Studying at the University of Verona

Here you can find information on the organisational aspects of the Programme, lecture timetables, learning activities and useful contact details for your time at the University, from enrolment to graduation.

A.A. 2012/2013

Academic calendar

The academic calendar shows the deadlines and scheduled events that are relevant to students, teaching and technical-administrative staff of the University. Public holidays and University closures are also indicated. The academic year normally begins on 1 October each year and ends on 30 September of the following year.

Academic calendar

Course calendar

The Academic Calendar sets out the degree programme lecture and exam timetables, as well as the relevant university closure dates..

Definition of lesson periods
Period From To
primo semestre Sep 24, 2012 Dec 21, 2012
secondo semestre Feb 18, 2013 May 24, 2013
Exam sessions
Session From To
Saperi minimi Oct 1, 2012 Sep 30, 2013

Exam calendar

Exam dates and rounds are managed by the relevant Economics Teaching and Student Services Unit.
To view all the exam sessions available, please use the Exam dashboard on ESSE3.
If you forgot your login details or have problems logging in, please contact the relevant IT HelpDesk, or check the login details recovery web page.

Exam calendar

Should you have any doubts or questions, please check the Enrolment FAQs

Academic staff

B C D F L M N O P R S V

Bombieri Nicola

nicola.bombieri@univr.it +39 045 802 7094

Brunetti Federico

federico.brunetti@univr.it 045 802 8494

Cantele Silvia

silvia.cantele@univr.it 045 802 8220 (VR) - 0444 393943 (VI)

Carlotto Ilaria

ilaria.carlotto@univr.it 045 802 8264

Corsi Corrado

corrado.corsi@univr.it 045 802 8452 (VR) 0444/393937 (VI)

De Crescenzo Veronica

veronica.decrescenzo@univr.it 045 802 8163

Duret Paolo

paolo.duret@univr.it 0458028873

Faccincani Lorenzo

lorenzo.faccincani@univr.it 045 802 8610

Fiorentini Riccardo

riccardo.fiorentini@univr.it 0444 393934 (VI) - 045 802 8335(VR)

Fioroni Tamara

tamara.fioroni@univr.it 0458028489

Levati Maria Vittoria

vittoria.levati@univr.it 045 802 8640

Lionzo Andrea

andrea.lionzo@univr.it

Mola Lapo

lapo.mola@univr.it 045/8028565

Novello Diego

avv.novello@studionovelloepartners.it

Omodei Sale' Riccardo

riccardo.omodeisale@univr.it 045 802 8855

Peretti Alberto

alberto.peretti@univr.it 0444 393936 (VI) 045 802 8238 (VR)

Pertile Paolo

paolo.pertile@univr.it 045 802 8438

Pichler Flavio

flavio.pichler@univr.it 045 802 8273

Ricciuti Roberto

roberto.ricciuti@univr.it 0458028417

Rossignoli Francesca

francesca.rossignoli@univr.it 0444 393941 (Ufficio Vicenza) 0458028261 (Ufficio Verona)

Rutigliano Michele

michele.rutigliano@univr.it 0458028610

Signori Paola

paola.signori@univr.it 0444 393942 (VI) 045 802 8492 (VR)

Sommacal Alessandro

alessandro.sommacal@univr.it 045 802 8716

Veronesi Marcella

marcella.veronesi@univr.it 045 802 8025

Study Plan

The Study Plan includes all modules, teaching and learning activities that each student will need to undertake during their time at the University. Please select your Study Plan based on your enrolment year.

ModulesCreditsTAFSSD
9
A
(IUS/01)
9
B
(SECS-P/08)
6
C
(IUS/09)
9
A
(SECS-P/01)
9
A
(SECS-S/06)
ModulesCreditsTAFSSD
9
B
(IUS/04)
9
B
(SECS-P/01)
9
B
(SECS-P/07)
9
B
(SECS-P/07)
9
B
(SECS-P/03)
9
B
(SECS-S/01)
ModulesCreditsTAFSSD
9
B
(SECS-P/01)
6
B
(SECS-P/08)
6
C
(SECS-P/10)
6
S
(-)
Prova finale
3
E
(-)

1° Year

ModulesCreditsTAFSSD
9
A
(IUS/01)
9
B
(SECS-P/08)
6
C
(IUS/09)
9
A
(SECS-P/01)
9
A
(SECS-S/06)

2° Year

ModulesCreditsTAFSSD
9
B
(IUS/04)
9
B
(SECS-P/01)
9
B
(SECS-P/07)
9
B
(SECS-P/07)
9
B
(SECS-P/03)
9
B
(SECS-S/01)

3° Year

ModulesCreditsTAFSSD
9
B
(SECS-P/01)
6
B
(SECS-P/08)
6
C
(SECS-P/10)
6
S
(-)
Prova finale
3
E
(-)
Modules Credits TAF SSD
Between the years: 1°- 2°- 3°

Legend | Type of training activity (TTA)

TAF (Type of Educational Activity) All courses and activities are classified into different types of educational activities, indicated by a letter.




