- Docente: Nicola Arcozzi
- Credits: 6
- SSD: MAT/05
- Language: Italian
- Teaching Mode: Traditional lectures
- Campus: Bologna
- Corso: Single cycle degree programme (LMCU) in Architecture and Building Engineering (cod. 0940)
Learning outcomes
Course contents
Preliminaries: R^nas a normed linear space.Closed, open, compact andbounded sets.Functionsof several variables: limits, boundedness, continuity and the main properties of continuous functions.
Differential calculus:partial derivatives, directional derivatives, C^1 functions and their differentiability. Plane tangent to the graph of a function, differential, Jacobian and gradient.Chain rule and other rules of differentiation.Higher order derivatives and Hessian matrix: Schwarz Theorem. Taylor formula of 1st and 2nd degree. Local minima and maxima in multivariable calculus, necessary and sufficient conditions.
Integration Definition of measure according to Peano in R^n, exetrior and interior measure, Riemann integration.Properties of integrals: mean value theorem, Cavalieri principle, change of variables in multiple integrals.
Integration by parts in several variable calculus: surfaces, normal vector, vector fields, integration on a surface. Work and line integrals. Differential forms: exact and closed; theorem of Volterra-Poincarè. Gauss Theorem.
Linear ordinary differential equationshomogeneous and non homogeneous case. The general theory and explicit solution on particular cases.
Teaching methods
Lectures and exercise sessions
Assessment methods
Written and oral exam
Teaching tools
Notes and exercises at
http://www.dm.unibo.it/~arcozzi/didattica.html
Links to further information
http://www.dm.unibo.it/~arcozzi/didattica.html
Office hours
See the website of Nicola Arcozzi