Singularities of affine equidistants: extrinsic geometry of surfaces in 4-space

Abstract

For a generic embedding of a smooth closed surface M into R4, the subset of R4 which is the affine λ-equidistant of M appears as the discriminant set of a stable mapping M × M R4, hence their stable singularities are Ak, \, k=2, 3, 4, and C2,2. In this paper, we characterize these stable singularities of λ-equidistants in terms of the bi-local extrinsic geometry of the surface, leading to a geometrical study of the set of weakly parallel points on M.