Difference between revisions of "Moebius strip"

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[[Image:Lacan-mobeiusstrip.jpg|center]]
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{{Top}}bande de moebius{{Bottom}}
  
The [[moebius strip]] ([[Fr]]. ''[[bande de moebius]]'') is one of the figures studied by [[Lacan]] in his use of [[topology]].
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==Topology==
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[[Image:Lacan-mobeiusstrip.jpg|thumb|right|250px|Moebius strip]]
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The [[moebius strip]] is one of the figures studied by [[Lacan]] in his use of [[topology]].
  
 
It is a three-dimensional figure that can be formed by taking a long rectangle of paper and twisting it once before joining its ends together.
 
It is a three-dimensional figure that can be formed by taking a long rectangle of paper and twisting it once before joining its ends together.
  
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==Space==
 
The result is a figure which subverts our normal (Euclidean) way of representing space, for it seems to have two sides but in fact has only one.
 
The result is a figure which subverts our normal (Euclidean) way of representing space, for it seems to have two sides but in fact has only one.
  
 
Locally, at any one point, two sides can be clearly distinguished, but when the whole strip is traversed it becomes clear that they are in fact continuous.
 
Locally, at any one point, two sides can be clearly distinguished, but when the whole strip is traversed it becomes clear that they are in fact continuous.
  
The two sides are only distinguished by the dimension of time, the time it takes to traverse the whole strip.
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==Time==
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The two sides are only distinguished by the dimension of [[time]], the [[time]] it takes to traverse the whole strip.
  
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==Binary Oppositions==
 
The figure illustrates the way that [[psychoanalysis]] problematizes various binary oppositions, such as [[inside]]/[[outside]], [[love]]/[[hate]], [[signifier]]/[[signified]], [[truth]]/[[appearance]].
 
The figure illustrates the way that [[psychoanalysis]] problematizes various binary oppositions, such as [[inside]]/[[outside]], [[love]]/[[hate]], [[signifier]]/[[signified]], [[truth]]/[[appearance]].
  
While the two terms in such oppositions are often presented as radically distinct, Lacan prefers to understand these oppositions in terms of the [[topology]] of the [[moebius strip]].
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While the two terms in such oppositions are often presented as radically distinct, [[Lacan]] prefers to understand these oppositions in terms of the [[topology]] of the [[moebius strip]].
  
 
The opposed terms are thus seen to be not discrete but continuous with each other.
 
The opposed terms are thus seen to be not discrete but continuous with each other.
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Likewise, the [[discourse]] of the [[master]] is continuous with the [[discourse]] of the [[analyst]].
 
Likewise, the [[discourse]] of the [[master]] is continuous with the [[discourse]] of the [[analyst]].
  
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=="Traverse the Fantasy"==
 
The [[moebius strip]] also helps one to understand how it is possible to "traverse the fantasy."<ref>{{S11}} p.273</ref>
 
The [[moebius strip]] also helps one to understand how it is possible to "traverse the fantasy."<ref>{{S11}} p.273</ref>
  
It is only because the two sides are continuous that it is possivle to cross over from inside to outside.
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It is only because the two sides are continuous that it is possible to cross over from [[extimacy|inside]] to [[extimacy|outside]].
  
Yet, when one passes a finger round the surface of the [[moebius strip]], it is impossible to say at which precise poitn one has crossed over from inside to outside (or vice versa).
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Yet, when one passes a finger round the surface of the [[moebius strip]], it is impossible to say at which precise point one has crossed over from "[[extimacy|inside]]" to "[[extimacy|outside]]" (or vice versa).
  
 
==See Also==
 
==See Also==
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{{See}}
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* [[Algebra]]
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* [[Borromean knot]]
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* [[Extimacy]]
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* [[Fantasy]]
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* [[Matheme]]
 
* [[Topology]]
 
* [[Topology]]
* [[Borromean knot]]
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{{Also}}
  
 
==References==
 
==References==
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[[Category:Dictionary]]
 
[[Category:Dictionary]]
 
[[Category:Psychoanalysis]]
 
[[Category:Psychoanalysis]]
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{{OK}}
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__NOTOC__

Revision as of 18:58, 24 August 2006

French: bande de moebius

Topology

Moebius strip

The moebius strip is one of the figures studied by Lacan in his use of topology.

It is a three-dimensional figure that can be formed by taking a long rectangle of paper and twisting it once before joining its ends together.

Space

The result is a figure which subverts our normal (Euclidean) way of representing space, for it seems to have two sides but in fact has only one.

Locally, at any one point, two sides can be clearly distinguished, but when the whole strip is traversed it becomes clear that they are in fact continuous.

Time

The two sides are only distinguished by the dimension of time, the time it takes to traverse the whole strip.

Binary Oppositions

The figure illustrates the way that psychoanalysis problematizes various binary oppositions, such as inside/outside, love/hate, signifier/signified, truth/appearance.

While the two terms in such oppositions are often presented as radically distinct, Lacan prefers to understand these oppositions in terms of the topology of the moebius strip.

The opposed terms are thus seen to be not discrete but continuous with each other.

Likewise, the discourse of the master is continuous with the discourse of the analyst.

"Traverse the Fantasy"

The moebius strip also helps one to understand how it is possible to "traverse the fantasy."[1]

It is only because the two sides are continuous that it is possible to cross over from inside to outside.

Yet, when one passes a finger round the surface of the moebius strip, it is impossible to say at which precise point one has crossed over from "inside" to "outside" (or vice versa).

See Also

References

  1. Lacan, Jacques. The Seminar. Book XI. The Four Fundamental Concepts of Psychoanalysis, 1964. Trans. Alan Sheridan. London: Hogarth Press and Institute of Psycho-Analysis, 1977. p.273