Fri. Nov 22nd, 2024

If Z1 L p ([0, [), Z2 Lq ([0, [), 1 1 1 p, q, r 1 such that 1 p = 1, 1 q = 1 and 1 r = 1, then the following fractional integral p q r inequality holds: 2|FI v1 h 1 F FI v1 h 1 Z1 Z2 – FI v1 h 1 Z1 FI v1 h 1 Z2 -FI v1 h 1 Z1 I v1 h 1 Z2 FI v1 h 1 FI v1 h 1 Z1 Z2 | Zr p1 pv1 qv(F – F) (F – F) FFh1h1 F – F F – F1 r| – | Zd dvr qv1 q(F – F) (F – F) FFh1h1 F – F F – F1 r| – |p Zpd dq vZ1 1 qv(F – F) (F – F) FFh1h1 F – F F – F| – |pd d .Remark six. By thinking of h1 = h1 in Theorem four, we get Theorem three. Remark 7. If we take into consideration = 1, F = and (F) = led for the result of Dahmani [28].in Theorem four, then we areFractal Fract. 2021, 5,13 of4. Concluding Remarks By utilizing the proposed VU0152099 medchemexpress weighted-type generalized fractional integral operator, we established a class of new integral inequalities for differentiable functions related to Chebyshev’s, weighted Chebyshev’s, and extended Chebyshev’s functionals. The obtained inequalities are in a lot more basic kind than the existing inequalities, which have been published earlier within the literature. Our result’s exceptional situations could be found in [5,11,12,270]. Moreover, for other sorts of operators addressed in Remarks 1 and 2, particular new integral inequalities connected to Chebyshev’s functional and its extensions offered within the literature can be conveniently obtained. One particular may perhaps investigate specific other forms of integral inequalities by (S)-Mephenytoin Epigenetic Reader Domain employing the proposed operators within the close to future.Author Contributions: Conceptualization, G.R. along with a.H.; methodology, G.R.; application, A.H.; validation, G.R., A.A. and K.S.N.; formal evaluation, G.R., A.H. and K.S.N.; investigation, A.H.; sources, K.S.N. and R.N.M.; writing–original draft preparation, G.R., A.H. and K.S.N.; writing–review and editing, G.R., K.S.N. and R.N.M.; visualization, K.S.N.; supervision, G.R.; project administration, G.R. and K.S.N.; funding acquisition, R.N.M. All authors have study and agreed for the published version with the manuscript. Funding: This study received no external funding. Institutional Critique Board Statement: Not Applicable. Informed Consent Statement: Not Applicable. Data Availability Statement: Not Applicable. Acknowledgments: This work was supported by Taif University researchers supporting Project Number (TURSP-2020/102), Taif University, Taif, Saudi Arabia. Conflicts of Interest: The authors declare that they’ve no competing interest.galaxiesArticleBound on Photon Circular Orbits in general Relativity and BeyondSumanta ChakrabortySchool of Physical Sciences, Indian Association for the Cultivation of Science, Kolkata 700032, India; [email protected]: The existence of a photon circular orbit can tell us lots about the nature from the underlying spacetime, considering the fact that it plays a pivotal part inside the understanding in the characteristic signatures of compact objects, namely the quasi-normal modes and shadow radius. For this goal, determination in the place of your photon circular orbit is of utmost significance. Within this perform, we derive bounds around the location of your photon circular orbit about compact objects inside the purview of general relativity and beyond. As we have explicitly demonstrated, contrary towards the earlier benefits within the context of common relativity, the bound on the place with the photon circular orbit is not necessarily an upper bound. Based on the matter content material, it can be probable to arrive at a decrease bound also. This has intriguing implications for the quasi-normal modes and shadow radius, the two k.