- #1
scariari
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can anyone explain how commutators act on tri-vectors (in orthonormal conditions)?
on bi-vectors i know that it ends up to be a bivector again,
but with tri-vectors it vanishes if its lineraly dependent.
what about the case if its not linearly dependent,
does that mean it remains a tri-vector?
how does a vector transform under a transformation generated by exponentiation of a trivector ?
a transformation is a rotation or reflection,
but who can explain the exponentiation?
on bi-vectors i know that it ends up to be a bivector again,
but with tri-vectors it vanishes if its lineraly dependent.
what about the case if its not linearly dependent,
does that mean it remains a tri-vector?
how does a vector transform under a transformation generated by exponentiation of a trivector ?
a transformation is a rotation or reflection,
but who can explain the exponentiation?