Abstract
Si π est le groupe fondamental d'une surface orientee fermee S et G est un groupe de Lie satisfaisant des conditions tres generales, alors l'espace Hom (π,G)/G des classes de conjugaison de representation π→G a une structure symplectique naturelle. On etudie la geometrie de cette structure symplectique a l'aide d'une famille naturelle de fonctions sur Hom(π,G)/G
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