Integrals and Banach Spaces for Finite Order Distributions
نویسنده
چکیده
Let Bc denote the real-valued functions continuous on the extended real line and vanishing at −∞. Let Br denote the functions that are left continuous, have a right limit at each point and vanish at −∞. Define Ac to be the space of tempered distributions that are the nth distributional derivative of a unique function in Bc. Similarly with A n r from Br. A type of integral is defined on distributions in A n c and A n r . The multipliers are iterated integrals of functions of bounded variation. For each n ∈ N, the spaces Ac and A n r are Banach spaces, Banach lattices and Banach algebras isometrically isomorphic to Bc and Br, respectively. Under the ordering in this lattice, if a distribution is integrable then its absolute value is integrable. The dual space is isometrically isomorphic to the functions of bounded variation. The space A1c is the completion of the L 1 functions in the Alexiewicz norm. The space A1r contains all finite signed Borel measures. Many of the usual properties of integrals hold: Hölder inequality, second mean value theorem, continuity in norm, linear change of variables, a convergence theorem.
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