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Topology
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{{Top}}[[topologie]]{{Bottom}}
=====Definition====="[[Topology]]" ([[Fr]]. ''[[topologie]]'') is a branch of [[mathematics]] which deals with the properties of [[figures ]] in [[topology|space ]] where are preserved under all continuous deformations. These properties are those of continuity, contiguity and delimitation.
=====Figures=====While [[Freudschema L]] used spatial metaphors and the other [[schemata]] which are produced in the 1950s can be seen as [[Lacan]]'s first incursion into [[topology]], topological forms only come into prominence when, in the 1960s, he turns his attention to describe the psyche in figures of the [[torus]], the [[moebius strip]], [[Klein]]'s bottle, and the [[cross-cap]].<ref>{{L}} ''[[The Interpretation Works of DreamsJacques Lacan|Le Séminaire. Livre IX. L'identification, 1961-62]]'', where he cites Gunpublished. T. Fechner's idea that </ref> Later on, in the 1970s, [[Lacan]] turns his attention to the scene more [[complex]] area of action of dreams is different from that of waking ideational life and proposes [[knot]] [[theory]], especially the concept of 'psychical locality'[[Borromean knot]].
=====See Also====={{See}}* [[FreudBorromean knot]] is careful to explain that this concept is a purely topographical one, and must not be confused with physical locality in any anatomical fashion.<ref>Freud, 1900a: SE V, 536</ref> * [[Moebius strip]]{{Also}}