-
listed as a
grave of
honour of the
State of Berlin. He is the
eponym of
Fuchsian groups and functions, and the Picard–Fuchs equation. A
singular point a...
- In mathematics, a
Fuchsian group is a
discrete subgroup of PSL(2,R). The
group PSL(2,R) can be
regarded equivalently as a
group of orientation-preserving...
- mathematics, a
Fuchsian model is a
representation of a
hyperbolic Riemann surface R as a
quotient of the
upper half-plane H by a
Fuchsian group.
Every hyperbolic...
-
developments of
automorphic forms other than
modular forms. The case of Γ a
Fuchsian group had
already received attention before 1900 (see below). The Hilbert...
- The
Fuchsian theory of
linear differential equations,
which is
named after Lazarus Immanuel Fuchs,
provides a
characterization of
various types of singularities...
- just
conjugate to
Fuchsian groups under conformal transformations.
Finitely generated quasi-
Fuchsian groups are
conjugate to
Fuchsian groups under quasi-conformal...
-
Arithmetic Fuchsian groups are a
special class of
Fuchsian groups constructed using orders in
quaternion algebras. They are
particular instances of arithmetic...
-
including the
point at infinity, are
regular singular points is
called a
Fuchsian ordinary differential equation. In this case the
equation above is reduced...
- In mathematics, an
ordinary differential equation (ODE) is a
differential equation (DE)
dependent on only a
single independent variable. As with other...
- Many
properties of
Kleinian models are in
direct analogy to
those of
Fuchsian models; however, overall, the
theory is less well developed. A
number of...
