Ensimag Rubrique Formation 2022

Graphs and Applications - Upgrade - 4MMGAMN

  • Number of hours

    • Lectures 9.0
    • Projects -
    • Tutorials 9.0
    • Internship -
    • Laboratory works -
    • Written tests -

    ECTS

    ECTS 1.5

Goal(s)

1° To get the students acquainted with graphs, which are an essential tool in combinatorial optimization, with many applications to various problems in networks, and which will appear in other courses.
2° The focus will be on modelizing problems and on the existence of general results and techniques.

Responsible(s)

Wojciech BIENIA

Content(s)

Graph search, components, trees, paths, flows and connectivity, min-cut (routing, fault-resistance), arc-disjoint paths (traffic assignment); Compatibility and conflicts: matching (client-resource assignment), coloring (frequency assignment), domination (location of concentrators); Miscellaneous: Eulerian cycles, Hamiltonian cycles (vehicle routing), broadcasting and gossiping, etc. Principles of operations research. Some other fundamental ideas of graph theory, some results and methods of combinatorial optimization like spanning tree, optimal path, scheduling, heuristic algorithms are exhibit by formulation and computation exercises.

Prerequisites

None but requires a good mathematical skill.

Test

1 written exam (2 h).

N1=E1
N2=E2

Calendar

The course exists in the following branches:

  • Curriculum - Embedded Systems & Connect. Devices - Semester 7
see the course schedule for 2019-2020

Additional Information

Course ID : 4MMGAMN
Course language(s): FR

The course is attached to the following structures:

You can find this course among all other courses.

Bibliography

W. BIENIA : "Introduction à la recherche opérationnelle et optimisation combinatoire", polycopié 2007
V. CHVATAL : "Linear programming", W.H. Freeman Company, 1983
G. FINKE at al : “Recherche Opérationnelle et réseaux” traité IGAT, HERMES, 2002
M. SAKAROVITCH : "Optimisation combinatoire vol.I et II", Hermann, 1984
N.H. XUONG : "Mathématiques discrètes et informatique", Masson, 1992.
I. Charon, A. Germa, O. Hudry, Méthodes d’Optimisation Combinatoire, Collection Pédagogique de Télécommunication, Masson, Paris, 1996
M. Gondran, M. Minoux, Graphes et Algorithmes (2ème ed. revue et augmentée). Eyrolles, Paris, 1985.
J.A. Bondy, U.S.R. Murty, Graph Theory with Applications. North-Holland, 1981.
A. Gibbons, Algorithmic Graph Theory.Cambridge University Press, 1988