{Variational measures in the theory of integration} {Luisa Di Piazza} {Palermo , Italy} We will present here some results concerning the variational measures associated to a real valued function, or, in a more general setting, to a vector valued function. Roughly speaking, given a function $\Phi$ defined on an interval $[a,b]$ of the real line it is possible to construct, using suitable families of intervals, a measure $\mu_{\Phi}$ which carries information about $\Phi$. If $\Phi$ is a real valued function, then the $\sigma$-finiteness of the measure $\mu_{\Phi}$ implies the a.e. differentiability of $\Phi$, while the absolute continuity of the measure $\mu_{\Phi}$ characterizes the functions $\Phi$ which are Henstock-Kurzweil primitives. The situation becomes more complicate if we consider functions taking values in an infinite dimensional Banach space. If the Banach space has the Radon-Nikod\'{y}m property, then it is possible to obtain properties similar to those of the real case. But it is surprising that by means of the variational measures it is possible to characterize the Banach space having the Radon-Nikod\'{y}m property. \begin{thebibliography}{99} \bibitem{bds1} B. Bongiorno, L. Di Piazza and V. Skvortsov, \textit{ A new full descriptive characterization of Denjoy-Perron integral}, Real Analysis Exchange, {\bf 21} (1995/96), 256--263. \bibitem{bdm} B. Bongiorno, L. Di Piazza and K. Musial, \textit{ A characterization of the Radon-Nikod\'{y}m property by finitely additive interval functions}, Illinois Journal of Mathematics. Volume 53, Number 1 (2009), 87-99. \bibitem{db} D. Bongiorno, \textit{ Stepanoff's theorem in separable Banach spaces}, Comment. Math. Univ. Ca\-ro\-linae, {\bf 39} (1998), 323--335. \bibitem{ldp1} L. Di Piazza, \textit{ Varational measures in the theory of the integration in $R^m$}, Czechos. Math. Jour. 51(126) (2001), no. 1, 95--110. \bibitem{vm} V. Marraffa, \textit{ A descriptive characterization of the variational Henstock integral}, Proceedings of the International Mathematics Conference (Manila, 1998), Matimy\'{a}s Mat. {\bf 22} (1999), no. 2, 73--84.
DI PIAZZA, L. (2010). Variational measures in the theory of integration.
Variational measures in the theory of integration
DI PIAZZA, Luisa
2010-01-01
Abstract
{Variational measures in the theory of integration} {Luisa Di Piazza} {Palermo , Italy} We will present here some results concerning the variational measures associated to a real valued function, or, in a more general setting, to a vector valued function. Roughly speaking, given a function $\Phi$ defined on an interval $[a,b]$ of the real line it is possible to construct, using suitable families of intervals, a measure $\mu_{\Phi}$ which carries information about $\Phi$. If $\Phi$ is a real valued function, then the $\sigma$-finiteness of the measure $\mu_{\Phi}$ implies the a.e. differentiability of $\Phi$, while the absolute continuity of the measure $\mu_{\Phi}$ characterizes the functions $\Phi$ which are Henstock-Kurzweil primitives. The situation becomes more complicate if we consider functions taking values in an infinite dimensional Banach space. If the Banach space has the Radon-Nikod\'{y}m property, then it is possible to obtain properties similar to those of the real case. But it is surprising that by means of the variational measures it is possible to characterize the Banach space having the Radon-Nikod\'{y}m property. \begin{thebibliography}{99} \bibitem{bds1} B. Bongiorno, L. Di Piazza and V. Skvortsov, \textit{ A new full descriptive characterization of Denjoy-Perron integral}, Real Analysis Exchange, {\bf 21} (1995/96), 256--263. \bibitem{bdm} B. Bongiorno, L. Di Piazza and K. Musial, \textit{ A characterization of the Radon-Nikod\'{y}m property by finitely additive interval functions}, Illinois Journal of Mathematics. Volume 53, Number 1 (2009), 87-99. \bibitem{db} D. Bongiorno, \textit{ Stepanoff's theorem in separable Banach spaces}, Comment. Math. Univ. Ca\-ro\-linae, {\bf 39} (1998), 323--335. \bibitem{ldp1} L. Di Piazza, \textit{ Varational measures in the theory of the integration in $R^m$}, Czechos. Math. Jour. 51(126) (2001), no. 1, 95--110. \bibitem{vm} V. Marraffa, \textit{ A descriptive characterization of the variational Henstock integral}, Proceedings of the International Mathematics Conference (Manila, 1998), Matimy\'{a}s Mat. {\bf 22} (1999), no. 2, 73--84.
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