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Statements

Subject Item
dbr:List_of_regular_polytopes_and_compounds
rdfs:label
Lista dei politopi regolari Список правильных многомерных многогранников и соединений Listo de regulaj hiperpluredroj List of regular polytopes and compounds 正圖形列表
rdfs:comment
Ĉi tio estas listo de la regulaj hiperpluredroj en eŭklida, sfera kaj hiperbola spacoj. La simbolo de Schläfli priskribas ĉiun regulan hiperpluredron kaj estas uzata kiel referenca nomo por ĉiu hiperpluredro. La regulaj hiperpluredroj estas grupitaj laŭ dimensio kaj subgrupitaj je konveksaj, nekonveksaj kaj malfiniaj formoj. Nekonveksa (formoj, formas) uzi la samaj verticoj kiel la konveksaj formoj, sed havas sekcantajn facetojn. Malfiniaj formoj kahelas spacon de dimensio je 1 pli malgranda. 此頁面列出了所有的歐幾里得空間、雙曲空間和球形空間的正圖形或正多胞形。施萊夫利符號可以描述每一個正圖形或正多胞形,他被廣泛使用如下面的每一個緊湊的參考名稱。 正圖形或正多胞形可由其維度分類,也可以分成凸、非凸(星形、扭歪、複合或凹)和無窮等形式。非凸形式(或凹形式)使用與凸形式相同的頂點,但面(或邊)有相交。無限的形式則是在一較低維的歐幾里得空間中密鋪(鑲嵌或堆砌)。 無限的形式可以擴展到密鋪雙曲空間。雙曲空間是和正常的空間有相同的規模,但平行線在一定的距離內會分岔得越來越遠。這使得頂點值可以存在負角度的缺陷,例如製作一個由個正三角形組成的頂點,它們可以被平放。它不能在普通平面上完成的,但可以在一個雙曲平面上構造。 Questa voce elenca i politopi regolari negli spazi euclidei, sferici e iperbolici.La notazione di Schläfli descrive ogni politopo regolare, ed è usata ampiamente nel seguito come abbreviazione per ciascuno di essi. I politopi regolari sono raggruppati per dimensione e divisi in forme convesse, non convesse e infinite. Le forme non convesse usano gli stessi vertici delle forme convesse, ma hanno che si intersecano. Le forme infinite tassellano uno spazio euclideo di dimensione inferiore. Эта страница содержит список правильных многомерных многогранников (политопов) и правильных cоединений этих многогранников в евклидовом, сферическом и гиперболическом пространствах разных размерностей. Правильные многогранники сгруппированы по размерности, а затем по форме — выпуклые, невыпуклые и бесконечные. Невыпуклые виды используют те же вершины, что и выпуклые, но имеют пересекающиеся фасеты (грани максимальной размерности = размерности пространства – 1). Бесконечные виды замощают евклидово пространство на единицу меньшей размерности. This article lists the regular polytopes and regular polytope compounds in Euclidean, spherical and hyperbolic spaces. The Schläfli symbol describes every regular tessellation of an n-sphere, Euclidean and hyperbolic spaces. A Schläfli symbol describing an n-polytope equivalently describes a tessellation of an (n − 1)-sphere. In addition, the symmetry of a regular polytope or tessellation is expressed as a Coxeter group, which Coxeter expressed identically to the Schläfli symbol, except delimiting by square brackets, a notation that is called Coxeter notation. Another related symbol is the Coxeter-Dynkin diagram which represents a symmetry group with no rings, and the represents regular polytope or tessellation with a ring on the first node. For example, the cube has Schläfli symbol {4,3},
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dcterms:subject
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Ĉi tio estas listo de la regulaj hiperpluredroj en eŭklida, sfera kaj hiperbola spacoj. La simbolo de Schläfli priskribas ĉiun regulan hiperpluredron kaj estas uzata kiel referenca nomo por ĉiu hiperpluredro. La regulaj hiperpluredroj estas grupitaj laŭ dimensio kaj subgrupitaj je konveksaj, nekonveksaj kaj malfiniaj formoj. Nekonveksa (formoj, formas) uzi la samaj verticoj kiel la konveksaj formoj, sed havas sekcantajn facetojn. Malfiniaj formoj kahelas spacon de dimensio je 1 pli malgranda. Malfiniaj formoj povas kaheli eŭklidan aŭ hiperbolan spacon. Hiperbola spaco similas al normala spaco je malgranda skalo, sed paraleloj diverĝas je grandaj distancoj. Ĉi tio permesas al verticaj figuroj havi negativan angulan difekton. Ekzemple povas esti vertico kun 7 egallateraj trianguloj kiuj kuŝas en la hiperbola ebeno. Ĉi tio ne povas esti farita en regula ebeno. 此頁面列出了所有的歐幾里得空間、雙曲空間和球形空間的正圖形或正多胞形。施萊夫利符號可以描述每一個正圖形或正多胞形,他被廣泛使用如下面的每一個緊湊的參考名稱。 正圖形或正多胞形可由其維度分類,也可以分成凸、非凸(星形、扭歪、複合或凹)和無窮等形式。非凸形式(或凹形式)使用與凸形式相同的頂點,但面(或邊)有相交。無限的形式則是在一較低維的歐幾里得空間中密鋪(鑲嵌或堆砌)。 無限的形式可以擴展到密鋪雙曲空間。雙曲空間是和正常的空間有相同的規模,但平行線在一定的距離內會分岔得越來越遠。這使得頂點值可以存在負角度的缺陷,例如製作一個由個正三角形組成的頂點,它們可以被平放。它不能在普通平面上完成的,但可以在一個雙曲平面上構造。 