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Mathematics 205A Topology — I Course Notes Revised, Fall 2005
Mathematics 205A Topology — I Course Notes Revised, Fall 2005

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“Research Note” TOPOLOGICAL RING

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Topology - University of Nevada, Reno

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Closure, Interior and Compactness in Ordinary Smooth Topological

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Topology Proceedings - topo.auburn.edu

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Branched coverings

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topologies for function spaces

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Topologies on spaces of continuous functions

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Topology I with a categorical perspective

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important result of the fuzzy tychonoff theorem and

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Lecture 1: August 25 Introduction. Topology grew out of certain

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Spring 2009 Topology Notes

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Math 54: Topology - Dartmouth Math Home

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Lecture notes of Dr. Hicham Gebran

< 1 2 3 4 5 6 ... 22 >

Orientability



In mathematics, orientability is a property of surfaces in Euclidean space that measures whether it is possible to make a consistent choice of surface normal vector at every point. A choice of surface normal allows one to use the right-hand rule to define a ""clockwise"" direction of loops in the surface, as needed by Stokes' theorem for instance. More generally, orientability of an abstract surface, or manifold, measures whether one can consistently choose a ""clockwise"" orientation for all loops in the manifold. Equivalently, a surface is orientable if a two-dimensional figure such as 20px in the space cannot be moved (continuously) around the space and back to where it started so that it looks like its own mirror image 20px.The notion of orientability can be generalised to higher-dimensional manifolds as well. A manifold is orientable if it has a consistent choice of orientation, and a connected orientable manifold has exactly two different possible orientations. In this setting, various equivalent formulations of orientability can be given, depending on the desired application and level of generality. Formulations applicable to general topological manifolds often employ methods of homology theory, whereas for differentiable manifolds more structure is present, allowing a formulation in terms of differential forms. An important generalization of the notion of orientability of a space is that of orientability of a family of spaces parameterized by some other space (a fiber bundle) for which an orientation must be selected in each of the spaces which varies continuously with respect to changes in the parameter values.
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