A product convergence theorem for Henstock--Kurzweil integrals

Abstract

Necessary and sufficient for ∫abfgn ∫abfg for all Henstock--Kurzweil integrable functions f is that g be of bounded variation, gn be uniformly bounded and of uniform bounded variation and, on each compact interval in (a,b), gn g in measure or in the L1 norm. The same conditions are necessary and sufficient for \|f(gn-g)\| 0 for all Henstock--Kurzweil integrable functions f. If gn g a.e. then convergence \|fgn\|\|fg\| for all Henstock--Kurzweil integrable functions f is equivalent to \|f(gn-g)\| 0. This extends a theorem due to Lee Peng-Yee.

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