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Apr 24, 2021 at 22:04 comment added Jochen Glueck @QuartoBendir: The signed Borel measures on $[0,1]$ are the dual space of $C([0,1])$ (the space of continuous real-valued functions). That's a classical representation theorem.
Apr 24, 2021 at 20:07 comment added Quarto Bendir I suppose I'm missing some elementary facts. I know that the space of finitely additive signed measures is a dual space. But what is the predual of the space of countably additive signed measures?
Apr 24, 2021 at 20:06 review First posts
Apr 24, 2021 at 20:44
Apr 24, 2021 at 19:58 history answered evanston CC BY-SA 4.0