): An "intrinsic" property that determines if a surface is fundamentally flat, spherical, or saddle-shaped. Flat surfaces like planes and cylinders. Positive Curvature: Spherical shapes. Negative Curvature: Saddle-shaped hyperbolic surfaces.
Differential geometry uses the tools of calculus and linear algebra to study the shapes and properties of curves and surfaces in space. This field is split into two primary perspectives: , which describe the behavior of a surface near a specific point (like its instantaneous bending), and global properties , which look at the shape as a whole (like how many holes it has). Core Concepts of Curves Curvature ( Differential Geometry of Curves and Surfaces
If you are looking for a deep dive, the following texts are highly regarded: ): An "intrinsic" property that determines if a
These formulas describe the movement of a local coordinate system (tangent, normal, and binormal vectors) as you travel along a curve. Core Concepts of Surfaces Gaussian Curvature ( Negative Curvature: Saddle-shaped hyperbolic surfaces
The first form deals with distances and angles on the surface, while the second describes how the surface sits and bends in three-dimensional space.
): A measure of how much a curve "bends" at a specific point. Torsion (