0375889 20240103200749.820120511235959.9 000300201600011 10.1016/j.ins.2011.10.016 8 s. cav_un_epca*02567520020-02551871 (2012)171-178Elsevier Universal integral Chebyshev’s inequality Minkowski’s inequality Seminormed fuzzy integral cav_un_auth*0261431 Agahi H. IR cav_un_auth*0101163 Mesiar Radko Ekonometrie Department of Econometrics E E UTIA-B Department of Econometrics G Ústav teorie informace a automatizace AV ČR, v. v. i. cav_un_auth*0258953 Ouyang Y. CN cav_un_auth*0280491 Pap E. RS cav_un_auth*0273381 Štrboja M. RS http://library.utia.cas.cz/separaty/2012/E/mesiar-general chebyshev type inequalities for universal integral.pdf GAP402/11/0378 GA ČR cav_un_auth*0273630 CEZ:AV0Z10750506 A new inequality for the universal integral on abstract spaces is obtained in a rather general form. As two corollaries, Minkowski’s and Chebyshev’s type inequalities for the universal integral are obtained. The main results of this paper generalize some previous results obtained for special fuzzy integrals, e.g., Choquet and Sugeno integrals. Furthermore, related inequalities for seminormed integral are obtained. 2013 BA 5 http://hdl.handle.net/11104/0208431 COMPUTERSCIENCEINFORMATIONSYSTEMS 3.676 0.762 4.7 0.02864 0.945 10013 425 79 2.127 36.86 4.8 Q1 77.575 95.833 Q1 Q1 2012 000300201600011 WOS cav_un_epca*0256752 Information Sciences 0020-0255 1872-6291 Roč. 187 č. 1 2012 171 178 Elsevier