Rigidity of Euclidean product structure: breakdown for low Sobolev exponents
Abstract
We develop a general toolbox to study W1,p solutions of differential inclusions ∇ u ∈ K for unbounded sets K. A key notion is the concept that a subset K of the space Rd × m of d × m matrices can be reduced to another set K'. We then use this framework to show that the product rigidity for Sobolev maps fails for p<2, and also apply our toolbox to simplify several examples from the literature.
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