050695420240103222330.820190726235959.98492272886600035092910001010.1016/j.ins.2014.12.056Pseudo-fractional integral inequality of Chebyshev type8 s.Pcav_un_epca*02567520020-0255Information Sciences301 (2015)161-168ElsevierChoquet integralSugeno integralMonotone measurecav_un_auth*026143140AgahiH.IRcav_un_auth*034864730BabakhaniA.IRcav_un_auth*0101163EkonometrieDepartment of EconometricsEEDepartment of Econometrics30MesiarRadkoUTIA-BÚstav teorie informace a automatizace AV ČR, v. v. i.http://library.utia.cas.cz/separaty/2019/E/mesiar-0506954.pdfIn this paper, we give a general version of Chebyshev type inequality for pseudo-convolution integral on a semiring ([a,b],•,·). Our result is flexible enough to support both pseudo-integral and convolution integral, (e.g., fractional integral), thus closing the series of papers. It includes the corresponding results of Agahi et al. [1] as a special case. Finally, some concluding remarks are drawn and some open problems for further investigations are given.WOSBA10000101001010220203 RVO:67985556 http://hdl.handle.net/11104/0298080SCOMPUTERSCIENCE.INFORMATIONSYSTEMS3.6830.8554.70.036970.943167921.960Q12.638615Q180.22894.8Q1Q194.7922015 84922728866 SCOPUS PUBMED 000350929100010 WOS cav_un_epca*0256752 Information Sciences 0020-0255 1872-6291 Roč. 301 2015 161 168 Elsevier