Non-vanishing of Ceresa and Gross--Kudla--Schoen cycles associated to modular curves

Given an algebraic curve $X$ of genus $\ge 3$, one can construct two algebraic $1$-cycles, the Ceresa cycle and the Gross-Kudla-Schoen modified diagonal cycle, each living in the Jacobian of $X$ and the triple product $X \times X \times X$ respectively. These two cycles are homologically trivial but are of infinite order in their corresponding Chow groups for a very general curve over $\mathbb{C}$. From the work of S-W Zhang, for a fixed curve these two cycles are non-torsion in their corresponding Chow groups if and only if one of them is. In this paper, we prove that the Ceresa and Gross-Kudla-Schoen cycles associated to a modular curve $X$ are non-torsion in the corresponding Chow groups when $X=\Gamma \backslash \overline{\mathbb{H}}$ for certain congruence subgroups $\Gamma\subset {\rm SL}_2(\mathbb{Z})$. We obtain the result by studying a pullback formula for special divisors by the diagonal map $X \hookrightarrow X \times X$.