grandes-ecoles 2022 Q33

grandes-ecoles · France · centrale-maths1__mp Groups Symplectic and Orthogonal Group Properties

Let $(E , \omega)$ be a symplectic vector space of dimension $n = 2m$. Prove the following lemma: For all non-zero vectors $x$ and $y$ of $E$, there exists a composition $\gamma$ of at most two symplectic transvections of $E$ such that $\gamma ( x ) = y$.

Let $(E , \omega)$ be a symplectic vector space of dimension $n = 2m$. Prove the following lemma: For all non-zero vectors $x$ and $y$ of $E$, there exists a composition $\gamma$ of at most two symplectic transvections of $E$ such that $\gamma ( x ) = y$.

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