Motives and the Hodge Conjecture for moduli spaces of pairs

Abstract

Let C be a smooth projective curve of genus g≥ 2 over C. Fix n≥ 1, d∈ Z. A pair (E,φ) over C consists of an algebraic vector bundle E of rank n and degree d over C and a section φ ∈ H0(E). There is a concept of stability for pairs which depends on a real parameter τ. Let Mτ(n,d) be the moduli space of τ-polystable pairs of rank n and degree d over C. Here we prove that for a generic curve C, the moduli space Mτ(n,d) satisfies the Hodge Conjecture for n ≤ 4. For obtaining this, we prove first that Mτ(n,d) is motivated by C.