Sobolev mappings of Euclidean space and product structure

Abstract

We consider bounded open connected sets 1, 2 ⊂ Rn and Sobolev maps f: 1 × 2 ⊂ Rn × Rn, such that for almost every x ∈ 1 × 2 the weak differential ∇ f(x) is invertible and preserves or swaps the spaces Rn × \0\ and \0\ × Rn. We show that if n 2 and f ∈ W1,2 then f is split, i.e., f(x1, x2) = (f1(x1), f2(x2)) or f(x1, x2) = (f2(x2), f1(x1)). We also show that this conclusion fails in general for n=1, even if we assume in addition that f is bi-Lipschitz and area preserving. These results complement our previous work https://arxiv.org/abs/2403.20265, where we showed that the conclusion fails for n 2 if the Sobolev space W1,2 is replaced by W1,p for any p < 2. We also discuss results for approximately split maps, i.e. for sequences of maps fk such that ∇ fk approaches the set of linear invertible split maps in suitable Lp spaces. This work is partly motivated by the question whether Sobolev maps defined on products of Carnot groups are split.

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