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Soit une surface complexe réglée. Nous introduisons des métriques de volume fini sur dons les singularités sont paramétrisées par une structure parabolique sur le fibré . Nous généralisons alors un résultat de Burns-deBartolomeis et Le Brun, en montrant que l’existence de métriques kählériennes singulières, de volume fini, à courbure scalaire constante négative ou nulle sur est équivalente à une condition de polystabilité parabolique sur ; de plus ces métriques proviennent toutes de quotients...
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