| AbstractBalanced metrics |
| @ A balanced metric is a hermitian metric on a complex $n$-dimensional
manifold such that its hermitian form $\omega$ satisfies
$d\omega^{n-1}=0$. The balanced metric was studied extensively by
Michelsohn. In these lectures, I will focus on its basic properties
and examples. In my talk, I will also explain that the balanced metric
plays an important role in the study of non-K\hahler complex geometry
and to superstring theories. The Lecture series is scheduled as follows. 7/23(Wed.j 16:30--18:00 kawai hall 7/24(Thur.j 16:30--18:00 kawai hall
7/25(Fri.j 16:30--18:00 kawai hall |