A = one year course (teaching distributed on two semesters)
I or II S = semester course (teaching distributed on 1st or 2nd semester in normal, e.g. equivalent to 1/2 year, or intensive way, e.g. equivalent to one year course)
Due to Faculty reorganization, not all indications can be given, and some are subject to change.
Sets and numbers. Sequences and limits. Functions of one variable, limits and continuity. Derivatives. Minima and maxima. Rolle, Cauchy, Lagrange, L'Hôpital theorems. Taylor formula. Convex functions. Integrals. Numerical series.
Kinematic of a point particle. Fundamental interactions. Work, energy and power. Conservative and dissipative forces. Rotational motion of a rigid body. Elastic and anelastic collisions. Hydrostatic. The laws of the termodinamicas. Entropy. The kinetic theory of the gases.
Vector spaces and linear mappings. Matrices, determinants and linear systems. Eigenvalues and eigenvectors. Scalar products. Analytic geometry; theory of conics and quadrics.
Building materials and tecniques; ancient Greek architecture, Greek architecture, Roman architecture, Medieval architecture, Gothic architecture.
Methods of representation. Orthogonal projection. Axonometric projection. Central projection and perspective. Elements of architectural drawing.
Functions of several variables, limits and continuity. Partial derivatives. Taylor formula. The implicit functions theorem. Minima and maxima. Lagrange multipliers. Curve integrals. Ordinary differential equations and systems. Multiple integrals. Surface integrals. Gauss-Green formulas. Stokes theorem. Sequences and series of functions.
This course is devote to give theoretical instruments to describe phenomena related to the electricity and magnetism. The Knowledge of basic elements of mechanics is required. Some elements of optics are exposed in the last part of the course.
Material point kinematics. Finite degrees of freedom systems kinematics. Rigid body kinematics. Free and constrained material point static and dynamics. Virtual works principle on statics. Rigid body statics; rigid bodies systems statics and dynamics. Equilibrium stability and vibrating systems. Lagrange's and Hamilton'sequations. Fluids.
Syntax and semantics of programming languages. The programming language Pascal. Simple and structured types. Type declarations. Function and procedure declarations. Fundamental algorithms: ordering and search. Assembly languages. Operating systems and tools: compilers, interpreters, editors, loaders and debuggers. Aspects of database: introduction to relational algebra.
Ewa Karwacka Codini
The course concerns the history of the architecture of classical
Renaissance and Mannerism, Baroque, Eighteen century (Enlightenment,
neoclassicism, neo-Gothic) and modern architecture of the XIXth century, in
Europe. Deals with various subjects, both the town planning, religious,
residential, public architecture and garden. The exercise include drawing
messages of significant examples and research work on one building, selected by
every student.
Costantino Caciagli
The language of the drawing representation, historical language of
architecture, at right drawing, building surveying and pertinent analysis,
building design, planning method and project of a dwelling house.
Strength of Materials
Architecture and Architectural Composition (Design) I
Technical Physics
Technical installations in the Building
Technical Architecture
Applied Chemistry
Technical Constructions
Geotechnics
Technical Architecture and Building Typology
Architecture and Architectural Composition (Design) II
Urbanistic Technique
Hydraulics
Recovery and Restoration of Buildings
Economy and valuation
Applied ergonomics
Architecture and Architectural Composition (Design) III
Juridical regulation
Theory Of Structures
Fundamentals Of Roads Infrastructures
Territorial Planning
Topography
Analysis and environmental evaluation