Solutions for some families of Fuchsian differential equations free from accessory parameters in terms of the integral of Euler type (Q2906434)

Fuchsian differential equations free from accessory parameters (rigid Fuchsian equations) were classified by \textit{T. Yokoyama} [Funkc. Ekvacioj, Ser. Int. 38, No. 1, 11--19 (1995; Zbl 0834.34013)] into eight different classes, (I), (II), (III), (IV), (I*), (II*), (III*), (IV*), according to their spectral type. For example, the equations in class (I) can be solved in terms of the generalised hypergeometric functions \({}_{n+1}E_n\), which have integral representations of Euler type. It is here shown in turn, for every of the above classes, that the solutions of equations in that class can be represented similarly by generalised integrals of Euler type. These integrals are illustrated by certain diagrams representing the different factors and exponents of the integrand.NEWLINENEWLINEFor the entire collection see [Zbl 1242.14003].