Difference between revisions of "Perron-Stieltjes integral"

A generalization of the Perron integral for a function of one real variable. A finite function is said to be integrable in the sense of Perron–Stieltjes with respect to a finite function on if on there exists a major function and a minor function for with respect to on having and such that at each point ,

for all sufficiently small and , while the greatest lower bound of the numbers , where is any such major function of with respect to , and the least upper bound of the numbers , where is any such minor function of with respect to , coincide. Their common value is called the Perron–Stieltjes integral of with respect to on and is denoted by

This generalization of the Perron integral was introduced by A.J. Ward [1].

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Comments

A major function of a function on with respect to a function on is a function such that for each there is an such that for all with . A minor function is defined similarly, but with the inequality sign reversed. Thus, a suitable lower derivative of with respect to majorizes . More generally one considers additive interval functions and satisfying the above property, cf. [2] for details. If is an ordinary function on , then its associated additive interval function, denoted by the same letter, is . A major function of , without any specification of a , is one with respect to the identify function , .