046970120240103213439.020170123235959.98501126318700039312250002010.1515/ms-2016-0219Stolarsky's inequality for Choquet-like expectation14 s.Pcav_un_epca*02938740139-9918Mathematica Slovaca665 (2016)1235-1248Walter de GruyterChoquet-like expectationStolarsky’s inequalityMinkowski’s inequalitycav_un_auth*026143150AgahiH.IRKcav_un_auth*0101163EkonometrieDepartment of EconometricsEEDepartment of Econometrics50MesiarRadkoUTIA-BÚstav teorie informace a automatizace AV ČR, v. v. i.http://library.utia.cas.cz/separaty/2016/E/mesiar-0469701.pdfExpectation is the fundamental concept in statistics and probability. As two generalizations of expectation, Choquet and Choquet-like expectations are commonly used tools in generalized probability theory. This paper considers the Stolarsky inequality for two classes of Choquet-like integrals. The first class generalizes the Choquet expectation and the second class is an extension of the Sugeno integral. Moreover, a new Minkowski’s inequality without the comonotonicity condition for two classes of Choquet-like integrals is introduced. Our results significantly generalize the previous results in this field. Some examples are given to illustrate the results.BA2017 RVO:67985556 http://hdl.handle.net/11104/0269127S n.a. Article Mathematics MATHEMATICS0.4120.0458.60.000870.1255130.498Q20.304110Q43.12311.1Q4Q211.0932016 85011263187 SCOPUS PUBMED 000393122500020 WOS cav_un_epca*0293874 Mathematica Slovaca 0139-9918 1337-2211 Roč. 66 č. 5 2016 1235 1248 Walter de Gruyter