Schur-Weyl Duality and Higher Abel-Jacobi Invariants for Tautological Cycles in Mg,n

Abstract

This article investigates the Hodge theory of the moduli space of genus g curves with n marked points, establishing new connections between Schur-Weyl duality for spg and higher Abel-Jacobi invariants. We develop a represe\\ ntation-theoretic framework that decomposes higher Abel-Jacobi invariants of tautological cycles in Cgn according to symplectic Lie algebra representations, leveraging the Leray filtration and motivic decompositions compatible with sp2g-actions. Central to this work is the introduction of higher Faber-Pandharipande cycles FPn = π1× 2(12n · 1) in CHn+1(Cg2), a new family of tautological cycles generalizing classical constructions. We prove these cycles are non-torsion under optimal genus constraints: for families over (n-1)-dimensional bases, FPn is not rationally equivalent to zero when g ≥ 3n+1. Furthermore, we determine the precise position of FPn in the Leray filtration of Cg2 Mg, showing it lies in depth n+1 but no deeper, with explicit non-vanishing in Hn+1(Mg, Rn+1f*Q) on the V(n+1,1)-isotypic component. This yields the first systematic link between Schur-Weyl duality and higher transcendental invariants, revealing that higher diagonals encode geometric phenomena invisible to standard tautological classes.