Indefinite q-integrals from a method using q-Riccati equations

Gamela E. Heragy, Zeinab S. I. Mansour, Karima M. Oraby
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Abstract

In an earlier work, a method was introduced for obtaining indefinite q-integrals of q-special functions from the second-order linear q-difference equations that define them. In this paper, we reformulate the method in terms of q-Riccati equations, which are nonlinear and first order. We derive q-integrals using fragments of these Riccati equations, and here only two specific fragment types are examined in detail. The results presented here are for the q-Airy function, the Ramanujan function, the discrete q-Hermite I and II polynomials, the q-hypergeometric functions, the q-Laguerre polynomials, the Stieltjes-Wigert polynomial, the little q-Legendre and the big q-Legendre polynomials.

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从使用 q-Riccati 方程的方法得出不定 q 积分
在早先的研究中,我们提出了一种从定义 q 特殊函数的二阶线性 q 微分方程中获得 q 特殊函数不定 q 积分的方法。在本文中,我们用 q-Riccati 方程重新表述了这一方法,它是非线性和一阶的。我们利用这些里卡提方程的片段推导出 q 积分,这里只对两种特定的片段类型进行详细研究。这里介绍的结果涉及 q-Airy 函数、Ramanujan 函数、离散 q-Hermite I 和 II 多项式、q-hypergeometric 函数、q-Laguerre 多项式、Stieltjes-Wigert 多项式、小 q-Legendre 和大 q-Legendre 多项式。
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