An analogue of the Bessel asymptotic expansion for the Ferrers functions (Q2901783)

The author studies the questions connected with the asymptotic representation of different real functions. He extends the well-known expansion of the Bessel function of the first type to the so-called Ferrers function defined by NEWLINE\[NEWLINET_{\nu}^{\mu}(x)=\frac{e^{i\pi\mu}}{\Gamma(1-\mu)}\left(\frac{1+x}{1-x}\right)^{\frac{\mu}{2}} F\left(-\nu, \nu+1; 1-\mu; \frac{1-x}{2}\right)\,,NEWLINE\]NEWLINE where \(\mu, \nu\in {\mathbb C},\) \(x\in (-1, 1)\) and \(F\) is the hypergeometric Gauss function. The main result states the possibility of some representation for the quantity \(T_{\lambda-\frac{1}{2}}^{\mu}(\cos r)\) as \(| \arg \lambda| \leq \pi-\varepsilon\) and \(\varepsilon\in (0, \pi)\).