Compulsory Course - 1st Semester (Autumn 1st year) | Course ID: 0005 | E-Class

Lecturers

Iraklis Kollias

Stelios Kotsios

Language of instruction

Greek and English

Course contents

1. The set Rn
2. Vectors in Rn
3. Matrices-Determinants
4. Eigenvalues Eigenvectors
5. Multivariate functions
6. Partial Derivatives
7. Geometric meaning of the partial derivative
8. Complex Derivation
9. Elasticities
10. Total Differential
11. Higher-order differentials
12. Del operators
13. Jacobian Hessian
14. Derivative by direction
15. Tangent planes
16. Taylor multivariate theorem
17. Implicit differentiation
18. Inverse Function Theorem
19. Implicit Derivation Theorem (with Jacobian)
20. Theory of Contour Lines
21. Contour Lines in Economics
22. Homogeneous Functions Basics
23. Derivation of Homogeneous Functions
24. Euler's Theorem
25. Economic Applications of Homogeneous Functions
26. Homothetic Functions
27. Convex Concave Functions
28. Quasi-Convex
29. Pseudo-convexPseudo-concave
30. Positive and Negative Definite Matrices
31. Optimisation of multivariate functions Economic applications
32. Envelope Theorem
33. Least Squares Method
34. Lagrange method Economic applications
35. Interpretation of the Lagrange Method
36. Kuhn-Tucker method Economic applications

Bibliography

• Strang, Gilbert (2006). Linear Algebra and Its Applications, Cengage [4^th edn]. Greek edition Crete UP [2016].
• Sydsaeter, Knut, and Peter Hammond (2008), Essential Mathematics for Economic Analysis, Prentice-Hall, 3^rd edition.
• Κατσίκης, Βασίλης Ν., και Στέλιος Κώτσιος (2021). Γενικά Μαθηματικά για την Οικονομία και τη Διοίκηση. Τόμος ΙΙ, Εκδόσεις Τσιόρτας, 3^η έκδοση.

Assessment

The course is assessed by written examinations at the end of the semester. Students are assessed on their understanding of key concepts, critical thinking and analysis and their ability to research, analyse and solve problems. Assessment criteria are communicated to students via the course outline posted on the course website in e-class.