Banach-Stone Theorems for maps preserving common zeros

Abstract

Let X and Y be completely regular spaces and E and F be Hausdorff topological vector spaces. We call a linear map T from a subspace of C(X,E) into C(Y,F) a Banach-Stone map if it has the form Tf(y) = Sy(f(h(y)) for a family of linear operators Sy : E F, y ∈ Y, and a function h: Y X. In this paper, we consider maps having the property: ki=1Z(fi) ≠ki=1Z(Tfi) ≠ , where Z(f) = \f = 0\. We characterize linear bijections with property (Z) between spaces of continuous functions, respectively, spaces of differentiable functions (including C∞), as Banach-Stone maps. In particular, we confirm a conjecture of Ercan and \"Onal: Suppose that X and Y are realcompact spaces and E and F are Hausdorff topological vector lattices (respectively, C*-algebras). Let T: C(X,E) C(Y,F) be a vector lattice isomorphism (respectively, *-algebra isomorphism) such that Z(f) ≠ Z(Tf) ≠. Then X is homeomorphic to Y and E is lattice isomorphic (respectively, C*-isomorphic) to F. Some results concerning the continuity of T are also obtained.