metric relationship - Definition. Was ist metric relationship
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Was (wer) ist metric relationship - definition

SYMMETRIC RANK (0, 2) TENSOR FIELD ON A SMOOTH MANIFOLD
Relativistic metric; Covariant metric tensor

Metrics (networking)         
FIELD IN A ROUTING TABLE, USED BY A ROUTER TO MAKE ROUTING DECISIONS
Routing Metric; Router metrics; Routing metric
Router metrics are configuration values used by a router to make routing decisions. A metric is typically one of many fields in a routing table.
metric system         
  • [[Pavillon de Breteuil]], Saint-Cloud, France, the home of the metric system since 1875
  • [[James Clerk Maxwell]] played a major role in developing the concept of a coherent CGS system and in extending the metric system to include electrical units.
  • The [[metre]] was originally defined to be ''one ten millionth'' of the distance between the [[North Pole]] and the [[Equator]] through [[Paris]].<ref name=Alder />
DECIMAL SYSTEM OF UNITS THAT USES THE METRE AS THE BASIS FOR ITS UNIT OF LENGTH
Metric unit; Metric System; Metric measurement system; The Metric System; Metric conversions; Metric system of measurement; Metric weights and measures; Metrics system; SI symbol; Symbol (metric system); Symbol (metric); Symbols (metric); Symbols (metric system); Metric symbol; Metric symbols; Metric measurements; Mètrique; French metrical system; Metric system of weights and measures
¦ noun the decimal measuring system based on the metre, litre, and gram as units of length, capacity, and weight or mass.
metric system         
  • [[Pavillon de Breteuil]], Saint-Cloud, France, the home of the metric system since 1875
  • [[James Clerk Maxwell]] played a major role in developing the concept of a coherent CGS system and in extending the metric system to include electrical units.
  • The [[metre]] was originally defined to be ''one ten millionth'' of the distance between the [[North Pole]] and the [[Equator]] through [[Paris]].<ref name=Alder />
DECIMAL SYSTEM OF UNITS THAT USES THE METRE AS THE BASIS FOR ITS UNIT OF LENGTH
Metric unit; Metric System; Metric measurement system; The Metric System; Metric conversions; Metric system of measurement; Metric weights and measures; Metrics system; SI symbol; Symbol (metric system); Symbol (metric); Symbols (metric); Symbols (metric system); Metric symbol; Metric symbols; Metric measurements; Mètrique; French metrical system; Metric system of weights and measures
The metric system is the system of measurement that uses metres, grams, and litres.
N-SING: the N

Wikipedia

Metric tensor

In the mathematical field of differential geometry, a metric tensor (or simply metric) is an additional structure on a manifold M (such as a surface) that allows defining distances and angles, just as the inner product on a Euclidean space allows defining distances and angles there. More precisely, a metric tensor at a point p of M is a bilinear form defined on the tangent space at p (that is, a bilinear function that maps pairs of tangent vectors to real numbers), and a metric tensor on M consists of a metric tensor at each point p of M that varies smoothly with p.

A metric tensor g is positive-definite if g(v, v) > 0 for every nonzero vector v. A manifold equipped with a positive-definite metric tensor is known as a Riemannian manifold. Such a metric tensor can be thought of as specifying infinitesimal distance on the manifold. On a Riemannian manifold M, the length of a smooth curve between two points p and q can be defined by integration, and the distance between p and q can be defined as the infimum of the lengths of all such curves; this makes M a metric space. Conversely, the metric tensor itself is the derivative of the distance function (taken in a suitable manner).

While the notion of a metric tensor was known in some sense to mathematicians such as Gauss from the early 19th century, it was not until the early 20th century that its properties as a tensor were understood by, in particular, Gregorio Ricci-Curbastro and Tullio Levi-Civita, who first codified the notion of a tensor. The metric tensor is an example of a tensor field.

The components of a metric tensor in a coordinate basis take on the form of a symmetric matrix whose entries transform covariantly under changes to the coordinate system. Thus a metric tensor is a covariant symmetric tensor. From the coordinate-independent point of view, a metric tensor field is defined to be a nondegenerate symmetric bilinear form on each tangent space that varies smoothly from point to point.