Giovanni Alessandrini, Vincenzo Nesi
Published 2008-05-31Version 1
We classify the second order, linear, two by two systems for which the two fundamental theorems for planar harmonic mappings, the Rado'-Kneser-Choquet Theorem and the H. Lewy Theorem, hold. They are those which, up to a linear change of variable, can be written in diagonal form with the same operator on both diagonal blocks. In particular, we prove that the aforementioned Theorems cannot be extended to solutions of either the Lame' system of elasticity, or of elliptic systems in diagonal form, even with just slightly different operators for the two components.
Comments: 10 pages, two figures, submitted
Journal: Funct. Approx. Comment. Math., 40 ( 1), 2009, 105-115
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Optimal conditions for $L^\infty$-regularity and a priori estimates for elliptic systems, I: two components
Blowup solutions of elliptic systems in two dimensional spaces
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