-
developed by de
Branges. Actually, the
correctness of the
Bieberbach conjecture was not the only
important consequence of de
Branges' proof,
which covers...
-
conjecture (later
proved by de
Branges)
implies the
Robertson conjecture and
therefore the
Bieberbach conjecture.
Finally de
Branges (1987)
proved | a n | ≤...
-
Branges (French pronunciation: [bʁɑ̃ʒ]) is a
commune in the Saône-et-Loire
department in the
region of Bourgogne-Franche-Comté in
eastern France. Communes...
- mathematics, a de
Branges space (sometimes
written De
Branges space) is a
concept in
functional analysis and is
constructed from a de
Branges function. The...
- series. In 1984
Louis de
Branges proved the
conjecture (for this reason, the
Bieberbach conjecture is
sometimes called de
Branges' theorem).
There is also...
-
essential way, as well as the Hahn–Banach theorem: the
process of
Louis de
Branges (1959). See also
Rudin (1973, §5.7). Nachbin's
theorem gives an analog...
-
Entire Functions" by
Kevin Linghu.
Section 14 of the book by de
Branges, or
Louis de
Branges (1963). "Some
applications of
spaces of
entire functions". Canadian...
- R. Ford Award, and the 1989
Chauvenet Prize, for an
essay on
Louis de
Branges de Bourcia's
proof of the
Bieberbach conjecture. In 2012, he
became a fellow...
- hypothesis. Some of
these ideas are
elaborated in
Lapidus (2008).
Louis de
Branges (1992)
showed that the
Riemann hypothesis would follow from a positivity...
- Schwarz–Ahlfors–Pick
theorem provides an
analogous theorem for
hyperbolic manifolds. De
Branges' theorem,
formerly known as the
Bieberbach Conjecture, is an important...
