relativistic dynamics of charges in electromagnetic fields: An eigenspinor approach". Physical Review A. 60 (2): 785–795. Bibcode:1999PhRvA..60..785B. doi:10.1103/physreva.60.785.