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.
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.
Course calendar
The Academic Calendar sets out the degree programme lecture and exam timetables, as well as the relevant university closure dates..
Period | From | To |
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I semestre | Oct 1, 2013 | Jan 31, 2014 |
II semestre | Mar 3, 2014 | Jun 13, 2014 |
Session | From | To |
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Sessione straordinaria | Feb 3, 2014 | Feb 28, 2014 |
Sessione estiva | Jun 16, 2014 | Jul 31, 2014 |
Sessione autunnale | Sep 1, 2014 | Sep 30, 2014 |
Session | From | To |
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Sessione autunnale | Oct 9, 2013 | Oct 9, 2013 |
Sessione straordinaria | Dec 12, 2013 | Dec 12, 2013 |
Sessione invernale | Mar 12, 2014 | Mar 12, 2014 |
Sessione estiva | Jul 16, 2014 | Jul 16, 2014 |
Period | From | To |
---|---|---|
Vacanze Natalizie | Dec 22, 2013 | Jan 6, 2014 |
Vacanze di Pasqua | Apr 17, 2014 | Apr 22, 2014 |
Festa del S. Patrono S. Zeno | May 21, 2014 | May 21, 2014 |
Vacanze Estive | Aug 11, 2014 | Aug 15, 2014 |
Exam calendar
Exam dates and rounds are managed by the relevant Science and Engineering 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.
Academic staff
Cecchi Franco
franco.cecchi@univr.it 045 802 7964 - 7965Fatone Francesco
francesco.fatone@univr.it 045 802 7965Monaco Ugo Luigi
hugo.monaco@univr.it 045 802 7903; Lab: 045 802 7907 - 045 802 7082Spena Angelo
angelo.spena@univr.it 045 683 5623Ugolini Simone
simone.ugolini@univr.itVallini Giovanni
giovanni.vallini@univr.it 045 802 7098; studio dottorandi: 045 802 7095Study 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 enrollment year.
1° Year
Modules | Credits | TAF | SSD |
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2° Year activated in the A.Y. 2014/2015
Modules | Credits | TAF | SSD |
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3° Year activated in the A.Y. 2015/2016
Modules | Credits | TAF | SSD |
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Modules | Credits | TAF | SSD |
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Modules | Credits | TAF | SSD |
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Modules | Credits | TAF | SSD |
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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.
Mathematics and statistics (2013/2014)
Teaching code
4S02690
Credits
12
Language
Italian
Scientific Disciplinary Sector (SSD)
MAT/05 - MATHEMATICAL ANALYSIS
The teaching is organized as follows:
Matematica
Credits
8
Period
I semestre
Academic staff
Simone Ugolini
Statistica
Learning outcomes
Module: MATHEMATICS.
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This course aims at providing the students with the mathematical tools (set-theoretic and algebraic
structures, differential and integral calculus in one or several real variables, ordinary differential
equations) whose knowledge is indispensable for the achievement of the degree. A particular
attention is paid to the concrete application of the learned notions.
Module: STATISTICS.
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This course aims to provide the students with the fundamental of descriptive statistics, inferential statistics and probability theory.
Program
Module: MATHEMATICS
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1) Some notions of set theory.
2) The complete ordered field of the real numbers.
3) Euclidean distance and induced topology on the real line. Absolute value of a real number.
4) Cartesian plane.
5) Real functions of one real variable.
6) Polynomials and polynomial functions. Power, exponential and logarithmic functions. Trigonometric functions.
7) Limit of a function of one real variable.
8) Continuity of a function of one real variable at one point. Fundamental theorems on continuos functions.
9) Derivative of a function. Derivation rules. Fundamental theorems on differentiable functions.
10) Monotonicity of a function. Local and global minima and maxima of a function.
11) Convex functions.
12) Riemann integral. Integration rules. Improper integrals.
13) Ordinary differential equations. The separable and the linear case.
14) The vector space R^n. Geometrical representations of the vectors in R^2 and R^3.
15) Euclidean distance in R^n and induced topology on R^n. The cases n=2 and n=3.
16) Distance between two points in the plane and geometrical loci. Conics.
17) Linear algebra. Matrices and operations on them. Determinant of a square matrix.
18) Functions of more variables. Level curves and level sets.
19) Linear and affine functions. Quadratic forms.
20) Continuity of a function of more variables.
21) Differentiable functions in more variables. Partial derivatives.
22) Local and global minima and maxima of a function of more variables.
Module: STATISTICS
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Part I) descriptive statistics.
Univariate statistics: main chart (pie chart, bar chart, histogram e box-plot), measures of location (mean, mode and median), measure of spread (range, interquartile range, variance, standard deviation), measure of asymmetry (third moment, skewness index, Pearson's skewness coefficient) measure of kurtosis (fourth moment, kurtosis, excess kurtosis).
Bivariate statistics: main representations (contingency tables e shattered plots), main measures (mean, variance and covariance), correlation analysis (linear regression and Pearson's correlation coefficient).
Part II) Probability theory
Probability: probability definition (classic and modern), event taxonomy (independent events, mutually exclusive events, complementary event, union event and intersection event). Conditional probability. Probability of notable events.
Random variables: discrete random variable (discrete probability distribution, expected value and variance), continuous random variable (probability density function, expected value and variance), main continuous distributions (uniform, gaussian, standard normal and chi-square).main discrete distributions (binomial and Bernoulli), central limit theorem, Chebyshev’s inequality, convergence in law of random variables and limit random variable.
