- In mathematics,
de Rham cohomology (named
after Georges de Rham) is a tool
belonging both to
algebraic topology and to
differential topology, capable...
-
equestrian DeRham Farm in Philipstown, New York
De Rham,
Iselin &
Moore De Rham curve De Rham cohomology De Rham invariant De Rham–Weil
theorem Hodge–
de Rham spectral...
-
English hammer thrower Company:
Derham Body Company,
American coachbuilder Dereham (disambiguation)
Durham (disambiguation)
DeRham Farm in Philipstown, New York...
- so it induces: [ k ] : H
deRham ∗ ( M ) → H ∞ − s i n g ∗ ( M ) {\displaystyle [k]:\operatorname {H} _{\textrm {
deRham}}^{*}(M)\to \operatorname...
- derivative. The
resulting operator is
called the Laplace–
de Rham operator (named
after Georges de Rham). The Laplace–Beltrami operator, like the Laplacian...
-
Georges de Rham (French: [dəʁam]; 10
September 1903 – 9
October 1990) was a
Swiss mathematician,
known for his
contributions to
differential topology...
-
Claudia de Rham (born 29
March 1978) is a
Swiss theoretical physicist working at the
interface of gravity, cosmology, and
particle physics. She is based...
-
point of the curve. The Koch
curve arises as a
special case of a
de Rham curve. The
de Rham curves are
mappings of
Cantor space into the plane,
usually arranged...
- In mathematics, the Hodge–
de Rham spectral sequence (named in
honor of W. V. D.
Hodge and
Georges de Rham) is an
alternative term
sometimes used to describe...
-
singular cohomology of a
manifold can be
computed as the
de Rham cohomology of it, that is, the
de Rham theorem,
relies on the Poincaré lemma. It does, however...
