Topology Essay -- Mathematics Geometry Essays

regional anatomy network topology is the study of those properties of geometric figures that be unchanged when the shape of the figure is twisted, stretched, shrunk, or otherwise distorted without breaking. It is sometimes referred to as rubber sheet geometry (West 577). Topology is a basic and essential part of any post prepare mathematics curriculum. Johann Benedict Listing introduced this subject, while Euler is regarded as the founder of topology. Mathematicians such as August Ferdinand Mbius, Felix Christian Klein, Camille Marie Ennemond Jordan and others have contributed to this field of mathematics. The Mbius band, Klein bottle, and Jordan curve are all examples of objects commonly studied. These and other topics prove to be intricate and fascinating mathematical themes.Topologists are mathematicians who study qualitative questions active geometrical structures. They ask questions like does the structure have any holes in it? Is it all connected, or can it be separated in to parts? Topologists are not concerned with size, straightness, distance, angle, or other such properties. An often-cited example is the capital of the United Kingdom Underground map. This will not reliably arrange you how far it is from Kings dawn to Picadilly, or even the compass direction from angiotensin-converting enzyme to the other. However, it will tell you how the lines connect between them, using topological rather than geometric information (What 1).Furthermore, if one figure can be distorted into another figure without breaking, consequently the two figures are described as being topologically equivalent to each other. Two examples of topologically equivalent figures are a coffee cup and doughnut, and groups of the garner of the alphabet. First, an object shaped like a doughnut is a torus. A torus can... ...and. New YorkOxford University Press, 1993.Felix Christian Klein. Available Online.http//www-groups.dcs-and.ac.uk/history/Mathematicians/Klein.html. Accessed12 /4/99.Flegg, Graham. From Geometry to Topology. New York Crane, Russak, and Company, Inc.,1974.Jordan Curve Theorem and its Generalizations. Available Online.http//www.math.ohio-state.edu/fiedorow/math655/Jordan.html. Accessed 12/6/99.Marie Ennemond Camille (1838-1922). Available Online.http//ukdb.web.aol.com/hutchinson/cyclopedia/91/M0046091.htm. Accessed 12/6/99.What is Topology? Available Online. http//www.shef.ac.uk/pm1nps/Wurble.html.Accessed 12/4/99.West, Beverly Henderson, and others. Topology. The Prentice-Hall Encyclopedia ofMathematics. 1982. 21 577-585.Yaglom, I.M. Felix Klein and Sophus Lie. Boston Birkhauser Boston, 1988.