A survey of a large number of stars in the solar neighborhood that could be candidates for observation with TPF should be undertaken. It is likely that direct observation of zodiacal dust disks will be necessary to confidently determine the characteristics of individual systems. Unfortunately, little is known about the presence, or frequency of occurrence of zodiacal dust around stars and so the relevance of zodiacal dust to the design of the TPF, or to the TPF mission, is unknown. Zodiacal dust around neighboring stars could obscure the signal of terrestrial planets observed with the Terrestrial Planet Finder (TPF) if that dust is similar to that in the Solar System. Therefore, research on the application of tessellation in architectural geometry design is of great necessity in architecture studies. The development of Computer technology enables tessellation to be more powerful, as seen in surface control, surface display and structure design, etc. In history, tessellation was applied into skins or decorations in architecture. Both Geometry and Crystallography, the latter of which is the basic theory of three-dimensional tessellations, need to be studied. Besides, some special types of tessellations such as Voronoi Tessellation and Delaunay Triangles are also included. In terms of dimensions, there are two- dimensional tessellations and three-dimensional tessellations in terms of symmetry, there are periodic tessellations and aperiodic tessellations. Tessellation has been found since the birth of civilization. Tessellation plays a significant role in architectural geometry design, which is widely used both through history of architecture and in modern architectural design with the help of computer technology. ![]() Experiments show that the number of generated vertices by the strip approach is about 51% of traditional triangle lists, which can improve the performance of GPU tessellation.Īpplication of Tessellation in Architectural Geometry Design ![]() It decreases the number of generated vertices which will benefits latter computation and storage. This paper proposes a new tessellation approach of triangle strips, which makes use of the adjacent relationship among triangles. ![]() However, the number of generated vertices is large and there are many repeated vertices. The tessellation module of graphics pipeline can generate many triangles to specify surface detail characteristics, which are usually organized in triangle lists. Research on tessellation with triangle strip
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