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{ sl }( 2 ,\mathbb{ C })_{\mathbb{R}}$| u1 + v2 + u3v4 − u4v3 = 0 |$\mathfrak{s}$| is not self-normalising Open in new tab Table 1 Types of isotropy algebras |$\mathfrak{s}\subset \mathfrak{ sl }_{6}$| of Monge ...
and C −8 2 3 tr(A)= 2 C and two points −8 2 3 tr(A)=− 1 Two lines 4 2 4 tr(A)=3 Two points and C −8 2 4 tr(A)= 1 +2ξ4 Six points and a line 8 Depending on C (g) 4 tr(A)= 1 −2ξ4 Six points and a line 8 2 5 m(A)= 1 ...
*} and the corresponding Lie group homomorphism |$\textrm{ SL }( 2 ,\mathbb{ C })\rightarrow G$|, so that \begin{equation*} \alpha^\vee(t)=\theta_\alpha\left( \begin{pmatrix} t & 0 \\ 0 & t^{- 1 } \end{pmatrix}\right), t\in\mathbb ...
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