grandes-ecoles 2023 QIII.1

grandes-ecoles · France · x-ens-maths-d__mp Groups Ring and Field Structure

Let $E$ be a finite subset of $M _ { n } ( A )$. Show that there exists a subring $B$ of $A$ such that: $B$ has property (TF) and for every matrix $M \in E$, all coefficients of $M$ belong to $B$.

Let $E$ be a finite subset of $M _ { n } ( A )$. Show that there exists a subring $B$ of $A$ such that: $B$ has property (TF) and for every matrix $M \in E$, all coefficients of $M$ belong to $B$.

Paper Questions

QI.1 QI.2 QI.3 QI.4 QI.5 QII.1 QII.2 QII.3 QII.4 QII.5 QIII.1 QIII.2 QIII.3 QIV.1 QIV.2 QIV.3 QV.1 QV.2 QV.3 QV.4