Isomorphisms with the even subalgebra of a Clifford algebra #
This file provides some notable isomorphisms regarding the even subalgebra, CliffordAlgebra.even
.
Main definitions #
-
CliffordAlgebra.equivEven
: Every Clifford algebra is isomorphic as an algebra to the even subalgebra of a Clifford algebra with one more dimension.CliffordAlgebra.EquivEven.Q'
: The quadratic form used by this "one-up" algebra.CliffordAlgebra.toEven
: The simp-normal form of the forward direction of this isomorphism.CliffordAlgebra.ofEven
: The simp-normal form of the reverse direction of this isomorphism.
-
CliffordAlgebra.evenEquivEvenNeg
: Every even subalgebra is isomorphic to the even subalgebra of the Clifford algebra with negated quadratic form.CliffordAlgebra.evenToNeg
: The simp-normal form of each direction of this isomorphism.
Main results #
CliffordAlgebra.coe_toEven_reverse_involute
: the behavior ofCliffordAlgebra.toEven
on the "Clifford conjugate", that isCliffordAlgebra.reverse
composed withCliffordAlgebra.involute
.
Constructions needed for CliffordAlgebra.equivEven
#
The quadratic form on the augmented vector space M × R
sending v + r•e0
to Q v - r^2
.
Equations
- CliffordAlgebra.EquivEven.Q' Q = QuadraticForm.prod Q (-QuadraticForm.sq)
Instances For
The unit vector in the new dimension
Equations
Instances For
The embedding from the existing vector space
Equations
Instances For
The embedding from the smaller algebra into the new larger one.
Equations
- One or more equations did not get rendered due to their size.
Instances For
The embedding from the even subalgebra with an extra dimension into the original algebra.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Any clifford algebra is isomorphic to the even subalgebra of a clifford algebra with an extra
dimension (that is, with vector space M × R
), with a quadratic form evaluating to -1
on that new
basis vector.
Equations
- One or more equations did not get rendered due to their size.
Instances For
The representation of the clifford conjugate (i.e. the reverse of the involute) in the even subalgebra is just the reverse of the representation.
Constructions needed for CliffordAlgebra.evenEquivEvenNeg
#
One direction of CliffordAlgebra.evenEquivEvenNeg
Equations
- One or more equations did not get rendered due to their size.
Instances For
The even subalgebras of the algebras with quadratic form Q
and -Q
are isomorphic.
Stated another way, 𝒞ℓ⁺(p,q,r)
and 𝒞ℓ⁺(q,p,r)
are isomorphic.
Equations
- One or more equations did not get rendered due to their size.