0361444 20240103195400.520110816235959.9 000290622200049 10.1016/j.amc.2011.03.100 9 s. cav_un_epca*02561600096-300321721 (2011)8630-8639Elsevier Hölder’s inequality Minkowski’s inequality Pseudo-integral Semiring cav_un_auth*0261431 Agahi H. IR cav_un_auth*0258953 Ouyang Y. CN cav_un_auth*0101163 Mesiar Radko Ekonometrie Department of Econometrics E E UTIA-B Department of Econometrics Ústav teorie informace a automatizace AV ČR, v. v. i. cav_un_auth*0273709 Pap E. HU cav_un_auth*0273710 Štrbojaf M. RS http://library.utia.cas.cz/separaty/2011/E/mesiar-holder and minkowski type inequalities for pseudo-integral.pdf GA402/08/0618 GA ČR cav_un_auth*0241569 CEZ:AV0Z10750506 There are proven generalizations of the Hölder’s and Minkowski’s inequalities for the pseudo-integral. There are considered two cases of the real semiring with pseudo-operations: one, when pseudo-operations are defined by monotone and continuous function g, the second semiring ([a, b], sup, circled dot operator), where circled dot operator is generated and the third semiring where both pseudo-operations are idempotent, i.e., circled plus = sup and circled dot operator = inf. 2012 BA 5 http://hdl.handle.net/11104/0198754 MATHEMATICSAPPLIED 1.338 0.212 4.9 0.04829 0.469 11905 1102 1.050 Q1 22.476 82.245 Q4 Q2 2011 000290622200049 WOS cav_un_epca*0256160 Applied Mathematics and Computation 0096-3003 1873-5649 Roč. 217 č. 21 2011 8630 8639 Elsevier