Surface (geometry): Difference between revisions

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In common language, a surface is the exterior face of an object in space (a body), and is usually considered as part of that object.

Some examples of surfaces are:

The surface of a ball — called a sphere — is completely uniform.
The surface of a cube can be seen as six squares that are glued together along their edges.
A piece of rock or mineral may be irregular, crumpled, distorted, but it still has a surface.

Starting from this intuitive idea, over the centuries, the mathematical notion – or rather: several related mathematical notions – of a surface has emerged.

The essential feature of a surface (as an abstract geometrical object) is its two-dimensionality: It has length and breadth, but no depth — and this is also the common property of the mathematical definitions.

Surfaces that are the face of a body are two-sided: They have an interior and an exterior side. Such surfaces are called orientable.
But not all abstract surfaces defined in mathematics can be interpreted as the outside hull of some body. Such surfaces are one-sided and are called non-orientable. A well-known example of a non-orientable surface is the Moebius strip.

Mathematical definitions

In analytic geometry and in differential geometry a surface can be described

explicitly by a real function of two variables

z=f(x,y)

and the surface is the graph of the function, i.e., the set of points

\{(x,y,f(x,y))\in \mathbb {R} \}

,

or it can be defined

implicitly by the zeroes of a function of three variables

F(x,y,z)

i.e., the surface consists of the points

\{(x,y,z)\mid F(x,y,z)=0\}

.

In topology a surface is defined as a topological space such that

every point has a neighbourhood that is homeomorphic to the (open) unit disk in $\mathbb {R} ^{2}$ .

i.e., the space locally "looks" like a plane.

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-[[Image:Guggenheim bilbao02.jpg|thumb|250px|alt=Picture of the outside of a building.|The Guggenheim Museum in Balbao has eye-catching surfaces.]]
-The word '''surface''' in mathematics has many different uses, the most common referring to a two-dimensional submanifold of three-dimensional Euclidean space, <math>\scriptstyle \mathbb{R}^2</math>.
+In common language, a '''surface''' is the exterior face of an object in space (a [[body (geometry)|body]]),
+and is usually considered as part of that object.
-Any set of points composed of pieces [[Topological_space|topologically]] equivalent to a subset of a plane is a surface:   this includes curved surfaces such as a paraboloid, infinite surfaces such as a plane, surfaces of limited extent such as the interior of a polygon, and surfaces with strange topology such as an infinitely long row of squares each separated by some distance, or the set of all points with rational coordinates in a plane.
+Some examples of surfaces are:
-The extremities of a [[solid (geometry)|solid]] are made up of surfaces.
+* The surface of a ball &mdash; called a [[sphere]] &mdash; is completely uniform.
+* The surface of a cube can be seen as six squares that are glued together along their edges.
+* A piece of rock or mineral may be irregular, crumpled, distorted, but it still has a surface.
-In [[Euclidean geometry]]:
+Starting from this intuitive idea, over the centuries, the mathematical notion
+&ndash; or rather: several related mathematical notions &ndash; of a surface has emerged.
-A '''surface''' has length and breadth only. A surface that is flat is called a [[plane (geometry)|plane]].
+The essential feature of a surface (as an abstract geometrical object) is its two-dimensionality:
+It has length and breadth, but no depth &mdash; and this is also the common property of the mathematical definitions.
+Surfaces that are the face of a body are ''two-sided'': They have an interior and an exterior side.
+Such surfaces are called ''[[orientable]]''.
+<br>
+But not all abstract surfaces defined in mathematics can be interpreted as the outside hull of some body.
+Such surfaces are ''one-sided'' and are called ''non-orientable''.
+A well-known example of a non-orientable surface is the [[Moebius strip]].
+== Mathematical definitions ==
+In [[analytic geometry]] and in [[differential geometry]] a surface can be described
+* ''explicitly'' by a real function of two variables
+: <math> z = f(x,y) </math>
+and the surface is the [[graph (function)|graph]] of the function, i.e., the set of points
+: <math> \{ (x,y,f(x,y)) \in \mathbb R \}</math>,
+or it can be defined
+* ''implicitly'' by the zeroes of a function of three variables
+:: <math>  F(x,y,z) </math>
+i.e., the surface consists of the points
+:: <math> \{ (x,y,z) \mid F(x,y,z)=0 \} </math>.
+In [[topology]] a surface is defined as a topological space such that
+* every point has a neighbourhood that is homeomorphic to the (open) unit disk in <math>\mathbb R^2</math>.
+i.e., the space locally "looks" like a plane.

Surface (geometry): Difference between revisions

Revision as of 19:21, 22 March 2010

Mathematical definitions

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