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Joint Mathematical seminar of Saint Petersburg State University and Peking University
December 2, 2021 16:00–17:00, St. Petersburg, online
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Planar Sobolev extension domains and quasiconformal mappings
Yi Zhang |
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Abstract:
In 1979, Goldshtein et al. pointed out that a bounded simply connected planar domain is a $W^{1,\,2}$-extension domain if and only if it is a quasidisk. This result was later generalized by Jone to all dimensions, showing that uniform domains are $W^{1,\,p}$-extension domain for any $1\le p<\infty$. However, there are simply connected $W^{1,\,p}$-extension domains in the plane which are not uniform when $p\neq 2$, pointed out by e.g. Maz'ya. In this talk I will present my joint work with Koskela and Rajala on this problem, and show its connection to the Ahlfors' quasiconformal reflection theorem.
Language: English
Website:
https://zoom.us/j/82743665009?pwd=OVR1L1o3Yk42SjZSODh5UFB5ajdBUT09
* Meeting ID: 8274 3665 009 Password: 189293 |
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