Approximation de métriques de Yang-Mills pour un fibré E=E0 partir de métriques induites de $H^{0}(X,E(n))$

Details Approximation de métriques de Yang-Mills pour un fibré E=E0 partir de métriques induites de $H^{0}(X,E(n))$ Approximation de métriques de Yang-Mills pour un fibré E=E0 partir de métriques induites de $H^{0}(X,E(n))$

1999-03-25

arxiv.org/abs/math/9903148v2

Mathematics

Differential Geometry

Scientific paper

Let $E_{n}$ be an holomorphic bundle of rank two on an algebraic curve $X$ (the degree of $E_{n}$ is $n$ apart from an additive constant). Note by $Met(E_{n})$ the space of hermitian metrics $h$ on $E_{n}$. Also, consider $Met(W_{n})$, the space of metrics on $H^{0}(X,E_{n})$. Although $Met(W_{n})$ is finite dimensional, it's dimension grows with $n$. So we can ask how to obtain a way to describe particular metrics of $Met(E_{n})$ using $Met(W_{n})$. First, we link these two spaces by two morphisms $L_{n}$ and $I_{n}$. Donaldson gave a criterion for detecting Einstein Hermitian metrics on $Met(E_{n})$, using a functional $\mathcal M$. We construct another functional on $Met(W_{n})$, $\mathcal KN_{n}$, 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 $\mathcal M-\mathcal KN\circ L_{n}$ becomes small when $n$ grows. Moreover, with some hypotheses, we show that Yang-Mills minimum can be characterized(appromimately) by $\mathcal KN_{n}$. The proof of our main theorem is based on constructing "concentrated" sections of $E_{n}$, in a way similar to Donaldson's recent work on symplectic varieties.

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