Prym Subvarieties of Jacobians via Schur correspondances between curves

Abstract

Let π : Z X be Galois cover of smooth projective curves with Galois group W a Weyl group of a simple Lie group G. For a dominant weight λ, we consider the intermediate curve Yλ= Z/(λ). One can realise a Prym variety Pλ ⊂ (Yλ) and we denote λ the restriction of the principal polarisation of (Yλ) upon Pλ. For two dominant weights λ and μ, we construct a correspondence λ μ on Yλ × Yμ and calculate the pull-back of μ by λ μ in terms of λ.