2019
Том 71
№ 7

All Issues

Uniform integrabblity and the lebesgue theorem on convergence in $L_0$-valued measures

Radchenko V. N.

Full text (.pdf)


Abstract

We study integrals $∫fdμ$ of real functions over $L_0$-valued measures. We give a definition of convergence of real functions in quasimeasure and, as a special case, in $L_0$-measure. For these types of convergence, we establish conditions of convergence in probability for integrals over $L_0$-valued measures, which are analogous to the conditions of uniform integrability and to the Lebesgue theorem.

English version (Springer): Ukrainian Mathematical Journal 48 (1996), no. 6, pp 965–969.

Citation Example: Radchenko V. N. Uniform integrabblity and the lebesgue theorem on convergence in $L_0$-valued measures // Ukr. Mat. Zh. - 1996. - 48, № 6. - pp. 857-860.

Full text