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POWER SERIES PROOFS FOR LOCAL STABILITIES OF KÄHLER AND BALANCED STRUCTURES WITH MILD
$\partial \overline {\partial }$
-LEMMA
Abstract By use of a natural map introduced recently by the first and third authors from the space of pure-type complex differential forms on a complex manifold to the corresponding one on the small differentiable deformation of this manifold, we will give a power series proof for Kodaira–Spencer’s local stability theorem of Kähler structures. We also obtain two new local stability theorems, one of balanced structures on an n-dimensional balanced manifold with the
$(n-1,n)$
th mild
$\partial \overline {\partial }$
-lemma by power series method and the other one on p-Kähler structures with the deformation invariance of
$(p,p)$
-Bott–Chern numbers.
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