FRINK Linked Data Fragments server

Matches in SemOpenAlex for { <https://semopenalex.org/work/W4379875754> ?p ?o ?g. }

• W4379875754 endingPage "19412" @default.
• W4379875754 startingPage "19391" @default.
• W4379875754 abstract "<abstract><p>Fractional integral inequalities have become one of the most useful and expansive tools for the development of many fields of pure and applied mathematics over the past few years. Many authors have just recently introduced various generalized inequalities that involved the fractional integral operators. The main goal of the present study is to incorporate the concept of strongly $ left(s, mright) $-convex functions and Hermite-Hadamard inequality with Caputo-Fabrizio integral operator. Also, we consider a new identity for twice differentiable mapping in the context of Caputo-Fabrizio fractional integral operator. Then, considering this identity as an auxiliary result, new mid-point version using well known inequalities like Hölder, power-mean, Young are presented. Moreover, some graphs of obtained inequalities are given for better understanding by the reader. Finally, we discussed some applications to matrix inequalities and spacial means.</p></abstract>" @default.
• W4379875754 created "2023-06-09" @default.
• W4379875754 creator A5024203425 @default.
• W4379875754 creator A5075789873 @default.
• W4379875754 creator A5079672279 @default.
• W4379875754 creator A5087441536 @default.
• W4379875754 date "2023-01-01" @default.
• W4379875754 modified "2023-09-23" @default.
• W4379875754 title "New inequalities via Caputo-Fabrizio integral operator with applications" @default.
• W4379875754 cites W2044983714 @default.
• W4379875754 cites W2045342025 @default.
• W4379875754 cites W2056135743 @default.
• W4379875754 cites W2145886492 @default.
• W4379875754 cites W2318128071 @default.
• W4379875754 cites W2322767775 @default.
• W4379875754 cites W2613734495 @default.
• W4379875754 cites W2806100907 @default.
• W4379875754 cites W3006381357 @default.
• W4379875754 cites W3098627266 @default.
• W4379875754 cites W3107375704 @default.
• W4379875754 cites W3117629418 @default.
• W4379875754 cites W3120469278 @default.
• W4379875754 cites W3151745326 @default.
• W4379875754 cites W3160181357 @default.
• W4379875754 cites W3163136030 @default.
• W4379875754 cites W3197076598 @default.
• W4379875754 cites W3212234989 @default.
• W4379875754 cites W4205221927 @default.
• W4379875754 cites W4205475114 @default.
• W4379875754 cites W4206639079 @default.
• W4379875754 cites W4221089321 @default.
• W4379875754 cites W4283582927 @default.
• W4379875754 cites W4292315061 @default.
• W4379875754 cites W4312083417 @default.
• W4379875754 doi "https://doi.org/10.3934/math.2023989" @default.
• W4379875754 hasPublicationYear "2023" @default.
• W4379875754 type Work @default.
• W4379875754 citedByCount "1" @default.
• W4379875754 countsByYear W43798757542023 @default.
• W4379875754 crossrefType "journal-article" @default.
• W4379875754 hasAuthorship W4379875754A5024203425 @default.
• W4379875754 hasAuthorship W4379875754A5075789873 @default.
• W4379875754 hasAuthorship W4379875754A5079672279 @default.
• W4379875754 hasAuthorship W4379875754A5087441536 @default.
• W4379875754 hasBestOaLocation W43798757541 @default.
• W4379875754 hasConcept C104317684 @default.
• W4379875754 hasConcept C112680207 @default.
• W4379875754 hasConcept C121332964 @default.
• W4379875754 hasConcept C134306372 @default.
• W4379875754 hasConcept C136119220 @default.
• W4379875754 hasConcept C145446738 @default.
• W4379875754 hasConcept C151730666 @default.
• W4379875754 hasConcept C158448853 @default.
• W4379875754 hasConcept C159985019 @default.
• W4379875754 hasConcept C17020691 @default.
• W4379875754 hasConcept C185592680 @default.
• W4379875754 hasConcept C192562407 @default.
• W4379875754 hasConcept C199343813 @default.
• W4379875754 hasConcept C202444582 @default.
• W4379875754 hasConcept C202615002 @default.
• W4379875754 hasConcept C24890656 @default.
• W4379875754 hasConcept C2524010 @default.
• W4379875754 hasConcept C2777686260 @default.
• W4379875754 hasConcept C2778355321 @default.
• W4379875754 hasConcept C2779343474 @default.
• W4379875754 hasConcept C2780502288 @default.
• W4379875754 hasConcept C28826006 @default.
• W4379875754 hasConcept C30407753 @default.
• W4379875754 hasConcept C33923547 @default.
• W4379875754 hasConcept C45555294 @default.
• W4379875754 hasConcept C55493867 @default.
• W4379875754 hasConcept C71924100 @default.
• W4379875754 hasConcept C86339819 @default.
• W4379875754 hasConcept C86803240 @default.
• W4379875754 hasConceptScore W4379875754C104317684 @default.
• W4379875754 hasConceptScore W4379875754C112680207 @default.
• W4379875754 hasConceptScore W4379875754C121332964 @default.
• W4379875754 hasConceptScore W4379875754C134306372 @default.
• W4379875754 hasConceptScore W4379875754C136119220 @default.
• W4379875754 hasConceptScore W4379875754C145446738 @default.
• W4379875754 hasConceptScore W4379875754C151730666 @default.
• W4379875754 hasConceptScore W4379875754C158448853 @default.
• W4379875754 hasConceptScore W4379875754C159985019 @default.
• W4379875754 hasConceptScore W4379875754C17020691 @default.
• W4379875754 hasConceptScore W4379875754C185592680 @default.
• W4379875754 hasConceptScore W4379875754C192562407 @default.
• W4379875754 hasConceptScore W4379875754C199343813 @default.
• W4379875754 hasConceptScore W4379875754C202444582 @default.
• W4379875754 hasConceptScore W4379875754C202615002 @default.
• W4379875754 hasConceptScore W4379875754C24890656 @default.
• W4379875754 hasConceptScore W4379875754C2524010 @default.
• W4379875754 hasConceptScore W4379875754C2777686260 @default.
• W4379875754 hasConceptScore W4379875754C2778355321 @default.
• W4379875754 hasConceptScore W4379875754C2779343474 @default.
• W4379875754 hasConceptScore W4379875754C2780502288 @default.
• W4379875754 hasConceptScore W4379875754C28826006 @default.
• W4379875754 hasConceptScore W4379875754C30407753 @default.
• W4379875754 hasConceptScore W4379875754C33923547 @default.

• next