Indefinite q-integrals of quotients of q-hypergeometric functions

Heragy, Gamela E.; Mansour, Zeinab S. I.; Oraby, Karima

doi:10.21608/fsrt.2023.201930.1089

Indefinite q-integrals of quotients of q-hypergeometric functions

Document Type : Original Article

Authors

¹ Suez University

² Cairo University

10.21608/fsrt.2023.201930.1089

Abstract

This paper uses Heine contiguous relations for the basic hypergeometric function ${}_2\phi_1$, the $q$-integrating factor method for solving linear first order $q$-difference equations, and an indefinite $q$-integral formula involving two arbitrary functions to derive indefinite $q$-integrals involving quotients of the hypergeometric functions ${}_2\phi_1$. This paper uses Heine contiguous relations for the basic hypergeometric function ${}_2\phi_1$, the $q$-integrating factor method for solving linear first order $q$-difference equations, and an indefinite $q$-integral formula involving two arbitrary functions to derive indefinite $q$-integrals involving quotients of the hypergeometric functions ${}_2\phi_1$.This paper uses Heine contiguous relations for the basic hypergeometric function ${}_2\phi_1$, the $q$-integrating factor method for solving linear first order $q$-difference equations, and an indefinite $q$-integral formula involving two arbitrary functions to derive indefinite $q$-integrals involving quotients of the hypergeometric functions ${}_2\phi_1$.This paper uses Heine contiguous relations for the basic hypergeometric function ${}_2\phi_1$, the $q$-integrating factor method for solving linear first order $q$-difference equations, and an indefinite $q$-integral formula involving two arbitrary functions to derive indefinite $q$-integrals involving quotients of the hypergeometric functions ${}_2\phi_1$.

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