- In
mathematical complex analysis, a
quasiconformal mapping,
introduced by Grötzsch (1928) and
named by
Ahlfors (1935), is a (weakly differentiable) homeomorphism...
-
Jordan curve in the
complex plane that is the
image of a
circle under a
quasiconformal mapping of the
plane onto itself.
Originally introduced independently...
-
mathematician who made
contributions to
complex analysis. He
introduced quasiconformal mappings and
differential geometric methods into the
study of Riemann...
- curves,
value distribution theory,
Riemann surfaces,
conformal geometry,
quasiconformal mappings and
other areas during his career. In 1933, he
married Erna...
-
necessarily their size or curvature. In
mathematical complex analysis, a
quasiconformal mapping,
introduced by Grötzsch (1928) and
named by
Ahlfors (1935),...
-
generalization of the
Riemann mapping theorem, but
instead a
result concerning quasiconformal mappings and
solutions of the
Beltrami equation. The
result was prefigured...
-
fundamental group Γ can be read off from such a polygon.
Using the
theory of
quasiconformal mappings and the
Beltrami equation, it can be
shown there is a canonical...
-
contribution of Teichmüller to the
study of
moduli was the
introduction of
quasiconformal mappings to the subject. They
allow us to give much more
depth to the...
- } for some
fixed 1 < p < ∞ and some ω, then ω ∈ Ap. For K > 1, a K-
quasiconformal mapping is a
homeomorphism f : Rn →Rn such that f ∈ W l o c 1 , 2...
-
index theorem is an
extension of the Atiyah–Singer
index theorem to
quasiconformal manifolds due to a
joint paper by
Simon Donaldson and ****van in 1989...
