On Modified Diagonal Cycles and the Beauville Decomposition of the Ceresa Cycle
Abstract
Let C be a curve of genus g ≥ 2, and let J be its Jacobian. The choice of a degree 1 divisor e on C gives an embedding of C into J; we denote by [C]e∈ CH( J;Q ) the class in the Chow group of J defined by its image. It is known that the vanishing of the Ceresa cycle Cer(C,e):=[C]e - [-1]* [C]e is equivalent to both the vanishing of the 1st Beauville component [C](1)e and the vanishing of the 3rd Gross--Kudla--Schoen modified diagonal cycle 3(C,e) ∈ CH(C3;Q). We extend this result to show that the vanishing of the s-th Beauville component [C]e(s) for s ≥ 1 is equivalent to the vanishing of the (s+2)-nd modified diagonal cycle s + 2(C, e) ∈ CH(Cs+2;Q). Moreover, we establish "successive vanishing" results for these cycles. We apply our results to study the rational (non)-triviality of [C]e(s) in the special case s = 2. Finally in the s=1 case, we show an integral refinement to the original statement, relating the order of torsion of Cer(C,e) ∈ CH(J;Z) to that of 3(C,e) ∈ CH(C3;Z).
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.