標(biāo)題: Titlebook: Geometry of Surfaces; John Stillwell Textbook 1992 Springer Science+Business Media New York 1992 Area.Fractal.curvature.differential geome [打印本頁] 作者: 關(guān)稅 時(shí)間: 2025-3-21 19:45
書目名稱Geometry of Surfaces影響因子(影響力)
書目名稱Geometry of Surfaces影響因子(影響力)學(xué)科排名
書目名稱Geometry of Surfaces網(wǎng)絡(luò)公開度
書目名稱Geometry of Surfaces網(wǎng)絡(luò)公開度學(xué)科排名
書目名稱Geometry of Surfaces被引頻次
書目名稱Geometry of Surfaces被引頻次學(xué)科排名
書目名稱Geometry of Surfaces年度引用
書目名稱Geometry of Surfaces年度引用學(xué)科排名
書目名稱Geometry of Surfaces讀者反饋
書目名稱Geometry of Surfaces讀者反饋學(xué)科排名
作者: Pageant 時(shí)間: 2025-3-21 23:45 作者: 隱士 時(shí)間: 2025-3-22 02:46 作者: Injunction 時(shí)間: 2025-3-22 05:55
Von der Zerlegung der Zahlen in Teile,s intended to model “flat” surfaces in the real world; yet all physical flat surfaces are of finite extent and have boundaries. It is not clear that such a surface would resemble ?. when extended indefinitely, even if small parts of it matched small parts of ?. with absolute precision. Indeed, we ma作者: 牢騷 時(shí)間: 2025-3-22 08:49 作者: 適宜 時(shí)間: 2025-3-22 15:23
Di- und triklinometrisches System,t . ? ., more than one line through . which does not meet . Such a surface departs from the euclidean plane in the opposite way to the sphere, and the hyperbolic plane, in fact, emerged from the study of surfaces which “curve” in the opposite way to the sphere. The train of thought, in brief, was th作者: 適宜 時(shí)間: 2025-3-22 17:19
,Die Gr??enordnung der Kardinalzahlen, function . such that each . ∈ . has an ε-neighborhood isometric to a disc of ?.. The proof of the Killing-Hopf theorem (Section 2.9) carries over word-for-word (provided “l(fā)ine”, “distance” etc., are understood in the hyperbolic sense), showing that any complete, connected hyperbolic surface is of t作者: Fallibility 時(shí)間: 2025-3-23 00:01
Besondere Behandlung des Falles , = 3, problem of classifying groups Γ. In the spherical and euclidean cases this problem is easy to solve, as we have seen in Chapters 2 and 3, because there are only a small number of possibilities. However, in the hyperbolic case the number of possibilities is infinite, and the problem is best clarifie作者: 有毛就脫毛 時(shí)間: 2025-3-23 03:51 作者: 污點(diǎn) 時(shí)間: 2025-3-23 07:19
Einleitung in die griechische Philologie sides of II according to the side pairing, is also an orbit space .Γ. Here . = . is S., ?., or ?.—the surface from which II originates—and Γ is the group generated by the side-pairing transformations of II. Because of its interpretation as an orbit space, . is also called an 作者: Congeal 時(shí)間: 2025-3-23 11:02
978-0-387-97743-0Springer Science+Business Media New York 1992作者: 凈禮 時(shí)間: 2025-3-23 17:22
Geometry of Surfaces978-1-4612-0929-4Series ISSN 0172-5939 Series E-ISSN 2191-6675 作者: 勉勵(lì) 時(shí)間: 2025-3-23 18:45 作者: 迎合 時(shí)間: 2025-3-24 01:06
Di- und triklinometrisches System,t . ? ., more than one line through . which does not meet . Such a surface departs from the euclidean plane in the opposite way to the sphere, and the hyperbolic plane, in fact, emerged from the study of surfaces which “curve” in the opposite way to the sphere. The train of thought, in brief, was this.作者: COST 時(shí)間: 2025-3-24 04:36 作者: 躺下殘殺 時(shí)間: 2025-3-24 10:04
The Hyperbolic Plane,t . ? ., more than one line through . which does not meet . Such a surface departs from the euclidean plane in the opposite way to the sphere, and the hyperbolic plane, in fact, emerged from the study of surfaces which “curve” in the opposite way to the sphere. The train of thought, in brief, was this.作者: OCTO 時(shí)間: 2025-3-24 14:00
Tessellations of Compact Surfaces, sides of II according to the side pairing, is also an orbit space .Γ. Here . = . is S., ?., or ?.—the surface from which II originates—and Γ is the group generated by the side-pairing transformations of II. Because of its interpretation as an orbit space, . is also called an 作者: dendrites 時(shí)間: 2025-3-24 18:48 作者: BILL 時(shí)間: 2025-3-24 22:07
The Euclidean Plane, properties of lines and circles as axioms and derived theorems from them by pure logic. Actually he occasionally made use of unstated axioms; nevertheless his approach is feasible and it was eventually made rigorous by Hubert [1899].作者: 裝飾 時(shí)間: 2025-3-25 01:01 作者: 拖網(wǎng) 時(shí)間: 2025-3-25 04:57
