The authors mainly concern the set Uf of c E C such that the power deformation z(f-(z)/z)c is univalent in the unit disk |z|〈 1 for a given analytic univalent function f(z) = z + a2z2 + ... in the unit disk...The authors mainly concern the set Uf of c E C such that the power deformation z(f-(z)/z)c is univalent in the unit disk |z|〈 1 for a given analytic univalent function f(z) = z + a2z2 + ... in the unit disk. It is shown that Uf is a compact, polynomially convex subset of the complex plane C unless f is the identity function. In particular, the interior of Uf is simply connected. This fact enables us to apply various versions of the X-lemma for the holomorphic family z(f(z)/z)c of injections parametrized over the interior of Uf. The necessary or sufficient conditions for Uf to contain 0 or 1 as an interior point are also given.展开更多
基金Project supported by Yeungnam University(2011)(No.211A380226)the JSPS Grant-in-Aid forScientific Research(B)(No.22340025)
文摘The authors mainly concern the set Uf of c E C such that the power deformation z(f-(z)/z)c is univalent in the unit disk |z|〈 1 for a given analytic univalent function f(z) = z + a2z2 + ... in the unit disk. It is shown that Uf is a compact, polynomially convex subset of the complex plane C unless f is the identity function. In particular, the interior of Uf is simply connected. This fact enables us to apply various versions of the X-lemma for the holomorphic family z(f(z)/z)c of injections parametrized over the interior of Uf. The necessary or sufficient conditions for Uf to contain 0 or 1 as an interior point are also given.
