### Repository

Repository is empty

### Introduction to differential geometry

 Code: 94506 ECTS: 5.0 Lecturers in charge: prof. dr. sc. Željka Milin Šipuš Lecturers: dr. sc. Tvrtko Dorešić - Exercises dr. sc. Lucija Validžić - Exercises English level: 1,0,0 All teaching activities will be held in Croatian. However, foreign students in mixed groups will have the opportunity to attend additional office hours with the lecturer and teaching assistants in English to help master the course materials. Additionally, the lecturer will refer foreign students to the corresponding literature in English, as well as give them the possibility of taking the associated exams in English.

### 1. komponenta

Lecture typeTotal
Lectures 30
Exercises 30
Description:
COURSE AIMS AND OBJECTIVES: Students will be introduced to the basic concepts of differential geometry of curves and surfaces in space in the local aspect. The geometric point of view will be emphasized. Mathematica/Maple software will be used to visualize introduced concepts.

COURSE DESCRIPTION AND SYLLABUS:
1. Curves in space. Regular curves. Arc length. Parametrization by the arc length. Frenet's moving frame. Frenet's formulas. Flexion and torsion. Fundamental theorem for space curves.
2. Surfaces in space. Regular surfaces. Tangent plane. Differential of a mapping. First fundamental form. Orientation of a surface. Shape operator (Weingarten map). Second fundamental form. Normal curvature. Principal curvatures and vectors. Gaussian and mean curvature.
3. Special curves on a surface: lines of curvatures, asymptotic lines, geodesics. Parallel transport. Local isometry of surfaces. Christoffel symbols. Gauss's Theorema Egregium. Fundamental theorem for surfaces in space.
Literature:
Prerequisit for:
Enrollment :
Passed : Differential and integral calculus 2
Passed : Linear algebra 2
 6. semester Izborni matematički predmet 3 - Regular study - Mathematics and Physics Education 10. semester Izborni matematički predmet 5 - Regular study - Mathematics and Physics Education
Consultations schedule:

### Content

Link to the course web page: https://web.math.pmf.unizg.hr/nastava/udg/