On the Algebro-Geometric Analysis of Meromorphic (1,0)-forms

Abstract

In this paper, we analyze the theory of meromorphic (1,0)-forms ω∈M(1,0)(CP1). Hence, we show that on a compact Riemann surface of genus g=0, isomorphic to CP1, every non-constant meromorphic function f:X1 has as many zeros as poles, where each is counted according to multiplicities. Such an analysis gives rise to the following result. Invoking the Riemann-Roch theorem for a compact Riemann X with canonical divisor K, it follows that deg(f)=0 for any principal divisor (f):=D on X. More precisely, (D)-(K-D)=deg(D)+1=1 or (D)-(K-D)-1=0. Furthermore, for a diffeomorphism η:X1 of a certain kind, a multistep program is implemented to show X is a compact algebraic variety of dimension one, i.e. a non-singular projective variety. Hence, we adopt a group-theoretic approach and provide a useful heuristic, that is, a set of technical conditions to facilitate the algebro-geometric analysis of simply connected Riemann surfaces X.