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On the measurability of functions of two variables. (English) Zbl 0262.28004

##### MSC:
 28A20 Measurable and nonmeasurable functions, sequences of measurable functions, modes of convergence 28A35 Measures and integrals in product spaces
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##### References:
 [1] DAVIES, ROY O.: Separate approximate continuity implies measurability. · Zbl 0254.26011 [2] DRAVECKÝ J.: On the measurability of functions of two varaibles. Acta Fac. rerum natur. Univ. Comenianae Math. XXVIII, 1972, 11-18. [3] GOFFMAN C., NEUGEBAUER C. J., NISHIURA T.: Density topology and approximate continuity. Duke Math. J. 28, 1961, 497-505. · Zbl 0101.15502 [4] LIPIŃSKI J. S.: On measurability of functions of two variables. Bull. Acad. polon. Sér sci. math. astron. et phys., 20, 1972, 131-135. · Zbl 0228.28009 [5] MARCZEWSKI E., RYLL-NARDZEWSKI C.: Sur la measurabilité des fonctions de plusieurs variables. Ann. Soc. polon. math. 25, 1953, 145-154. · Zbl 0048.28604 [6] MICHAEL J. H., RENNIE C.: Measurability of functions of two variables. J. Austral. Math. Soc. 1, 1959, 21-26. · Zbl 0094.25903 [7] NEUBRUNN T.: Merateľnos\? niektorých funkcií na kartézskych súčinnoch. Mat.-fyz. časop., 10, 1960, 216-221. [8] SIERPIŃSKI W.: Sur l’hypothese du continu $$2^{\aleph_0}=\aleph_1$$. Fundam. math., 5, 1924, 177-187. [9] URSELL H. D.: Some methods of proving measurability. Fundam. math., 32, 1939, 311-330. · Zbl 0021.11302
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