Topological vs Hyperbolike - What's the difference?
topological | hyperbolike |
(mathematics) of or relating to topology
* Johnston, Adrian, "Jacques Lacan", The Stanford Encyclopedia of Philosophy (Summer 2013 Edition), Edward N. Zalta (ed.), URL =
(mathematics) Having topological properties that are equivalent to the existence of a hyperbolic structure.
In mathematics terms the difference between topological and hyperbolike
is that topological is of or relating to topology while hyperbolike is having topological properties that are equivalent to the existence of a hyperbolic structure.topological
English
(Topology)Adjective
(-)- By the 1970s, with his meditations on the topological figure of the Borromean knot—this knotting of three rings, pictured on the coat of arms of the Borromeo family, is arranged such that if one ring is broken, all three are set free in disconnection—Lacan emphasizes the mutual dependence of the registers on one another. Hence, loosely speaking, the Imaginary, the Symbolic, and the Real can be thought of as the three fundamental dimensions of psychical subjectivity à la Lacan.