grandes-ecoles 2022 Q6

grandes-ecoles · France · x-ens-maths-a__mp Proof Proof That a Map Has a Specific Property

For all $e \in E^p$, we consider $\Omega_p(e) : E^p \rightarrow \mathbb{R}$ defined for all $u \in E^p$ by $$\Omega_p(e)(u) = \operatorname{det}(\operatorname{Gram}(e, u)).$$
(a) Show that for all $e \in E^p$, we have $\Omega_p(e) \in \mathscr{A}_p(E, \mathbb{R})$.
(b) Verify that for all $(e, u) \in E^p \times E^p$, we have $\Omega_p(e)(u) = \Omega_p(u)(e)$.
(c) Show that $\Omega_p \in \mathscr{A}_p(E, \mathscr{A}_p(E, \mathbb{R}))$.

For all $e \in E^p$, we consider $\Omega_p(e) : E^p \rightarrow \mathbb{R}$ defined for all $u \in E^p$ by
$$\Omega_p(e)(u) = \operatorname{det}(\operatorname{Gram}(e, u)).$$

(a) Show that for all $e \in E^p$, we have $\Omega_p(e) \in \mathscr{A}_p(E, \mathbb{R})$.

(b) Verify that for all $(e, u) \in E^p \times E^p$, we have $\Omega_p(e)(u) = \Omega_p(u)(e)$.

(c) Show that $\Omega_p \in \mathscr{A}_p(E, \mathscr{A}_p(E, \mathbb{R}))$.

Paper Questions

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