Banach–Stone theorem

An important question in mathematics is whether a space can be completely described by the functions defined on it—that is, by its "observables." The Banach–Stone theorem is a classical result in this direction. It shows that certain well-behaved spaces (specifically, compact Hausdorff spaces) can be recovered from the Banach space of continuous functions defined on them. The theorem is named after the mathematicians Stefan Banach and Marshall Stone.

In brief, the Banach–Stone theorem allows one to recover a compact Hausdorff space X from the Banach space structure of the space C(X) of continuous real- or complex-valued functions on X. If one is allowed to invoke the algebra structure of C(X) then recovering X is easy – we can identify X with the spectrum of C(X), the set of algebra homomorphisms into the field of scalars, equipped with the weak*-topology inherited from the dual space C(X)*. What makes the Banach–Stone theorem striking is that it avoids reference to multiplicative structure by recovering X from the extreme points of the unit ball of C(X)*.

Thus the Banach–Stone theorem states that if C(X) and C(Y) are isometrically isomorphic as Banach spaces, then X and Y are homeomorphic.