Banjarmasin Muhammadiyah University, Syarkawi.St, km.01 South Kalimantan, Indonesia
Lazwardiahmad@gmail.com, rahmatya.dina@gmail.com
Abstract
Lebesgue Measure plays an important role in defining width of area under some graphs of real-valued function while the domain lies in real number system accurately. Yet such measure fails to approximate the area under the graph when we try to generalize the function with multiple variables. This is due to the Lebesgue measure has always zero value for any flat region lies in ℝ2. In this paper we try to reconstruct more general line integral definition rather than usual Riemann line integral as well. The easiest way to do this is through the use of Hausdorff measure due to its dimension concept allows us to measure the length and area in ℝ2 as well as it has been already done in ℝ. The result of this research is Lebesgue-Hausdorff line integral for Hausdorff measurable functions dimension 1 which lie under any simple curves.
Keyword
Hausdorff measure, Lebesgue Hausdorff Line Integral, Riemann Line Integral.
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References
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Cite this paper as:
Lazwardi A and Nurmeidina R 2019 Lebesgue-Hausdorff Line Integral of Hausdorff Measurable Multivariable Function over Simple Curve on [a, b] Proc. Int. Conf. on Mathematical Analysis, Its Applications and Learning (15 September 2018, Yogyakarta) ed B Utomo (Yogyakarta: Sanata Dharma University Press) pp 95–102