The modified diagonal cycles of Hypergeometric curves (2508.06008v1)

Abstract: For each $N\geq 2$, Asakura and Otsubo have recently introduced a smooth family of algebraic curves ${X_{N,\lambda}}{\lambda \in \mathbb{P}^1\setminus {0, 1, \infty}}$ in characteristic 0 that is closely related to hypergeometric functions and the Fermat curve of degree $N$. In this paper, we study the Gross-Kudla-Schoen modified diagonal 1-cycles of these curves. We prove that if $p \ge 3$ is a prime, then for every $\lambda$ the Griffiths Abel-Jacobi image of the modified diagonal cycle of $X{p,\lambda}$ is nontrivial for every cuspidal choice of a base point. On the other hand, we show that the modified diagonal cycle and hence the Ceresa cycle of $X_{3,\lambda}$ is torsion in the Chow group for every $\lambda$ and every choice of a base point.