grandes-ecoles 2023 QIII.3

grandes-ecoles · France · x-ens-maths-c__mp Proof Existence Proof

We consider that the function $F$ is continuous and $y_{\text{init}} \in \Omega$. With the functions $\phi_N$ constructed in question III.2, show, using Theorem 1, that there exists a subsequence of $\phi_N$ that converges uniformly on $[0, T]$ to a continuous function $\phi$.

We consider that the function $F$ is continuous and $y_{\text{init}} \in \Omega$. With the functions $\phi_N$ constructed in question III.2, show, using Theorem 1, that there exists a subsequence of $\phi_N$ that converges uniformly on $[0, T]$ to a continuous function $\phi$.

Paper Questions

QI.1 QI.2 QI.3 QII.1 QII.2 QII.3 QII.4 QII.5 QII.6 QII.7 QIII.1 QIII.2 QIII.3 QIII.4 QIII.5 QIII.6 QIII.7 QIV.1 QIV.2 QIV.3