Results about the grading structure of the clifford algebra #
The main result is CliffordAlgebra.gradedAlgebra
, which says that the clifford algebra is a
ℤ₂-graded algebra (or "superalgebra").
The even or odd submodule, defined as the supremum of the even or odd powers of
(ι Q).range
. evenOdd 0
is the even submodule, and evenOdd 1
is the odd submodule.
Equations
- CliffordAlgebra.evenOdd Q i = ⨆ (j : { n : ℕ // ↑n = i }), LinearMap.range (CliffordAlgebra.ι Q) ^ ↑j
Instances For
A version of CliffordAlgebra.ι
that maps directly into the graded structure. This is
primarily an auxiliary construction used to provide CliffordAlgebra.gradedAlgebra
.
Equations
- One or more equations did not get rendered due to their size.
Instances For
The clifford algebra is graded by the even and odd parts.
Equations
To show a property is true on the even or odd part, it suffices to show it is true on the scalars or vectors (respectively), closed under addition, and under left-multiplication by a pair of vectors.
To show a property is true on the even parts, it suffices to show it is true on the scalars, closed under addition, and under left-multiplication by a pair of vectors.
To show a property is true on the odd parts, it suffices to show it is true on the vectors, closed under addition, and under left-multiplication by a pair of vectors.