Analytic connections on Riemann surfaces and orbifolds

We give a differentially closed description of the uniformizing representation to the analytical apparatus on Riemann surfaces and orbifolds of finite analytic type. Apart from well-known automorphic functions and Abelian differentials it involves construction of the connection objects. Like functions and differentials, the connection, being also the fundamental object, is described by algorithmically derivable ODEs. Automorphic properties of all of the objects are associated to different discrete groups, among which are excessive ones. We show, in an example of the hyperelliptic curves, how can the connection be explicitly constructed. We study also a relation between classical/traditional ‘linearly differential’ viewpoint (principal Fuchsian equation) and uniformizing ττ-representation of the theory. The latter is shown to be supplemented with the second (to the principal) Fuchsian equation.