The notion of Lr-variational measure generated by a function F ∈ Lr[a, b] is introduced and, in terms of absolute continuity of this measure, a descriptive characterization of the HKr -integral recovering a function from its Lr-derivative is given. It is shown that the class of functions generating absolutely continuous Lr-variational measure coincides with the class of ACGr -functions which was introduced earlier, and that both classes coincide with the class of the indefinite HKr-integrals under the assumption of Lr-differentiability almost everywhere of the functions consisting these classes
Musial, P., Skvortsov, V.A., Tulone, F. (2022). On Descriptive Characterizations of an Integral Recovering a Function from Its $$L^r$$-Derivative. MATHEMATICAL NOTES, 111(3-4), 414-422 [10.1134/S0001434622030099].
On Descriptive Characterizations of an Integral Recovering a Function from Its $$L^r$$-Derivative
Tulone, F.
2022-01-01
Abstract
The notion of Lr-variational measure generated by a function F ∈ Lr[a, b] is introduced and, in terms of absolute continuity of this measure, a descriptive characterization of the HKr -integral recovering a function from its Lr-derivative is given. It is shown that the class of functions generating absolutely continuous Lr-variational measure coincides with the class of ACGr -functions which was introduced earlier, and that both classes coincide with the class of the indefinite HKr-integrals under the assumption of Lr-differentiability almost everywhere of the functions consisting these classes
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