Extremal lengths of homology classes on compact Riemann surfaces

In [1], given a canonical decomposition H 1 (R) = G 1 +G 2 of the homology group of a compact Riemann surface R of genus 2, we have investigated the set ∆[G 1 , G 2 ] of the diagonal entries of period matrices associated with the decomposition. Theorem 1. the same hyperbolic radius, where Γ = P SL(

Let + be an orthogonal measure with compact support of finite length in C n . We prove, under a very weak hypothesis of regularity on the support (Supp +) of +, that this measure is characterized by its boundary values (in the weak sense of currents) of the current [T] 7 ., where T is an analytic su

## Ž . points on M. We study the Weierstrass gap set G P , . . . , P and prove the 1 4 Ž . conjecture of Ballico and Kim on the upper bound of ࠻G P , . . . , P affirmatively 1 4 in case M is d-gonal curve of genus g G 5 with d s 2 or d G 5. ᮊ 2002 Elsevier Ž . Science USA 1 1 Ž . cardinality ࠻G P