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Upper bounds for regularized determinants

dg-ga 2009-10-30 v1 Differential Geometry

Abstract

Let EE be a holomorphic vector bundle on a compact K\"ahler manifold XX. If we fix a metric hh on EE, we get a Laplace operator Δ\Delta acting upon smooth sections of EE over XX. Using the zeta function of Δ\Delta, one defines its regularized determinant det(Δ)det'(\Delta). We conjectured elsewhere that, when hh varies, this determinant det(Δ)det'(\Delta) remains bounded from above. In this paper we prove this in two special cases. The first case is when XX is a Riemann surface, EE is a line bundle and dim(H0(X,E))+dim(H1(X,E))2dim(H^0 (X,E)) + dim(H^1 (X,E)) \leq 2, and the second case is when XX is the projective line, EE is a line bundle, and all metrics under consideration are invariant under rotation around a fixed axis.

Keywords

Cite

@article{arxiv.dg-ga/9711001,
  title  = {Upper bounds for regularized determinants},
  author = {H. Gillet and C. Soulé},
  journal= {arXiv preprint arXiv:dg-ga/9711001},
  year   = {2009}
}

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22 pages, plain TeX