Giuseppe Mazzuoccolo

Foto,  October 5, 2015
Position
Associate Professor
Academic sector
MAT/03 - GEOMETRY
Research sector (ERC)
PE1_15 - Discrete mathematics and combinatorics

PE1_5 - Geometry

Office
Ca' Vignal 2,  Floor 2,  Room 19
Telephone
+39 0458027838
Fax
+39 0458027068
E-mail
giuseppe|mazzuoccolo*univr|it <== Replace | with . and * with @ to have the right email address.

Office Hours

Monday, Hours 1:00 PM - 3:00 PM,   Ca' Vignal 2, Floor 2, room 19
Fuori dai periodi di lezione inviare una mail per prenotare il ricevimento.
Il ricevimento è possibile anche via Skype: giumazz2

Curriculum

L'area di ricerca del Prof. Giuseppe Mazzuoccolo si concentra in particolare nell'ambito della Teoria dei Grafi, Teoria dei Disegni e della Geometria Combinatoria.
Le sue pubblicazioni scientifiche si collocano prevalentemente su riviste internazionali dell'area della matematica discreta ( Journal Graph Theory, European Journal of Combinatorics, Discrete Mathematics, Electronic Journal of Combinatorics).
Da oltre dieci anni si occupa di organizzare attività di preparazione alle Olimpiadi della Matematica per studenti delle scuole superiori.

Modules

Modules running in the period selected: 21.
Click on the module to see the timetable and course details.

Course Name Total credits Online Teacher credits Modules offered by this teacher
Master's degree in Mathematics Advanced geometry (2021/2022)   6   
Bachelor's degree in Applied Mathematics Geometry (2021/2022)   6   
Bachelor's degree in Applied Mathematics Linear Algebra and Elements of Geometry (2021/2022)   12  eLearning ELEMENTI DI GEOMETRIA (Teoria)
Master's degree in Mathematics Advanced geometry (2020/2021)   6  eLearning
Master's degree in Mathematics Differential geometry (2020/2021)   6  eLearning
Bachelor's degree in Applied Mathematics Geometry (2020/2021)   6  eLearning
Master's degree in Mathematics Advanced geometry (2019/2020)   6  eLearning
Master's degree in Mathematics Differential geometry (2019/2020)   6  eLearning
Bachelor's degree in Applied Mathematics Geometry (2019/2020)   6  eLearning
Master's degree in Mathematics Advanced geometry (2018/2019)   6  eLearning
Master's degree in Mathematics Differential geometry (2018/2019)   6  eLearning
Bachelor's degree in Applied Mathematics Geometry (2018/2019)   6  eLearning
Master's degree in Mathematics Advanced geometry (2017/2018)   6  eLearning
Master's degree in Mathematics Differential geometry (2017/2018)   6  eLearning
Bachelor's degree in Applied Mathematics Geometry (2017/2018)   6  eLearning
Master's degree in Mathematics Advanced geometry (2016/2017)   6  eLearning
Master's degree in Mathematics Differential geometry (2016/2017)   6  eLearning
Bachelor's degree in Applied Mathematics Geometry (2016/2017)   6  eLearning
Master's degree in Mathematics Advanced geometry (2015/2016)   6  eLearning
Master's degree in Mathematics Differential geometry (2015/2016)   6  eLearning
Bachelor's degree in Applied Mathematics Geometry (2015/2016)   6  eLearning

 

Research groups

INdAM - Research Unit at the University of Verona
We collect here the scientific activities of the Research Unit of Istituto Nazionale di Alta Matematica INdAM at the University of Verona
Research interests
Topic Description Research area
Polytopes and Polihedra Polytopes and polyhedra are objects of study in topology, computational geometry, mathematical programming, and combinatorial optimization. The last two perspectives offer tools of operations research which find employment in some of the applied mathematics research lines in Verona. Discrete and computational mathematics
Polytopes and polyhedra
Graph Theory Graphs are a flexible model for core combinatorial problems as arising in various applications. In particular, graphs are encountered in various fields of mathematics, computer science, science in general, and technology. With this, graph theory is not only fun, but it is also a well established and central area of discrete mathematics of topmost interdisciplinarity. Some topics we are interested in: matching, factoring, edge-coloring, flows, cycle basis, packing, covering and partitioning, graph classes, algorithmic graph theory. Discrete and computational mathematics
Graph theory
Projects
Title Starting date
Reducing complexity in algebra, logic, combinatorics (REDCOM) 1/1/20




Organization

Department facilities