Maps preserving common zeros between subspaces of vector-valued continuous functions
Abstract
For metric spaces X and Y, normed spaces E and F, and certain subspaces A(X,E) and A(Y,F) of vector-valued continuous functions, we obtain a complete characterization of linear and bijective maps T:A(X,E) A(Y,F) preserving common zeros, that is, maps satisfying the property equation15 dub Z(f) Z(g)≠ Z(Tf) Z(Tg)≠ for any f,g∈ A(X,E), where Z(f)=\x∈ X:f(x)=0\. Moreover, we provide some examples of subspaces for which the automatic continuity of linear bijections having the property (dub) is derived.
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