Residuation of Linear Series and The Effective Cone of Cd

Abstract

We obtain new information about divisors on the d-th symmetric power Cd of a general curve C of genus g ≥ 4. This includes a complete description of the effective cone of Cg-1 and a partial computation of the volume function on one of its non-nef subcones, as well as new bounds for the effective and movable cones of Cd in the range g+12 ≤ d ≤ g-2. We also obtain, for each g ≥ 5, a divisor on Cg-1 with non-equidimensional stable base locus. For a general hyperelliptic curve C of genus g, we obtain a complete description of the effective cone of Cd for 2 ≤ d ≤ g and an integral divisor on Cg-1 which has non-integral volume whenever g is not a power of 2.