English

Tensor rectifiable G-flat chains

Analysis of PDEs 2022-12-12 v1

Abstract

A rigidity result for normal rectifiable kk-chains in Rn\mathbb{R}^n with coefficients in an Abelian normed group is established. Given some decompositions k=k1+k2k=k_1+k_2, n=n1+n2n=n_1+n_2 and some rectifiable kk-chain AA in Rn\mathbb{R}^n, we consider the properties:(1) The tangent planes to μA\mu_A split as TxμA=L1(x)×L2(x)T_x\mu_A=L^1(x)\times L^2(x) for some k1k_1-plane L1(x)Rn1L^1(x)\subset\mathbb{R}^{n_1} and some k2k_2-plane L2(x)Rn2L^2(x)\subset\mathbb{R}^{n_2}.(2) A=AΣ1×Σ2A=A_{\vert\Sigma^1\times\Sigma^2} for some sets Σ1Rn1\Sigma^1\subset\mathbb{R}^{n_1}, Σ2Rn2\Sigma^2\subset\mathbb{R}^{n_2} such that Σ1\Sigma^1 is k1k_1-rectifiable and Σ2\Sigma^2 is k2k_2-rectifiable (we say that AA is (k1,k2)(k_1,k_2)-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 (k1,k2)(k_1,k_2)-chains) in Rn1×Rn2\mathbb{R}^{n_1}\times\mathbb{R}^{n_2} which generalize Fleming's GG-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 (k1,k2)(k_1,k_2)-chain and that on the other hand any normal rectifiable (k1,k2)(k_1,k_2)-chain is (k1,k2)(k_1,k_2)-rectifiable.

Keywords

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}
}
R2 v1 2026-06-28T07:27:28.814Z