middelkurvaturen

Middelkurvaturen, in differential geometry often referred to as mean curvature, is a measure of how a surface bends on average at a point. For a smooth surface embedded in three-dimensional space, two principal curvatures k1 and k2 describe bending along orthogonal directions. The mean curvature H is defined as the average of these principal curvatures: H = (k1 + k2)/2. The sign of H depends on the choice of the surface normal, since reversing the orientation changes the sign.

Equivalently, H can be expressed as one-half the trace of the shape operator, or as one-half the

Examples help illustrate the concept. A plane has H = 0 everywhere, a sphere of radius R has

Middelkurvaturen is central in variational problems: surfaces that minimize area under a boundary constraint have zero

Extensions include mean curvature for higher-dimensional submanifolds and the mean curvature flow, where a surface evolves