Editing Topology (section)

==Motivation==
[[Image:Möbius strip.jpg|thumb|240px|[[Möbius strip]]s, which have only one surface and one edge, are a kind of object studied in topology.]]
The motivating insight behind topology is that some geometric problems depend not on the exact shape of the objects involved, but rather on the way they are put together. For example, the square and the circle have many properties in common: they are both one-dimensional objects (from a topological point of view) and both separate the plane into two parts, the part inside and the part outside.

In one of the first papers in topology, [[Leonhard Euler]] demonstrated that it was impossible to find a route through the town of Königsberg (now [[Kaliningrad]]) that would cross each of its seven bridges exactly once. This result did not depend on the lengths of the bridges or on their distance from one another, but only on connectivity properties: which bridges connect to which islands or riverbanks. This [[Seven Bridges of Königsberg]] problem led to the branch of mathematics known as [[graph theory]].

Similarly, the [[hairy ball theorem]] of algebraic topology says that "one cannot comb the hair flat on a hairy ball without creating a [[cowlick]]." This fact is immediately convincing to most people, even though they might not recognize the more formal statement of the theorem, that there is no nonvanishing continuous [[vector field|tangent vector field]] on the sphere. As with the ''Bridges of Königsberg'', the result does not depend on the shape of the sphere; it applies to any kind of smooth blob, as long as it has no holes.

To deal with these problems that do not rely on the exact shape of the objects, one must be clear about just what properties these problems do rely on. From this need arises the notion of [[homeomorphism]]. The impossibility of crossing each bridge just once applies to any arrangement of bridges [[homeomorphic]] to those in Königsberg, and the hairy ball theorem applies to any space homeomorphic to a sphere.

Intuitively, two spaces are homeomorphic if one can be deformed into the other without cutting or gluing. A famous example, known as the "Topologist's Breakfast", is that a topologist cannot distinguish a coffee mug from a doughnut; a sufficiently pliable doughnut could be reshaped to a coffee cup by creating a dimple and progressively enlarging it while shrinking the hole into a handle.<ref>{{cite book|url=https://books.google.com/books?id=SHBj2oaSALoC&pg=PA204|title=Differential Equations: A Dynamical Systems Approach. Part II: Higher-Dimensional Systems|last1=Hubbard|first1=John H.|last2=West|first2=Beverly H.|publisher=Springer|year=1995|isbn=978-0-387-94377-0|series=Texts in Applied Mathematics|volume=18|page=204}}</ref>

Homeomorphism can be considered the most basic [[Homeomorphism|topological equivalence]]. Another is [[homotopy equivalence]]. This is harder to describe without getting technical, but the essential notion is that two objects are homotopy equivalent if they both result from "squishing" some larger object.