Part III) Inferential Statistics.
Estimation theory: estimation problem, main properties of an estimator (unbiased, consistency and efficiency). point estimation (expected value and variance), interval estimation (expected value and variance).
Hypothesis test: Problem statement (first type and second type error, theoretical distribution), testing process, chi-square based independence test.
Examination Methods
Module: MATHEMATICS.
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Written exam.
Module: STATISTICS.
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Written exam.
Teaching materials e documents
- 0.1 - informazioni sul corso (it, 30 KB, 16/10/13)
- 0.2 - Introduzione al corso e dizionario minimale (it, 25 KB, 30/10/13)
- 1.1 - Statistica descrittiva I - Serie monovariate: principali rappresentazioni e definizioni di frequenze (versione stampabile) (it, 73 KB, 16/10/13)
- 1.2 - Statistica descrittiva II - Serie monovariate: principali indici sintetici (posizione, variabilità, simmetria e curtosi), outlier e box-plot. (it, 616 KB, 30/10/13)
- 1.3 - Statistica descrittiva III - Serie bivariate: principali rappresentazioni tabellari e grafche, indici sintetici e regressione. (it, 276 KB, 30/10/13)
- 2.1 - Probabilità I - Definzioni introduttive, calcolo delle probabilità: definzioni (frequentistica, classica ed assiomatica), probabilitàcondizionata (it, 205 KB, 30/10/13)
- 2.2 - Probabilità II - Variabili Casuali Discrete: definizioni introduttive, valore atteso, varianza, principali vv.cc. (it, 192 KB, 23/10/13)
- 2.3 - Probabilità III - Variabili Casuali Continue: principali indici sintetici, principali vv.cc., teorema del limite centrale, convergenza in legge. (it, 332 KB, 04/12/13)
- 3.1 - Inferenza I - Teoria della stima: definizioni di base, proprietà di uno stimatore, stima puntuale e per intervallo di valore atteso e varianza. (it, 133 KB, 19/11/13)
- 3.2 - Inferenza II - Test di ipotesi: principi generali, test sul valore atteso, test di aderenza alla distribuzione, test di indipendenza di Pearson (it, 159 KB, 04/12/13)
- 4.1 - Errata Corrige del 4 Dicembre 2013 (it, 49 KB, 04/12/13)
- 4.2 - Errata Corrige II - libro degli esercizi. (it, 74 KB, 05/12/13)
- 4.3 - Errata Corrige IV - libro degli esercizi (terza parte). (it, 57 KB, 12/02/14)
- 4.5 - Errata Corrige V (it, 55 KB, 13/07/14)
- 6.2 - Raccolta Temi d'esame (it, 709 KB, 13/07/14)
- 6.3 - Appello del 12 Febbraio -Risolto (it, 50 KB, 03/03/14)
- 6.4 - Appello del 26 Febbraio -Risolto (it, 113 KB, 13/07/14)
- 6.5 - Appello del 25 Giugno -Risolto (it, 125 KB, 29/06/14)
- 6.6 - Appello del 10 Luglio -Risolto (it, 119 KB, 15/07/14)
- 6.7 - Appello del 3 Settembre -Risolto (it, 136 KB, 06/09/14)
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: only in this way will you be able to receive notification of all the notices from your teachers and your secretariat via email and also via the Univr app.
Graduation
List of thesis proposals
theses proposals | Research area |
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Studio delle proprietà di luminescenza di lantanidi in matrici proteiche | Synthetic Chemistry and Materials: Materials synthesis, structure-properties relations, functional and advanced materials, molecular architecture, organic chemistry - Colloid chemistry |
Multifunctional organic-inorganic hybrid nanomaterials for applications in Biotechnology and Green Chemistry | Synthetic Chemistry and Materials: Materials synthesis, structure-properties relations, functional and advanced materials, molecular architecture, organic chemistry - New materials: oxides, alloys, composite, organic-inorganic hybrid, nanoparticles |
Dinamiche della metilazione del DNA e loro contributo durante il processo di maturazione della bacca di vite. | Various topics |
Il problema della donazione degli organi | Various topics |
Risposte trascrittomiche a sollecitazioni ambientali in vite | Various topics |
Studio delle basi genomico-funzionali del processo di embriogenesi somatica in vite | Various topics |
Attendance modes and venues
As stated in the Didactic Regulations, there is no generalised obligation of attendance. Individual lecturers are, however, free to require a minimum number of hours of attendance for eligibilitỳ for the profit exam of the teaching they teach. In such cases, attendance of teaching activities is monitored in accordance with procedures communicated in advance to students.
Part-time enrolment is permitted. Find out more on the Part-time enrolment possibilities page.
The course's teaching activities take place in the Science and Engineering area, which is composed of the buildings of Ca‘ Vignal 1, Ca’ Vignal 2, Ca' Vignal 3 and Piramide, located in the Borgo Roma cluster, and Villa Lebrecht and Villa Eugenia located in the San Floriano di Valpolicella cluster.
Lectures are held in the classrooms of Ca‘ Vignal 1, Ca’ Vignal 2 and Ca' Vignal 3, while practical exercises take place in the teaching laboratories dedicated to the various activities.