Lattice Homomorphisms between Sobolev Spaces
classification
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math.FA
keywords
everylatticesobolevspacesalmostcompositionformhomomorphism
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We show that every vector lattice homomorphism $T$ between Sobolev spaces can be represented by a composition and a multiplication, that is, $T$ is of the form $Tu(x)=u(h(x))g(x)$ for quasi every/almost every $x$ and all $u$.
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