Reconstruction of the One-Dimensional Lebesgue Measure

In the Mizar system ([1], [2]), Jozef Bialas has already given the one-dimensional Lebesgue measure [4]. However, the measure introduced by Bialas limited the outer measure to a field with finite additivity. So, although it satisfies the nature of the measure, it cannot specify the length of measurable sets and also it cannot determine what kind of set is a measurable set. From the above, the authors first determined the length of the interval by the outer measure. Specifically, we used the compactness of the real space. Next, we constructed the pre-measure by limiting the outer measure to a semialgebra of intervals. Furthermore, by repeating the extension of the previous measure, we reconstructed the one-dimensional Lebesgue measure [7], [3].