The Bohr compactification is a well known construction for (topological) groups and semigroups. Recently, this notion has been investigated for arbitrary structures in harₖun: bohrdiscrete where the Bohr compactification is defined, using a set-theoretical approach, as the maximal compactification which is compatible with the structure involved. Here, we give a characterization of the continuous functions defined on a product space that can be extended continuously to certain compactifications of the product space. As a consequence, the Bohr compactification of an arbitrary topological structure is obtained as the Gelfand space of the commutative Banach algebra of all almost periodic functions. Previously, almost periodic functions f are defined in terms of translates of f with no reference to any compactification of the underlying structure. An application is given to the representation of isometries defined between spaces of almost periodic functions.
Salvador Hernández (Tue,) studied this question.
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