Quasiregular families bounded in Lp and elliptic estimates
Abstract
We prove that a family of quasiregular mappings of a domain which are uniformly bounded in Lp for some p>0 form a normal family. From this we show how an elliptic estimate on a functional differences implies all directional derivatives, and thus the complex gradient to be quasiregular. Consequently the function enjoys much higher regularity than apriori assumptions suggest.
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