Lyoubomira SOFTOVA PALAGACHEVA | MATHEMATICAL ANALYSIS III
Lyoubomira SOFTOVA PALAGACHEVA MATHEMATICAL ANALYSIS III
cod. 0512300008
MATHEMATICAL ANALYSIS III
| 0512300008 | |
| DIPARTIMENTO DI MATEMATICA | |
| EQF6 | |
| MATHEMATICS | |
| 2021/2022 |
| OBBLIGATORIO | |
| YEAR OF COURSE 2 | |
| YEAR OF DIDACTIC SYSTEM 2018 | |
| AUTUMN SEMESTER |
| SSD | CFU | HOURS | ACTIVITY | |
|---|---|---|---|---|
| MAT/05 | 8 | 64 | LESSONS |
| Objectives | |
|---|---|
| IN THIS COURSE THERE ARE INTRODUCED THE BASIC PORPERTIES OF DIFFERENTIAL CALCULUS FOR FUNCTIONS OF SEVERAL VARIABLES. MAIN ATTENTION IS FOCUSED ON OPTIMIZATION PROBLEMS. THE BASIC TECHNIQUE FOR SOLVING ELEMENTARY ORDINARY DIFFERENTIAL EQUATIONS ARE GIVEN ABILITY TO APPLY AWARENESS: ONE OF THE MAIN PURPOSE OF THE COURSE IS TO ACHIEVE THE STUDENT TO SOLVE OPTIMIZATION PROBLEMS USING THE TECHNICQUE ASSIMILATED. |
| Prerequisites | |
|---|---|
| BASIC PROPERTIES OF FUNCTIONS OF A REAL VARIABLE: CONTINUITY, DIFFERENTIABILITY, INTEGRATION. |
| Contents | |
|---|---|
| METRIC SPACES, TOPOLOGY AND CONVERGENCE. SEQUENCES IN METRIC SPACES. BANACH THEOREM. (6H LESSONS) FUNCTIONAL SEQUENCES. POINTWISE AND UNIFORM CONVERGENCE. SERIES OF FUNCTIONS, CONVERGENCE CRITERIA. CONTINUITY, DERIVABILITY AND INTEGRABILITY THEOREMS. POWER SERIES, CONVERGENCE RADIUS. TAYLOR SERIES. FOURIER SERIES. ORTHONORMAL SYSTEMS. UNIFORM AND POINTWISE CONVERGENCE. DIRICHLET THEOREM. (14H LESSONS + 6H EXERCISES) TOPOLOGY IN RN. FUNCTIONS OF MORE VARIABLES, LIMITS AND CONTINUITY, DERIVABILITY AND DERIVATION RULES. DIFFERENTIABILITY, GRADIENT FORMULA. SCHWARTZ THEOREM. FORMULA OF TAYLOR WITH REST OF LAGRANGE AND PEANO. MINIMUM AND MAXIMUM OF FUNCTIONS OF MORE VARIABLES. . STATIONARY POINTS AND STUDY OF NATURE THROUGH THE FERMAT THEOREM AND THE PROPERTIES OF THE QUADRATIC FORMS, SUFFICIENT CONDITION. LINEAR LEAST SQUARES. (16H LESSONS + 6H EXERCISES) FIRST ORDER ORDINARY DIFFERENTIAL EQUATIONS, EQUATIONS WITH SEPARABLE VARIABLES, LINEAR AND BERNOULLI EQUATIONS, HOMOGENEOUS EQUATIONS. CAUCHY PROBLEM. THEOREM OF EXISTENCE AND UNIQUENESS OF THE SOLUTION OF THE CAUCHY PROBLEM. QUALITATIVE STUDY OF SOLUTIONS OF FIRST ORDER EQUATIONS. LINEAR EQUATIONS WITH CONSTANT COEFFICIENTS OF HIGHER ORDER. DETERMINANT OF WRONSKI. MATHEMATICAL MODELS. (12H LESSONS + 4H EXERCISES) |
| Teaching Methods | |
|---|---|
| FRONTAL LESSON PRACTICE LESSON |
| Verification of learning | |
|---|---|
| THE LEARNING VERIFICATION TAKES PLACE THROUGH AN ORAL EXAM AND INCLUDES A WRITTEN EXAM, TO INTEGRATE THE ORAL EXAM. IN PARTICULAR, ON THE BASIS OF METHODOLOGIES, INSTRUMENTS AND CONTENT GIVEN DURING THE LESSONS, THE STUDENT MUST DEMONSTRATE THAT HE IS ABLE TO UNDERSTAND THE PROBLEM, FIND THE CORRECT MATHEMATICAL-QUANTITATIVE INTERPRETATION, RECOGNIZE THE APPROPRIATE METHOD, UNDERSTAND THE ANSWERS DEDUCED BY THE METHOD AND ITS INFERENCES. |
| Texts | |
|---|---|
C. PAGANI, S. SALSA, ANALISI MATEMATICA 1, PP. 496, ZANICHELLI, 2015; C. PAGANI, S. SALSA, ANALISI MATEMATICA 2, PP. 560, ZANICHELLI, 2016; M. BRAMANTI, C. PAGANI, S. SALSA, ANALISI MATEMATICA 2, PP. 504, ZANICHELLI, 2009. M. AMAR, A.M. BERSANI, ESERCIZI DI ANALISI MATEMATICA, PROGETTO LEONARDO, BOLOGNA, 2004 S. SALSA, A. SQUELLATI, ESERCIZI DI ANALISI MATEMATICA VOL. 2, ZANICHELLI, 2011 P. MARCELLINI, C. SBORDONE, ESERCITAZIONI DI ANALISI MATEMATICA 2, ZANICHELLI, 2017 M. BRAMANTI, ESERCITAZIONI DI ANALISI MATEMATICA 2, ESCULAPIO, 2012 |
| More Information | |
|---|---|
| LSOFTOVA@UNISA.IT LBSOFTOVA@YAHOO.COM |
BETA VERSION Data source ESSE3 [Ultima Sincronizzazione: 2022-11-21]
