Weak limit of W^1,2 homeomorphisms in R^3 can have any degree

Ondřej Bouchala; Stanislav Hencl; Zheng Zhu

doi:10.54330/afm.147887

Weak limit of W^1,2 homeomorphisms in R^3 can have any degree

Kirjoittajat

Ondřej Bouchala Czech Technical University in Prague, Faculty of Information Technology
Stanislav Hencl Charles University, Department of Mathematical Analysis
Zheng Zhu Beihang University, School of Mathematical Sciences

DOI: https://doi.org/10.54330/afm.147887

Avainsanat:

Limits of Sobolev homeomorphisms, topological degree

Abstrakti

In this paper for every \(k\in\mathbb{Z}\) we construct a sequence of weakly converging homeomorphisms \(h_m\colon B(0,10)\to\mathbb{R}^3\), \(h_m\rightharpoonup h\) in \(W^{1,2}(B(0,10))\), such that \(h_m(x)=x\) on \(\partial B(0,10)\) and for every \(r\in(5/16,7/16)\) the degree of \(h\) with respect to the ball \(B(0,r)\) is equal to \(k\) on a set of positive measure.

PDF (English)

Numero

Vol 49 Nro 2 (2024)

Osasto

Articles

Julkaistu

2024-09-13

Viittaaminen

Bouchala, O., Hencl, S., & Zhu, Z. (2024). Weak limit of W^1,2 homeomorphisms in R^3 can have any degree. Annales Fennici Mathematici, 49(2), 547–560. https://doi.org/10.54330/afm.147887

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