S. L. Krushkal
abstract:
This paper deals with holomorphic functions from Bergman spaces $B^p$
in the disk and provides the existence of deformations (variations) which do
not increase the norm of functions and preserve some other prescribed
properties. Admissible variations are constructed (for even integer $p \geq
2$) using special quasiconformal maps of the complex plane (in line with a new
approach to variational problems for holomorphic functions in Banach spaces).