OSGOOD, William F. A Jordan Curve of Positive Area. Transactions of the American Mathematical Society. American Mathematical Society, leden 1903, roč. 4, čís. 1. Dostupné online [cit. 2019-12-26]. ISSN0002-9947. DOI10.2307/1986455. JSTOR1986455.
OSGOOD, William F. A Jordan Curve of Positive Area. Transactions of the American Mathematical Society. American Mathematical Society, leden 1903, roč. 4, čís. 1. Dostupné online [cit. 2019-12-26]. ISSN0002-9947. DOI10.2307/1986455. JSTOR1986455.
SOLOVAY, Robert M. A model of set-theory in which every set of reals is Lebesgue measurable. Annals of Mathematics. 1970, s. 1–56. DOI10.2307/1970696. JSTOR1970696.
jstor.org
OSGOOD, William F. A Jordan Curve of Positive Area. Transactions of the American Mathematical Society. American Mathematical Society, leden 1903, roč. 4, čís. 1. Dostupné online [cit. 2019-12-26]. ISSN0002-9947. DOI10.2307/1986455. JSTOR1986455.
SOLOVAY, Robert M. A model of set-theory in which every set of reals is Lebesgue measurable. Annals of Mathematics. 1970, s. 1–56. DOI10.2307/1970696. JSTOR1970696.
stackexchange.com
math.stackexchange.com
Asaf Karagila. What sets are Lebesgue-measurable? [online]. math stack exchange [cit. 2019-12-26]. Dostupné online.
Asaf Karagila. Is there a sigma-algebra on R strictly between the Borel and Lebesgue algebras? [online]. math stack exchange [cit. 2019-12-26]. Dostupné online.
worldcat.org
OSGOOD, William F. A Jordan Curve of Positive Area. Transactions of the American Mathematical Society. American Mathematical Society, leden 1903, roč. 4, čís. 1. Dostupné online [cit. 2019-12-26]. ISSN0002-9947. DOI10.2307/1986455. JSTOR1986455.
