Linear continuous surjections of Cp-spaces over compacta
Abstract
Let X and Y be compact Hausdorff spaces and suppose that there exists a linear continuous surjection T:Cp(X) Cp(Y), where Cp(X) denotes the space of all real-valued continuous functions on X endowed with the pointwise convergence topology. We prove that X=0 implies Y = 0. This generalizes a previous theorem [Theorem 3.4]LLP for compact metrizable spaces. Also we point out that the function space Cp(P) over the pseudo-arc P admits no densely defined linear continuous operator Cp(P) Cp([0,1]) with a dense image.
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