Volume 16, Issue 2 (10-2021)
IJMSI 2021, 16(2): 61-72 |
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Flores G B, Benitez J. Some Convergence Theorems of the pul-Stieltjes Integral. IJMSI 2021; 16 (2) :61-72
URL: http://ijmsi.ir/article-1-1240-en.html
URL: http://ijmsi.ir/article-1-1240-en.html
Abstract:
The PUL integral is an integration process, similar to the Kurzweil-Henstock integral, which
uses the notion of partition of unity. Boonpogkrong discussed the Kurzweil-Henstock
integral on manifolds. The PUL-Stieltjes integral, established by Flores and Benitez, is an
extension of the PUL Integral. In this paper, we present some Convergence Theorems for the
PUL-Stieltjes integral. Notions on the equi-integrability of this integral are also presented in
the paper.
uses the notion of partition of unity. Boonpogkrong discussed the Kurzweil-Henstock
integral on manifolds. The PUL-Stieltjes integral, established by Flores and Benitez, is an
extension of the PUL Integral. In this paper, we present some Convergence Theorems for the
PUL-Stieltjes integral. Notions on the equi-integrability of this integral are also presented in
the paper.
Type of Study: Research paper |
Subject:
Special
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