Algebras of distributions suitable for phase-space quantum mechanics. III. The dual space of the algebra L_b(S)
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Gracia Bondía, José M.
Várilly Boyle, Joseph C.
Figueroa González, Héctor
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Abstract
The strong dual space of the topological algebra L_b(S), where S is
the Schwartz space of smooth declining functions on R, may be obtained
as an inductive limit of projective limits of Hilbert spaces. To that
end, we construct a symbol calculus for elements of L_b(S,S'). We show
that the dual space is a dense ideal in L_b(S) itself, and can be
given the structure of a Q-algebra with continuous quasiinversion.
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Keywords
Quantum mechanics in phase space, Topological algebras, Schwartz