Difference between revisions of "Cut"
From Encyclopedia of Mathematics
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| + | $#A+1 = 21 n = 0 | ||
| + | $#C+1 = 21 : ~/encyclopedia/old_files/data/C027/C.0207440 Cut | ||
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| + | ''in a domain $ D \subset \mathbf C $ | ||
| + | along a non-closed simple arc $ \gamma = \{ {z ( t) } : {0 \leq t \leq 1 } \} $'' | ||
| + | The removal of the points of the arc $ \gamma $ | ||
| + | from the domain $ D $, | ||
| + | that is, replacing the domain $ D $ | ||
| + | by the domain (or domains) $ D \setminus \gamma $, | ||
| + | as well as the set $ \gamma $ | ||
| + | itself. Here it is assumed that either the whole arc $ \gamma $ | ||
| + | or the whole arc except the initial or end point $ z ( 0), z ( 1) $ | ||
| + | belongs to $ D $ | ||
| + | and that $ z ( 0) $ | ||
| + | or $ z ( 1) $ | ||
| + | belong to the boundary $ \partial D $. | ||
| + | To each point $ z ( t) $ | ||
| + | of the cut $ \gamma $, | ||
| + | when $ 0 < t < 1 $, | ||
| + | there correspond two prime ends of the part of the domain $ D $ | ||
| + | which belongs to $ \gamma $; | ||
| + | the left and right prime ends (cf. [[Limit elements|Limit elements]]). The union of these prime ends form the left and right-hand sides of the cut $ \gamma $. | ||
====Comments==== | ====Comments==== | ||
A cut is also called a slit. | A cut is also called a slit. | ||
| − | One also speaks of boundary elements instead of limit elements or prime ends. These notions do not coincide in general, but for "nice" domains | + | One also speaks of boundary elements instead of limit elements or prime ends. These notions do not coincide in general, but for "nice" domains $ D $( |
| + | e.g. with Jordan boundary) they can be identified. A related notion is that of a crosscut: an open simple arc that begins and ends at two different points of $ \partial D $, | ||
| + | cf. [[#References|[a1]]], especially Chapt. 3. | ||
The word "cut" also occurs in several more meanings in various parts of mathematics. Thus, there is the notion of a [[Dedekind cut|Dedekind cut]] in the real or rational numbers, cf. [[Real number|Real number]]. The notion cut point on a [[Geodesic line|geodesic line]]; and a cut or cutset in a graph or transportation network (cf. [[Flow in a network|Flow in a network]] for the latter). Finally there are the [[Cut locus|cut locus]] and the [[Cutting problem|cutting problem]]. | The word "cut" also occurs in several more meanings in various parts of mathematics. Thus, there is the notion of a [[Dedekind cut|Dedekind cut]] in the real or rational numbers, cf. [[Real number|Real number]]. The notion cut point on a [[Geodesic line|geodesic line]]; and a cut or cutset in a graph or transportation network (cf. [[Flow in a network|Flow in a network]] for the latter). Finally there are the [[Cut locus|cut locus]] and the [[Cutting problem|cutting problem]]. | ||
Latest revision as of 17:31, 5 June 2020
in a domain $ D \subset \mathbf C $
along a non-closed simple arc $ \gamma = \{ {z ( t) } : {0 \leq t \leq 1 } \} $
The removal of the points of the arc $ \gamma $ from the domain $ D $, that is, replacing the domain $ D $ by the domain (or domains) $ D \setminus \gamma $, as well as the set $ \gamma $ itself. Here it is assumed that either the whole arc $ \gamma $ or the whole arc except the initial or end point $ z ( 0), z ( 1) $ belongs to $ D $ and that $ z ( 0) $ or $ z ( 1) $ belong to the boundary $ \partial D $. To each point $ z ( t) $ of the cut $ \gamma $, when $ 0 < t < 1 $, there correspond two prime ends of the part of the domain $ D $ which belongs to $ \gamma $; the left and right prime ends (cf. Limit elements). The union of these prime ends form the left and right-hand sides of the cut $ \gamma $.
Comments
A cut is also called a slit.
One also speaks of boundary elements instead of limit elements or prime ends. These notions do not coincide in general, but for "nice" domains $ D $( e.g. with Jordan boundary) they can be identified. A related notion is that of a crosscut: an open simple arc that begins and ends at two different points of $ \partial D $, cf. [a1], especially Chapt. 3.
The word "cut" also occurs in several more meanings in various parts of mathematics. Thus, there is the notion of a Dedekind cut in the real or rational numbers, cf. Real number. The notion cut point on a geodesic line; and a cut or cutset in a graph or transportation network (cf. Flow in a network for the latter). Finally there are the cut locus and the cutting problem.
References
| [a1] | M. Ohtsuka, "Dirichlet problem, extremal length and prime ends" , v. Nostrand-Reinhold (1970) |
How to Cite This Entry:
Cut. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Cut&oldid=13864
Cut. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Cut&oldid=13864
This article was adapted from an original article by E.D. Solomentsev (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article