Algebraic Topology and Dynamical Systems

Explore the programs and courses offered by Algebraic Topology and Dynamical Systems

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Program Overview

The Master's degree in Algebraic Topology and Dynamical Systems focuses primarily on the study of dynamical systems theory. This theory is applied in various fields such as physics, engineering, biology, medicine, economics, and even developmental psychology. It helps solve complex problems by simulating realistic scenarios for exploration, training, and strategic planning.

This program provides a solid understanding of models represented by differential equations as well as the stability of the modeled phenomena. This Master's degree prepares students to pursue a doctoral thesis in fundamental research on dynamical systems and Chaos Theory, as well as to collaborate with the economic and/or industrial sectors on applied topics.

Teaching Language : Frensh

Curriculum Highlights

Core Courses

• Analysis

• Differential and Integral Calculus

• Differential Equations

Advanced Topics

The skills acquired through the Master's in Algebraic Topology and Dynamic Systems program:

• allow graduates to join advanced fundamental research and development teams

• provide solid theoretical and practical training that also allows graduates to integrate effectively into various sectors, particularly those requiring strong analytical, modeling, and innovation skills.

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Admissions Information

Admission to the Master's program is open to all holders of a Bachelor's degree in Mathematics, regardless of specialization. Selection is based on academic merit (ranking according to the general average), and subject to the number of available pedagogical seats.

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