Approximation de m\'etriques de Yang-Mills pour un fibr\'e E=E0 partir de m\'etriques induites de H0(X,E(n))

Abstract

Let En be an holomorphic bundle of rank two on an algebraic curve X (the degree of En is n apart from an additive constant). Note by Met(En) the space of hermitian metrics h on En. Also, consider Met(Wn), the space of metrics on H0(X,En). Although Met(Wn) is finite dimensional, it's dimension grows with n. So we can ask how to obtain a way to describe particular metrics of Met(En) using Met(Wn). First, we link these two spaces by two morphisms Ln and In. Donaldson gave a criterion for detecting Einstein Hermitian metrics on Met(En), using a functional M. We construct another functional on Met(Wn), KNn, using an algebraic idea of Kempf and Ness. In our investigations we prove that the variation of the analytic torsion, when h varies, becomes small when n grows . However our main result is that M- KN Ln becomes small when n grows. Moreover, with some hypotheses, we show that Yang-Mills minimum can be characterized(appromimately) by KNn. The proof of our main theorem is based on constructing "concentrated" sections of En, in a way similar to Donaldson's recent work on symplectic varieties.

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