A note on the Hurwitz problem and cone spherical metrics

Abstract

We are motivated by cone spherical metrics on compact Riemann surfaces of positive genus to solve a special case of the Hurwitz problem. Precisely speaking, letting d,\,g and be three positive integers and be the following collection of (+2) partitions of a positive integer d: \[(a1,·s, ap),\,(b1,·s, bq),\,(m1+1,1,·s,1),·s, (m+1,1,·s,1),\] where (m1,·s, m) is a partition of p+q-2+2g, we prove that there exists a branched cover from some compact Riemann surface of genus g to the Riemann sphere P1 with branch data . An analogue for the genus-zero case was found by the first two authors ( Algebra Colloq. 27 (2020), no. 2, 231-246), who were stimulated by such metrics on P1 and conjectured the veracity of the above statement there.