Scrollar invariants, syzygies and representations of the symmetric group II

Abstract

Let : C P1 be a degree d cover of curves. In work by Castryck, Zhao and the author, we showed how one can attach to each partition λ of d a multi-set of scrollar invariants of λ with respect to . We studied these invariants when is simply branched, and related these new scrollar invariants to known geometric data. In this article we show how one can remove this simple branching condition, using the notion of Sd-closure as developed by Bhargava and Satriano. With this new framework, we are able to generalize all results from this work to arbitrary covers C P1. In particular, we obtain a syzygy-free interpretation for the splitting types of the syzygy bundles in the Casnati--Ekedahl resolution of an arbitrary cover : C P1. By using the Maroni bound, we are able to give new general bounds on these splitting types.