Mathematics and Applications

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Program Overview

The doctoral training program in Applied Mathematics offered by the University of Frères Mentouri Constantine 1 aims to train highly qualified researchers capable of contributing to scientific and technological development in strategic fields.

This program is designed to strengthen doctoral students' scientific and technical skills, with a particular focus on differential equations, dynamical systems, numerical analysis, and mathematical modeling applied to real-world problems (health, energy, environment, digital economy).

Teaching Language : English

Curriculum Highlights

Core Courses

The knowledge reinforcement program is delivered over two semesters and includes the following courses:

Semester 1:

  • Numerical Simulation of ODE/PDE using MATLAB
  • Numerical Analysis
  • Dynamical Systems

Semester 2:

  • Operator Theory
  • Advanced Numerical Methods
  • Evolution Problems

Transversal Modules:

  • Research Methodology (6h)
  • Introduction to University Pedagogy (6h)
  • Information and Communication Technologies (ICT) (6h)
  • Language Skills Enhancement (6h)
  • Participation in Scientific Seminars (4 seminars per semester)


Advanced Topics

Admission to the doctoral program is subject to the following conditions:

  • Holding a Master's degree in Mathematics or Applied Mathematics, or any equivalent diploma recognized at the national level.
  • Passing the national competitive entrance examination for the doctorate, organized in accordance with the regulations of the Ministry of Higher Education and Scientific Research.
  • Selection based on academic excellence and compliance with eligibility criteria.
  • Number of available pedagogical places for the 2024-2025 academic year: 3 places in the "Mathematics and Applications" specialization.


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Admissions Information

The research topics covered in this doctoral program focus on several specialized fields, including:

  • Well-posedness of Boundary Value Problems for Differential Equations
  • Development of High-Order Numerical Schemes
  • Study of Continuous and Discrete Dynamical Systems
  • Mathematical Modeling of Physical, Biological, and Economic Phenomena
  • Stability Analysis and Uniqueness of Solutions of Mathematical Models
  • Practical Applications of Mathematics in Health, Energy, and Industry


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