Computation of the index of some meromorphic functions of degree 3 on tori

Abstract

The index of a meromorphic function g on a compact Riemann surface is an invariant of g, which is defined as the number of negative eigenvalues of the differential operator L:=--|dG|2, where is the Laplacian with respect to a conformal metric ds2 on the Riemann surface, G M S2 is the holomorphic map corresponding to g. We consider the meromorphic function w on the Riemann surface Ma= \(z,w) ∈C2 w2=z(z-a)(z+1a)\(a ≥slant 1 ) homeomorphic to a torus, and we determine the index of tw for all a in the range 1 ≤slant a ≤slant a0 (where a0 can be numerically evaluated) and all t>0.