Γεωδαισιακές Καμπύλες

Γεωδαισιακές Καμπύλες

We define geodesics on a surface as curves whose covariant derivative of tangent vectors alog them are zero, as well as by using calculus of variations. We discuss gedesic curvature and exponential map.

Bibliographic Details
Main Authors: Arvanitogeorgos, Andreas, Αρβανιτογεώργος, Ανδρέας
Format: 7
Language:Greek
Published: 2015
Subjects:
ΓΕΩΔΑΙΣΙΑΚΗ
ΤΟ ΘΕΩΡΗΜΑ ΚΛΕΡΟ
ΛΟΓΙΣΜΟΣ ΜΕΤΑΒΟΛΩΝ
ΓΕΩΔΑΙΣΙΑΚΗ ΚΑΜΠΥΛΟΤΗΤΑ
ΕΚΘΕΤΙΚΗ ΕΠΕΙΚΟΝΙΣΗ
Geodesic
Geodesic Curvature
Calculus Of Variations
Clairaut Theorem
Exponential Map
Online Access:http://localhost:8080/jspui/handle/11419/142
Description
Summary:We define geodesics on a surface as curves whose covariant derivative of tangent vectors alog them are zero, as well as by using calculus of variations. We discuss gedesic curvature and exponential map.

Similar Items