Affiliation:
1. Departamento de Matemática, CIMA, Universidade de Évora, 7000-671 Évora, Portugal
Abstract
In this paper, our main aim is to present a reasonable extension of the 1-dim Lebesgue integral of the product of two functions, in case this Lebesgue integral does not exist (i.e., the integrals of its negative and positive parts are both ∞). This extension works fine quite generally, as shown by several examples, and it is based on general hypotheses guaranteeing the sign of the integral (in the sense of being necessarily <0 or =0 or else >0), without computing its actual value. For this purpose, our method provides much more precise results than the Lebesgue–Stieltjes integration by parts.
Funder
FCT—Fundação para a Ciência e a Tecnologia
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference6 articles.
1. Constructive decomposition of any L1a,b function as sum of a strongly convergent series of integrable functions each one positive or negative exactly in open sets;Carlota;Mediterr. J. Math,2023
2. Braun, A., and Pearcy, C. (1995). An Introduction to Analysis, Springer.
3. Yeh, J. (2006). Real Analysis: Theory of Measure and Integration, World Scientific Publishing Company. [2nd ed.].
4. Leoni, G. (2009). A First Course in Sobolev Spaces, American Mathematical Society.
5. Saks, S. (1964). Theory of the Integral, Dover Publications, Inc.. [2nd ed.]. English Translation by L. C. Young, with Two Additional Notes by Stefan Banach.
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