Аннотация:
Explicit formulas for the regular homotopy classes of generic immersions
$S^k\to{\mathbb R}^{2k-2}$ are given in terms of the corresponding self-intersection manifolds with
natural additional structures.
There is a natural notion of finite order invariants of generic immersions. We determine
the group of $m$th order invariants for each $m$ and prove that the finite order
invariants are not sufficient for distinguishing generic immersions that cannot be obtained
from each other by a regular homotopy through generic immersions.
Ключевые слова:immersion, regular homotopy, finite order invariants, spin and pin structures.