Explicit computation of the Chern character forms

Abstract

We propose a method for explicit computation of the Chern character form of a holomorphic Hermitian vector bundle (E,h) over a complex manifold X in a local holomorphic frame. First, we use the descent equations arising in the double complex of (p,q)-forms on X and find explicit degree decomposition of the Chern-Simons form csk associated to the Chern character form chk of (E,h). Second, we introduce the `ascent' equations that start from the (2k-1,0) component of csk, and use Cholesky decomposition of the Hermitian metric h to represent the Chern-Simons form, modulo d-exact forms, as a ∂-exact form. This yields a formula for the Bott-Chern form bck of type (k-1,k-1) such that chk=-12π∂∂\,bck. Explicit computation is presented for the cases k=2 and 3.