Dodatkowe przykłady dopasowywane są do haseł w zautomatyzowany sposób - nie gwarantujemy ich poprawności.
Ideas from integral calculus also carry over to differential manifolds.
Introduction to differential manifold, Guassian and mean curvature, imbedding conditions.
It plays the role analogous to that of the covariant derivative on differential manifolds.
In this case, the are coordinates of the -space, and the latter is a differential manifold .
Note that two diffeomorphic coordinate patches on a differential manifold need not overlap differentiably.
As long as we are dealing with differential manifolds, there is in general no canonical group structure on .
Four-dimensional differential manifolds have some unique properties.
Accordingly, this gives a differential manifold or (real-)analytic structure on the manifold rather than a smooth one.
For example a differential manifold M has a principal bundle of frames associated to its tangent bundle.
Differential manifolds (summary of results)
The concept was introduced by Andre Weil in 1952 for differential manifolds, demanding the to be differentiably contractible.
This is a differential manifold with a Finsler metric, i.e. a Banach norm defined on each tangent space.
As an example, sections of the tangent bundle of a differential manifold are nothing but vector fields on that manifold.
Tangent vector, an element of the tangent space of a curve, a surface or, more generally, a differential manifold at a given point.
The real canonical line bundle of a differential manifold M is a flat line bundle, called the orientation bundle.
A. Kosinski, Differential Manifolds.
A family of C-compatible charts covering the whole manifold is a C-atlas defining a C differential manifold.
The other major work from Surge and Shadow is a sculptural piece entitled Flying Curve, Differential Manifold.
Picking up from similar past works (Kurotoplac Kurve), Flying Curve, Differential Manifold is on a new scale.
The etale space for the sheaf of differentiable functions on a differential manifold is not Hausdorff, but it is locally Hausdorff.
These facts are particularly important because shrinking of open covers is a common technique in the theory of differential manifolds and while constructing functions using a partition of unity.
This can be thought of intuitively as: "The distance between two infinitesimally close points on a statistical differential manifold is the amount of information, i.e. the informational difference between them."
The aim of this Ph.D. project is first to produce a constructively useful definition of "differential manifold", and then to develop, constructively, the fundamentals of Riemannian geometry.
E. Cartan himself in 1922 gave a counterexample, which provided one of the impulses in the next decade for the development of the De Rham cohomology of a differential manifold.
In the field of mathematics known as differential geometry, a generalized complex structure is a property of a differential manifold that includes as special cases a complex structure and a symplectic structure.