Students are supposed to be familiar with the topics usually taught in basic course on Calculus and Elementary linear Algebra. Knowledge on differential and difference equations is also advised.

Delivery: face to face

Learning activities:

   attending lectures

   individual study

Attendance: Advised

Teaching methods: Lectures

Part I. Topology, Fixed point theorem and separation

-          The Euclidean spaces. Sequences and series in R and in Rn.

-          Metric spaces: sequences, compactness, completeness. Fixed point theorem.

-          Continuous functions on metric spaces. Continuous functions on compact sets.

-          Correspondence and fixed point theorems.

-          Convex sets and separation theorems

Part II – Linear Algebra

-          Vector spaces. Matrices. Determinant of a matrix.

-          Eigenvector and eigenvalues.

-          Diagonalization of a matrix. Canonical forms.

-          Linear Functions. Linear Functions and Matrices.

Part III Topics on Multivariable Calculus

-          Gradients and Directional Derivatives.

-          Differentiability and differential of a function.

-          Taylor's formula.

-          Euler's Theorem.

Part IV - Static optmization

-          Implicit function theorem: applications.

-          Unconstrained optimization.

-          Optimization with equality constraints: Lagrange multipliers method.

-          Optimization with inequality constraints: Kuhn-Tucker theorem.

-          Generalized Convexity.

-          Envelope theorems.

Part V- Dynamical systems

-          System of difference equations.

-          Systems of differential equations.

-          Economic applications.

Part VI - Dynamic optmization

-          Review of Reimann Integration.

-          Optimality for continuous-time problems: Optimal Control by Maximum Principle with several final conditions.

-          Optimality for problems in discrete time: Maximum principle and outline of dynamic programming: Bellman equation and Euler equation.

• S. Liptschutz, M. Lipson, Schaum’s Outline of Linear Algebra, Fourth Edition, McGraw Hill, 2009 (Chapters 1-10).
• R. Bronson, Matrix methods, Second Edition, Academic Press, Boston 1991. Chapters 2,5,7,9,10 .
• K. Sydsaeter, P. Hammond, A. Seierstad, A. Strom, Further Mathematics for Economic Analysis, Second Edition, Prentice Hall, London 2008 (Chapters 2,3,5,6,7,9,10,11,12,13,14, Appendix B)

Optional readings

• Serge Lang, Linear Algebra, Springer 1987 (or Addison Wesley, Reading MA 1971) Chapter 1-8.
• Liptschutz, M- Lipson, Schaum’s Outline of General Topology, McGraw Hill, 1968 or later editions.
• Munkres, J. R. Topology a first course. Englewood Cliffs, New Jersey [etc.], Prentice- Hall, Inc., 1975 or later editions.
• Gandolfo, Economic Dynamics, 4th edition, Springer Verlag (2009).
• Shone, Economic Dynamics: Phase Diagrams and their Economic Application, Cambridge University Press, 2003.
• P: Simon and L. BLume, Mathematics for economists, International student ed., New York, London : W.W. Norton, c1994, ISBN 978-0-393-11752-3.
• Knut Sydsæter, Arne Strøm, Peter Berck, Economists’ mathematical manual 4.ed, Berlin, Springer, 2005 ISBN 3-540-26088-9
• Antonio Villanacci Notes for the Math course at the European University Institute (Free from https://e-l.unifi.it/pluginfile.php/426564/mod_resource/content/1/math2--2017-08-31.pdf).

In the written exam, the student must demonstrate his/her knowledge of the course material and his/her ability to solve mathematical problems.

Methods: Final written exam

On the basis of the epidemiological trend and behavior of COVID-19, the exam will be held in classroom or in a virtual class

Further information:

The exam is written. The student is required to solve exercises and to answer theoretical questions.

The exam is divided in two parts: the first part is about Topology and Liner Algebra and the second part concerns the remainder of the program. The student will be successful only if he/she gets at least 7 points in each part and a global mark of 18.