Modulus of continuity of orientation preserving approximately differentiable homeomorphisms with a.e. negative Jacobian

Abstract: We construct an a.e. approximately differentiable homeomorphism of a unit n-dimensional cube onto itself which is orientation preserving, has the Lusin property (N) and has the Jacobian determinant negative a.e. Moreover, the homeomorphism together with its inverse satisfy a rather general sub-Lipschitz condition, in particular it can be bi-Hölder continuous with an arbitrary exponent less than 1.2010 Mathematics Subject Classification. Primary 46E35; Secondary 26B05, 26B10, 26B35, 74B20.

“…It would be much easier to prove the result without conditions (b), (c), and with the condition (d) replaced by ap DΦ < 0 a.e. (see also [13]). However, in order to prescribe the derivative as in (1.2) we had to use deep results of Dacorogna and Moser [8] on the existence of diffeomorphisms with the prescribed Jacobian.…”

A Measure and Orientation Preserving Homeomorphism with Approximate Jacobian Equal −1 Almost Everywhere

“…It would be much easier to prove the result without conditions (b), (c), and with the condition (d) replaced by ap DΦ < 0 a.e. (see also [13]). However, in order to prescribe the derivative as in (1.2) we had to use deep results of Dacorogna and Moser [8] on the existence of diffeomorphisms with the prescribed Jacobian.…”

A Measure and Orientation Preserving Homeomorphism with Approximate Jacobian Equal −1 Almost Everywhere

“…Thus, one is, naturally, led to Sobolev homeomorphisms and to questions about their Jacobian. This is the essence of the questions promoted by Hajlasz; see, for example, Goldstein and Hajlasz [10, 11]. Question Let $$Q\subset \mathbb {R}^n$$ be the open unit cube.…”

“…Thus, one is, naturally, led to Sobolev homeomorphisms and to questions about their Jacobian. This is the essence of the questions promoted by Hajlasz; see, for example, Goldstein and Hajlasz [10,11]. (a) Does there exist a homeomorphism 𝑓 ∈ 𝑊 1,𝑝 (𝑄, ℝ 𝑛 ) with 𝐽 𝑓 = det 𝐷𝑓 positive on a set of positive measure in 𝑄 and negative on a set of positive measure in 𝑄?…”

A sense‐preserving Sobolev homeomorphism with negative Jacobian almost everywhere

“…In 2001 Haj lasz posed a series of questions about the Jacobians of homeomorphisms which have some kind of derivative (weak or approximative). These questions appeared in several lecture notes and were recently reprinted in [11]. The essence of the questions can be summarized as follows:…”

“…The combination of Theorem 1.2 and Theorem 1.3 answers, up to the critical case p = [n/2], Question 1.1 a). Let us note that constructions of almost everywhere approximately differentiable homeomorphisms with everywhere negative (approximate) Jacobian are to be found in Goldstein and Haj lasz [9] and [11]. These maps lack the Sobolev regularity but have other striking properties e.g.…”

A sense preserving Sobolev homeomorphism with negative Jacobian almost everywhere