Diameter preserving linear bijections of C(X)
Abstract
The aim of this paper is to solve a linear preserver problem on the function algebra C(X). We show that in case X is a first countable compact Hausdorff space, every linear bijection φ:C(X) C(X) having the property that diam(φ(f)(X))=diam(f(X)) (f∈ C(X)) is of the form \[ φ(f)=τ · f +t(f)1 (f∈ C(X)) \] where τ is a complex number of modulus 1, :X X is a homeomorphism and t is a linear functional on C(X).
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