039466020240103202800.420130819235959.900032242810000710.1016/j.knosys.2013.04.016Useful tools for non-linear systems: Several non-linear integral inequalities8 s.Pcav_un_epca*02571730950-7051Knowledge-Based System491 (2013)73-80ElsevierMonotone measureComonotone functionsIntegral inequalitiesUniversal integralcav_un_auth*0261431AgahiH.IRcav_un_auth*0283606MohammadpourA.IRcav_un_auth*0101163MesiarRadkoEkonometrieDepartment of EconometricsEEUTIA-BDepartment of EconometricsGÚstav teorie informace a automatizace AV ČR, v. v. i.cav_un_auth*0283607VaezpourM. S.IRhttp://library.utia.cas.cz/separaty/2013/E/mesiar-useful tools for non-linear systems several non-linear integral inequalities.pdfGAP402/11/0378GA ČRcav_un_auth*0273630Integral inequalities play important roles in classical probability and measure theory. Universal integrals provide a useful tool in many problems in engineering and non-linear systems where the aggregation of data is required. We discuss several inequalities including Hardy, Berwald, Barnes–Godunova–Levin, Markov and Chebyshev for a monotone measure-based universal integral. Some recent results are obtained as corollaries. Finally, we provide some applications of our results in intelligent decision support systems, estimation and information fusion.2014BA4 RVO:67985556 http://hdl.handle.net/11104/0222933COMPUTERSCIENCEARTIFICIALINTELLIGENCE2.9200.5733.00.006670.60326292951.563ScienceCitationIndexQ159.07488.017Q2Q12013 000322428100007 WOS cav_un_epca*0257173 Knowledge-Based System 0950-7051 1872-7409 Roč. 49 č. 1 2013 73 80 Elsevier