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Programme d'approfondissement - APM_51175_EP : EA Sujets Avancés sur la Probabilité

Domaine > Mathématiques appliquées.

Descriptif

Random phenomena are modelled using modern probability theory, defined in the 1930s by Kolmogorov using measure theory as a cornerstone. This course aims to provide a deep understanding of this theory. It is indeed an asset to forge intuition, to understand the objects involved and to mobilize them in an applied or theoretical framework.

This course is designed for an audience with a variety of interests: it may be of interest to students wishing to deepen their study of probability theory on the one hand, and on the other hand it may be of interest to students who intend to use it in business applications (a good understanding of probability theory is essential in order to be able to orient oneself in the world of applications and to innovate there). Each week is devoted to a theme of measure theory, with applications related to probability, involving discussions around exercises. The last session is devoted to oral presentations.

The evaluation is based on a 30-minute oral presentation by pairs of a research or overview article on a model, which is attended by all students. The objective is both individual (to learn to read a primary source and to present its content orally in English in a given time) and collective (to see a variety of models and applications in probability).

The course is delivered in english.

36 heures en présentiel

effectifs minimal / maximal:

/20

Diplôme(s) concerné(s)

Parcours de rattachement

Format des notes

Numérique sur 20

Littérale/grade réduit

Pour les étudiants du diplôme Programmes d'échange internationaux

Vos modalités d'acquisition :

Exposé oral.

Le rattrapage est autorisé (Note de rattrapage conservée)
    L'UE est acquise si note finale transposée >= C
    • Crédits ECTS acquis : 5 ECTS

    Pour les étudiants du diplôme Titre d’Ingénieur diplômé de l’École polytechnique

    Vos modalités d'acquisition :

    Exposé oral.

    Le rattrapage est autorisé (Note de rattrapage conservée)
      L'UE est acquise si note finale transposée >= C
      • Crédits ECTS acquis : 5 ECTS

      La note obtenue rentre dans le calcul de votre GPA.

      Pour les étudiants du diplôme M1 MJH - Mathématiques Jacques Hadamard

      Vos modalités d'acquisition :

      Exposé oral.

      L'UE est acquise si Note finale >= 10
      • Crédits ECTS acquis : 5 ECTS
      Veuillez patienter