Commutative topological algebras on translation-invariant reproducing kernel Hilbert spaces

Abstract

We study commutative topological algebras naturally associated with translation-invariant reproducing kernel Hilbert spaces whose direct integral decomposition has one-dimensional fibers. Starting from the bounded algebra of translation-invariant operators, we pass to a common dense domain generated by reproducing kernels and identify the corresponding diagonalizable operators with multiplication by symbols in an intersection of weighted L2-spaces. On the symbol side this gives a canonical space F0 and a maximal multiplicative subalgebra FM, which is a complete locally convex *-algebra. Transporting the structure back yields corresponding algebras of operators and integral kernels. We also discuss when the inclusions L∞(Ω)= F∞⊂ FM⊂ F0 are strict, and illustrate the results with vertical and radial operators on classical Bergman and Fock spaces.