immersed$97783$ - definizione. Che cos'è immersed$97783$
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Cosa (chi) è immersed$97783$ - definizione

DIFFERENTIABLE FUNCTION WHOSE DERIVATIVE IS EVERYWHERE INJECTIVE
Immersed plane curve; Immersed surface
  • The [[Klein bottle]], immersed in 3-space.
  • The [[Möbius strip]] does not immerse in codimension 0 because its tangent bundle is non-trivial.
  • The [[quadrifolium]], the 4-petaled rose.
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Immersed tube         
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UNDERSEA TUNNEL COMPOSED OF SUNKEN LINKED PREFABRICATED SEGMENTS
Immersed Tube; Immersed tunnel; Immersed tube tunnel; Tube tunnel; Immersed tubes
An immersed tube (or immersed tunnel) is a kind of undersea tunnel composed of segments, constructed elsewhere and floated to the tunnel site to be sunk into place and then linked together. They are commonly used for road and rail crossings of rivers, estuaries and sea channels/harbours.
Immersed boundary method         
Immersed Boundary Method
In computational fluid dynamics, the immersed boundary method originally referred to an approach developed by Charles Peskin in 1972 to simulate fluid-structure (fiber) interactions. Treating the coupling of the structure deformations and the fluid flow poses a number of challenging problems for numerical simulations (the elastic boundary changes the flow of the fluid and the fluid moves the elastic boundary simultaneously).
Immersion (mathematics)         
In mathematics, an immersion is a differentiable function between differentiable manifolds whose differential (or pushforward) is everywhere injective.This definition is given by , , , , , , , .

Wikipedia

Immersion (mathematics)

In mathematics, an immersion is a differentiable function between differentiable manifolds whose differential (or pushforward) is everywhere injective. Explicitly, f : MN is an immersion if

D p f : T p M T f ( p ) N {\displaystyle D_{p}f:T_{p}M\to T_{f(p)}N\,}

is an injective function at every point p of M (where TpX denotes the tangent space of a manifold X at a point p in X). Equivalently, f is an immersion if its derivative has constant rank equal to the dimension of M:

rank D p f = dim M . {\displaystyle \operatorname {rank} \,D_{p}f=\dim M.}

The function f itself need not be injective, only its derivative must be.

A related concept is that of an embedding. A smooth embedding is an injective immersion f : MN that is also a topological embedding, so that M is diffeomorphic to its image in N. An immersion is precisely a local embedding – that is, for any point xM there is a neighbourhood, UM, of x such that f : UN is an embedding, and conversely a local embedding is an immersion. For infinite dimensional manifolds, this is sometimes taken to be the definition of an immersion.

If M is compact, an injective immersion is an embedding, but if M is not compact then injective immersions need not be embeddings; compare to continuous bijections versus homeomorphisms.