Representations on canonical models of generalized Fermat curves and their syzygies

Abstract

We study canonical models of (Z/kZ)n- covers of the projective line, tamely ramified at exactly n+1 points each of index k, when k,n≥ 2 and the characteristic of the ground field K is either zero or does not divide k. We determine explicitly the structure of the respective homogeneous coordinate ring first as a graded K-algebra, next as a (Z/kZ)n- representation over K, and then as a graded module over the polynomial ring; in the latter case, we give generators for its first syzygy module, which we also decompose as a direct sum of irreducible representations.