Von der Zerlegung der Zahlen in Teile,uch a surface would resemble ?. when extended indefinitely, even if small parts of it matched small parts of ?. with absolute precision. Indeed, we may never know enough about the large-scale structure of the universe to say what an unbounded flat surface would really be like. What we can do, however, is find which flat surfaces are . possible.作者: 猛烈責(zé)罵 時(shí)間: 2025-3-25 09:09
https://doi.org/10.1007/978-3-662-25901-6 local isometry between the line and the unit circle. The sphere, on the other hand, is . locally isometric to the plane, hence it is of interest as a self-contained structure. This intrinsic structure makes the sphere the first example of a non-euclidean geometry.作者: 自由職業(yè)者 時(shí)間: 2025-3-25 12:34
,Die Gr??enordnung der Kardinalzahlen,d-for-word (provided “l(fā)ine”, “distance” etc., are understood in the hyperbolic sense), showing that any complete, connected hyperbolic surface is of the form ?./Γ, where Γ is a discontinuous, fixed point free group of ?.-isometries.作者: FOLLY 時(shí)間: 2025-3-25 16:45 作者: faddish 時(shí)間: 2025-3-25 22:56 作者: Immunization 時(shí)間: 2025-3-26 02:42 作者: 凌辱 時(shí)間: 2025-3-26 04:52 作者: BALK 時(shí)間: 2025-3-26 11:44 作者: geometrician 時(shí)間: 2025-3-26 13:51 作者: insipid 時(shí)間: 2025-3-26 20:44
Planar and Spherical Tessellations,ges). The isometries of . onto itself are called . of ., and they form a group called the . of . Thus, we are defining . to be symmetric if its symmetry group contains enough elements to map any tile onto any other tile.作者: 奇怪 時(shí)間: 2025-3-26 23:57
Textbook 1992lcome the opportunity to make a fresh start. Classical geometry is no longer an adequate basis for mathematics or physics-both of which are becoming increasingly geometric-and geometry can no longer be divorced from algebra, topology, and analysis. Students need a geometry of greater scope, and the 作者: HAIRY 時(shí)間: 2025-3-27 03:29
The Euclidean Plane,d circles, and proceed from “self-evident” properties of these figures (axioms) to deduce the less obvious properties as theorems. This was the classical approach to geometry, also known as .. It was based on the conviction that geometry describes actual space and, in particular, that the theory of 作者: 謙卑 時(shí)間: 2025-3-27 06:47 作者: 小母馬 時(shí)間: 2025-3-27 11:45
The Sphere,e, however, is of interest . in relation to the plane. Its intrinsic structure is locally the same as the line because we have the map θ→.θ which is a local isometry between the line and the unit circle. The sphere, on the other hand, is . locally isometric to the plane, hence it is of interest as a作者: osteopath 時(shí)間: 2025-3-27 17:02
The Hyperbolic Plane,t . ? ., more than one line through . which does not meet . Such a surface departs from the euclidean plane in the opposite way to the sphere, and the hyperbolic plane, in fact, emerged from the study of surfaces which “curve” in the opposite way to the sphere. The train of thought, in brief, was th作者: 補(bǔ)助 時(shí)間: 2025-3-27 20:32
Hyperbolic Surfaces, function . such that each . ∈ . has an ε-neighborhood isometric to a disc of ?.. The proof of the Killing-Hopf theorem (Section 2.9) carries over word-for-word (provided “l(fā)ine”, “distance” etc., are understood in the hyperbolic sense), showing that any complete, connected hyperbolic surface is of t作者: 完成才能戰(zhàn)勝 時(shí)間: 2025-3-27 23:52
Paths and Geodesics, problem of classifying groups Γ. In the spherical and euclidean cases this problem is easy to solve, as we have seen in Chapters 2 and 3, because there are only a small number of possibilities. However, in the hyperbolic case the number of possibilities is infinite, and the problem is best clarifie作者: 雕鏤 時(shí)間: 2025-3-28 05:43
Planar and Spherical Tessellations, tile”, i.e., if any tile II. can be mapped onto any tile II. by an isometry which maps the whole of . onto itself (faces onto faces and edges onto edges). The isometries of . onto itself are called . of ., and they form a group called the . of . Thus, we are defining . to be symmetric if its symmet作者: thyroid-hormone 時(shí)間: 2025-3-28 07:00 作者: Rheumatologist 時(shí)間: 2025-3-28 12:21 作者: 調(diào)整 時(shí)間: 2025-3-28 16:13
Technical Prerequisites for the Evaluation of Breast Microcalcifications,ures and microcalcifications are each of fundamental importance in this process. Almost half (43%-49%) of clinically occult breast carcinomas are detected from the presence of microcalcifications, 21% of which are less than 0.25 mm in size; many are no larger than 0.1 mm (F. 1983; F. and L. 1977; L.作者: 疼死我了 時(shí)間: 2025-3-28 21:55
Semiempirical Methods of Electronic Structure Calculation978-1-4684-2556-7作者: 不能仁慈 時(shí)間: 2025-3-29 00:11
