English

On the push-out space

Differential Geometry 2013-04-18 v1

Abstract

Let f:MmRm+kf:M^m\longrightarrow \Bbb R^{m+k} be an immersion where MM is a smooth connected mm-dimensional manifold without boundary. Then we construct a subspace Ω(f)\Omega(f) of Rk \mathbb{R}^k, namely push-out space. which corresponds to a set of embedded manifolds which are either parallel to f f , tubes around f f or, ingeneral, partial tubes around f f . This space is invariant under the action of the normal holonomy group, Hol(f)\mathcal{H}ol(f). Moreover, we construct geometrically some examples for normal holonomy group and push-out space in R3{\Bbb R}^3.These examples will show that properties of push-out space that are proved in the case Hol(f)\mathcal{H}ol(f) is trivial, is not true in general.

Keywords

Cite

@article{arxiv.1304.4924,
  title  = {On the push-out space},
  author = {Morteza Fathy and Morteza Faghfouri},
  journal= {arXiv preprint arXiv:1304.4924},
  year   = {2013}
}
R2 v1 2026-06-22T00:01:52.425Z