SPlacements in companies, public or private institutions and professional associations

Teaching code

4S00181

Credits

9

Coordinatore

Alberto Peretti

Scientific Disciplinary Sector (SSD)

SECS-S/06 - MATHEMATICAL METHODS OF ECONOMICS, FINANCE AND ACTUARIAL SCIENCES

Language

Italian

The teaching is organized as follows:

lezione

Credits

6

Period

primo semestre

Academic staff

Alberto Peretti

esercitazione [A-K]

Credits

3

Period

primo semestre

Academic staff

Alberto Peretti

esercitazione [L-Z]

Credits

3

Period

primo semestre

Academic staff

Alberto Peretti

Learning outcomes

Module: 1 - lectures
-------
The aim of the course is to give the fundamental mathematical knowledge, necessary to the following courses in Statistics and Economics.
The course provides the classical arguments from Mathematical Analysis and Linear Algebra.


Module: 2 - esercise lectures
-------

This module intends to complete the theoretical knowledge with the adequate calculus ability.

Program

Module: 1 - lectures
-------

Introduction

Sets, Combinatorial calculus, Sums
Fundamental numerical sets: natural, integer, rational and real numbers

Part I (revisal)

Polinomials
Powers and logarithms
Equations and inequalities
Analytic geometry

Part II (Real analysis)

Theory of sets. Power set. Cartesian product. Numerical sets: natural, integer, rational and real numbers
Functions. Composition of functions. Inverse function
Real numbers. Sup and inf of a set of real numbers.
Real functions. Plot. Image and inverse image. Sup of a function. Monotone functions. Elementary functions and their graphics. Power, exponential and logarithmic function
Limits and continuity. Calculus of limits. Landau symbols. Continuous functions. Weierstrass theorem
Derivatives. Calculus of derivatives. Stationary points. Maxima and minima of functions. Lagrange theorem. Mention to Taylor's formula and convex functions
Integrals. Primitive of a function. Riemann integral. Some properties of the Riemann integral. Integral function and the fundamental theorem of calculus. Calculus of the Riemann integral. Elementary methods. Integration by parts. Change of variable in the integral. The Riemann generalized integral.
Series. Geometric series and armonic series. Convergence criteria for series with positive terms

Part III (Linear algebra)

Linear spaces Rn. Linear dependence and linear independence. Subspaces. Basis and dimension of a space. Inner product
Mention to linear transformations. Matrices. Kernel and image of a linear transformation. Rank
Determinant and its properties. Inverse matrix. Calculus of the rank
Systems of linear equations. Rouché-Capelli's theorem. Cramer's theorem

Part IV (Real analysis in more variables)

Functions of more than one variable. Sets in Rn. Restriction. Level curves
Quadratic forms. Sign of a quadratic form. Study of the sign with principal minors
Partial derivatives and gradient. Derivatives and continuity. Differentiability. Second derivatives and Schwarz's theorem
Maxima and minima. Non constrained and constrained search of minima

Textbook
The teacher's Lecture notes freely available on the web at
http://cide.univr.it/aperetti

Examination Methods

Module: 1 - lectures
-------
In order to pass the exam students are asked to pass first a multiple choice test. A written exam is then proposed. A final oral exam is required only in case of a non full sufficiency.

Type D and Type F activities

Modules not yet included

Career prospects


Module/Programme news

News for students

There you will find information, resources and services useful during your time at the University (Student’s exam record, your study plan on ESSE3, Distance Learning courses, university email account, office forms, administrative procedures, etc.). You can log into MyUnivr with your GIA login details.

Student mentoring


Internships


Gestione carriere


Graduation


Linguistic training CLA


Further services

I servizi e le attività di orientamento sono pensati per fornire alle future matricole gli strumenti e le informazioni che consentano loro di compiere una scelta consapevole del corso di studi universitario.