THE BASIC TOPOLOGY MODEL OF SPHERICAL SURFACE DIGITAL SPACE
HOU Miao-le!
' Department of Surveying & Land Science, China University of Mining and Technology (Beijing), D11
Xueyuan Road, Beijing, China, 100083
e-mail: hmlicumtb.edu.cn
Keywords: SGDM, manifold, spherical surface digital space. spherical surface digital topology, spherical surface digital image,
spherical surface spatial relationship
Abstract:
SGDM (Sphere Grid Data Model) is an efficient method to deal with the global data because of the advantages of multi-resolution and
hierarchy. However, SGDM has no distinct descriptions and lack of round mathematical basis for various applications. What's more,
most of mathematical model about global application have been based on the continuous methods. Although several researchers have
considered the digital topology in 2-dimension and 3-dimension Euclidean Plane, complete theoretical foundation of proper theory for
spherical surface digital space is still missing. In fact. it’s more convenient and efficient to compute spatial relationship based on
spherical surface digital space.
Firstly, this paper constructs spherical surface digital space based on manifold, ie. the digitization of the spherical surface as a
common spatial framework just as planar. Secondly, the concept of spherical surface digital topology will be given in the context of
; ; 2 . < S 2
adjacency. We define a spherical surface digital image FP asa triplet (7 À, H) , where Æ isa finite subset of 7° and R
represents the adjacency relation in the whole lattice in a specific way. Then topological properties and paradox of discrete objects will
be discussed in spherical surface digital space. In the end, we give some potential applications about spherical surface digital topology.
just because of the advantages of multi-resolution and
: hierarchy.
I. INTRODUCTION =
Computers are digital, and most image acquisition and
communication efforts at present are toward digital approaches.
However, vector model including direction cosine and longitude
and latitude coordination are continuous in essential. There
must be some deficiency between continuous model and
The surface of the earth is an important spatial domain, which is
of course topologically equivalent to the surface of a spherical
surface, ellipse and geoid. In fact, it's not topologically
equivalent to any subset of the Cartesian plane (Sahr 1996
White 1992, 1998). So it's unpractical to analyze the spherical discrete computation just as figure 1. SGDM is a promising
method to deal with the spherical surface. Therefore, it's
surface with the planar methods. Three typical conceptual i
conveniently to analyse the global data and make decision in
modeling approaches are used to apply and adapt spatial
analysis techniques to the spherical surface as follows (Raskin spherical surface digital space.
1994).
® Map projection: The spherical surface is projected onto a
plane using a conventional map projection. The projection Discrete Computation
approach is used implicitly in conventional studies that AV
ignore the curvature of the earth, however, no one „x.
projection can keep both distance and area. What’s more.
the map projection transforms the spherical surface
manifold to planar Euclidean space, therefore, the X
distance, orientation and area in large field are not ot’
accurate at all. Real World +
® Embeddings: The spherical surface is considered a
constrained subset of the three-dimensional space R°.
Tree-dimensional spatial analysis is performed, with a (a)
constraint imposed to limit solutions to the spherical
surface. The most typical one is direction cosine, which
avoids the singularity of the pole. Although direction 1 : mus
= € Discrete Computation
cosine has a perfect mathematics base, so it belongs to the T 4
.**
* *
Model Euclidean space Discrete Data
The relation between vector model and real world
vector method and does not accord with the discrete
properties of real word in essential. T
9 Intrinsic: The spherical surface is considered an intrinsic Model Digital space imc Discrete Data
space in its own right, with analysis performed in
non-Euclidean space. S^. Longitude and latitude
coordinate and SGDM are most typical two. SGDM
(Sphere Grid Data Model) is research topic of this paper
Real World
