Tensor rectifiable G-flat chains
Abstract
A rigidity result for normal rectifiable -chains in with coefficients in an Abelian normed group is established. Given some decompositions , and some rectifiable -chain in , we consider the properties:(1) The tangent planes to split as for some -plane and some -plane .(2) for some sets , such that is -rectifiable and is -rectifiable (we say that is -rectifiable).The main result is that for normal chains, (1) implies (2), the converse is immediate. In the proof we introduce the new groups of tensor flat chains (or -chains) in which generalize Fleming's -flat chains. The other main tool is White's rectifiable slices theorem. We show that on the one hand any normal rectifiable chain satisfying~(1) identifies with a normal rectifiable -chain and that on the other hand any normal rectifiable -chain is -rectifiable.
Cite
@article{arxiv.2212.04753,
title = {Tensor rectifiable G-flat chains},
author = {Michael Goldman and Benoît Merlet},
journal= {arXiv preprint arXiv:2212.04753},
year = {2022}
}