On a Purely ?Riemannian" Proof of the Structure and Dimension of the Unramified Moduli Space of a Compact Riemann Surface.
On a result of Farkas.
On a theorem of Beardon and Maskit.
On a Theorem of Gross-Iversen Type on Riemann Surfaces.
On algebraic curves (of low genus) defined by Kleinian groups
On Analytic Self -Mappings of Riemann Surfaces II.
On Analytic Self-Mappings of Riemann Surfaces.
On arithmetic Fuchsian groups and their characterizations
This is a small survey paper about connections between the arithmetic and geometric properties in the case of arithmetic Fuchsian groups.
On Asymtotic Values of Meromorphic Functions.
On Automorphic Forms and Hodge Theory.
On Automorphisms of Prime Order of a Riemann Surface as Matrices.
On boundary behavior of Cauchy integrals
In this paper, we shall estimate the growth order of the n-th derivative Cauchy integrals at a point in terms of the distance between the point and the boundary of the domain. By using the estimate, we shall generalize Plemelj-Sokthoski theorem. We also consider the boundary behavior of generalized Cauchy integrals on compact bordered Riemann surfaces.
On boundary cluster sets.
On central extensions of mapping class groups.
On commutativity and ovals for a pair of symmetries of a Riemann surface
We study the upper bounds for the total number of ovals of two symmetries of a Riemann surface of genus g, whose product has order n. We show that the natural bound coming from Bujalance, Costa, Singerman and Natanzon's original results is attained for arbitrary even n, and in case of n odd, there is a sharper bound, which is attained. We also prove that two (M-q)- and (M-q')-symmetries of a Riemann surface X of genus g commute for g ≥ q+q'+1 (by (M-q)-symmetry we understand a symmetry having g+1-q...
On compact Klein surfaces with a special automorphism group.
On compact Riemann surfaces with a maximal number of automorphisms.
On conjugacy of p-gonal automorphisms of Riemann surfaces.
On cusp forms for co-finite subgroups of PSL(2, IR).
On Cyclic Groups of Möbius Transformations.