A single-point Reshetnyak's theorem
Abstract
We prove a single-value version of Reshetnyak's theorem. Namely, if a non-constant map from a domain satisfies the estimate for some , and , then is discrete, the local index is positive in , and every neighborhood of a point of is mapped to a neighborhood of . Assuming this estimate for a fixed at every is equivalent to assuming that the map is -quasiregular, even if the choice of is different for each . Since the estimate also yields a single-value Liouville theorem, it hence appears to be a good pointwise definition of -quasiregularity. As a corollary of our single-value Reshetnyak's theorem, we obtain a higher-dimensional version of the argument principle that played a key part in the solution to the Calder\'on problem.
Cite
@article{arxiv.2202.06917,
title = {A single-point Reshetnyak's theorem},
author = {Ilmari Kangasniemi and Jani Onninen},
journal= {arXiv preprint arXiv:2202.06917},
year = {2025}
}
Comments
19 pages, 1 figure