Free Banach f-algebras

Abstract

We construct and analyze the free Banach f\!-algebra FB fA[E] generated by a Banach space E, extending recent developments on free Banach lattices to the setting of Banach f\!-algebras, where multiplication interacts with the lattice structure. Starting from the explicit realization of the free Archimedean f\!-algebra as a sublattice-algebra of RE*, we develop a new structure theorem for normed f\!-algebras that allows us to identify the kernel of the maximal submultiplicative lattice seminorm as precisely those functions vanishing on the unit ball BE*. This yields a representation of the free normed f\!-algebra inside C(BE*). We prove that this representation extends to an injective map on the completion FB fA[E] if and only if FB fA[E] is semiprime, and we establish that FB fA[E] is indeed semiprime whenever E is finite-dimensional or E = L1(μ). This is closely related to approximating operators into a Banach f\!-algebra by operators into finite-dimensional Banach f\!-algebras. We also use the newly constructed free objects to provide an example of a semiprime normed f\!-algebra whose norm completion is not semiprime. Using the tools developed for the study of free objects, we show the following extension property: if A is a closed sublattice-algebra of a Banach f\!-algebra B, then every real-valued lattice-algebra homomorphism on A extends to a real-valued lattice-algebra homomorphism on B.

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