I have read something about generalized geometries from Gualtieri's thesis. At section 2.3 he discussed spinors. Here I have the question: Suppose that $ x+\xi \in V \oplus V^* $ we can define a bilinear form on $ V \oplus V^* $ by $(x+ \xi , y+ \nu)=1/2( \xi (y)+ \nu (x))$ Consider the Clifford algebra generated by $V$ and the bilinear form defined as above. Question: if ${e_i}$ is an orthonormal basis for $V$ and ${e^i}$ is its dual, what is the Clifford multiplication $e_i.e^j$?
Clifford multiplication in $V \oplus V^*$
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geometry
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0Er, wait, that should be $e_i.e^j+e^j.e_i=q(e_i+e^j)-q(e_i)-q(e^j)=e^j(e_i)-0(e_i)-e^j(0)=\delta^j_i.$ Which we also could anticipate by just saying that $e_i$ and $e_j$ are orthogonal for $i\neq j$ – 2012-07-09
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0Did you use the formula $u.v + v.u = 2g(u,v)$ for clifford multiplication? But for this formula I found $e_i.e^j=-e^j.e_i$ only. Do I miss some point? – 2012-07-10
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0No, you didn't miss anything. So because these two vectors are independent, so is their Clifford product. And because they are orthogonal, they anticommute. – 2012-07-12