The intrinsic geometry of a convex surface in Galilean space
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Karaganda National Research University named after àcademician Ye.A. Buketov
Abstract
This paper investigates the intrinsic geometry of a convex surface in the Galilean space R1
3. The Galilean
space, as a special case of a pseudo-Euclidean space, possesses a degenerate metric. The angle between two
directions is defined using a parabolic method, which is itself degenerate. The three-dimensional Galilean
space, similar to the Euclidean space, is based on a three-dimensional affine space. While the fundamental
geometric objects in these spaces coincide structurally, the geometric quantities associated with them differ
significantly from those in Euclidean geometry. It becomes necessary to introduce and rigorously define
various geometric characteristics of objects in Galilean space. Therefore, special attention in this work is
given to the total angle around the vertex of a cone, the angle between curves on a convex surface, and
the variation of curve turning on a convex surface. A geodesic on a convex surface is defined as a curve
with bounded variation of turning. A triangle is defined as a curve homeomorphic to a circle, bounded by
three geodesics. Using the concept of the total angle around the vertex of a cone, we define the intrinsic
curvature of convex surfaces in Galilean space and obtain an analogue of the Gauss–Bonnet theorem for
convex surfaces in Galilean geometry. The results obtained extend classical notions of intrinsic geometry
under a degenerate metric.
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Artykbaev A. The intrinsic geometry of a convex surface in Galilean space / A. Artykbaev, B.M. Sultanov // Bulletin of the Karaganda University. Mathematics Series. – 2025. – № 4(120). – pp 33-45.