Publication: Certain fractional q-integral formulas for the basic I-function of two variables
Abstract
© CSP - Cambridge, UK; I&S - Florida, USA, 2022In the present paper, we derive two theorems involving fractional q-integral operators of Erdélyi-Kober type involving the basic analogue of the I-function of two variables. Corresponding assertions for the Riemann-Liouville and Weyl fractional q-integral transforms are also presented. Several special cases of the main results have also been illustrated.
Description
Keywords
Havacılık ve Uzay Mühendisliği, Matematik, Bilgisayar Bilimleri, Temel Bilimler, Mühendislik ve Teknoloji, Aeronautical and Space Engineering, Mathematics, Computer Science, Natural Sciences, Engineering and Technology, Mühendislik, Bilişim ve Teknoloji (ENG), Temel Bilimler (SCI), Mühendislik, MATEMATİK, UYGULAMALI, MÜHENDİSLİK, HAVACILIK, Engineering, Computing & Technology (ENG), Natural Sciences (SCI), ENGINEERING, MATHEMATICS, MATHEMATICS, APPLIED, ENGINEERING, AEROSPACE, Modelleme ve Simülasyon, Fizik Bilimleri, Uzay Mühendisliği, Uygulamalı matematik, Modeling and Simulation, Physical Sciences, Aerospace Engineering, Applied Mathematics, Basic analogue of h-function of two variables, Basic analogue of i-function of two variables, Fractional q-integral operators, Q-mellin-barnes double contour integral.
Citation
Kumar D., Ayant F., UÇAR F., Purohit S. D. , "Certain fractional q-integral formulas for the basic I-function of two variables", Mathematics in Engineering, Science and Aerospace, cilt.13, sa.2, ss.315-321, 2022