Эта страница содержит список правильных многомерных многогранников (политопов) и правильных cоединений этих многогранников в евклидовом, сферическом и гиперболическом пространствах разных размерностей. Символ Шлефли описывает каждое правильное замощение n-сферы, евклидова и гиперболического пространства. Символ Шлефли описания n-мерного многогранника равным образом описывает мозаику (n-1)-сферы. Вдобавок, симметрия правильного многогранника или замощения выражается как группа Коксетера, которые Коксетер обозначал идентично символам Шлефли, за исключением разграничения квадратными скобками, и эта нотация называется . Другой связанный символ — диаграмма Коксетера — Дынкина, которая представляет группу симметрии (без помеченных кружком узлов) и правильные многогранники или замощения с обведённым кружком первым узлом. Например, куб имеет символ Шлефли {4,3}, с его [4,3] или , представляется диаграммой Коксетера . Правильные многогранники сгруппированы по размерности, а затем по форме — выпуклые, невыпуклые и бесконечные. Невыпуклые виды используют те же вершины, что и выпуклые, но имеют пересекающиеся фасеты (грани максимальной размерности = размерности пространства – 1). Бесконечные виды замощают евклидово пространство на единицу меньшей размерности. Бесконечные формы можно расширить до замощения гиперболического пространства. Гиперболическое пространство подобно обычному пространству, но параллельные прямые с расстоянием расходятся. Это позволяет вершинным фигурам иметь отрицательные угловые дефекты. Например, в вершине может сходиться семь правильных треугольников, лежащих на плоскости. Это нельзя осуществить на обычной (евклидовой) плоскости, но можно сделать при некотором масштабе на гиперболической плоскости. Многогранники, удовлетворяющие более общему определению и не имеющие простых символов Шлефли, включают правильные косые многогранники и бесконечноугольные правильные косые многогранники с неплоскими фасетами или вершинными фигурами. This article lists the regular polytopes and regular polytope compounds in Euclidean, spherical and hyperbolic spaces. The Schläfli symbol describes every regular tessellation of an n-sphere, Euclidean and hyperbolic spaces. A Schläfli symbol describing an n-polytope equivalently describes a tessellation of an (n − 1)-sphere. In addition, the symmetry of a regular polytope or tessellation is expressed as a Coxeter group, which Coxeter expressed identically to the Schläfli symbol, except delimiting by square brackets, a notation that is called Coxeter notation. Another related symbol is the Coxeter-Dynkin diagram which represents a symmetry group with no rings, and the represents regular polytope or tessellation with a ring on the first node. For example, the cube has Schläfli symbol {4,3}, and with its octahedral symmetry, [4,3] or , it is represented by Coxeter diagram . The regular polytopes are grouped by dimension and subgrouped by convex, nonconvex and infinite forms. Nonconvex forms use the same vertices as the convex forms, but have intersecting facets. Infinite forms tessellate a one-lower-dimensional Euclidean space. Infinite forms can be extended to tessellate a hyperbolic space. Hyperbolic space is like normal space at a small scale, but parallel lines diverge at a distance. This allows vertex figures to have negative angle defects, like making a vertex with seven equilateral triangles and allowing it to lie flat. It cannot be done in a regular plane, but can be at the right scale of a hyperbolic plane. A more general definition of regular polytopes which do not have simple Schläfli symbols includes regular skew polytopes and regular skew apeirotopes with nonplanar facets or vertex figures. Questa voce elenca i politopi regolari negli spazi euclidei, sferici e iperbolici.La notazione di Schläfli descrive ogni politopo regolare, ed è usata ampiamente nel seguito come abbreviazione per ciascuno di essi. I politopi regolari sono raggruppati per dimensione e divisi in forme convesse, non convesse e infinite. Le forme non convesse usano gli stessi vertici delle forme convesse, ma hanno che si intersecano. Le forme infinite tassellano uno spazio euclideo di dimensione inferiore. Le forme infinite possono essere estese per tassellare uno spazio iperbolico. Lo spazio iperbolico è come quello normale a brevi distanze, ma le rette parallele divergono a grandi distanze. Questo permette alle figure di vertice di avere difetto d'angolo negativo, come ad esempio componendo un vertice di 7 triangoli equilateri e permettendogli di giacere nello stesso piano. Non può essere fatto nel piano regolare, ma alla giusta scala può essere fatto sul piano iperbolico.
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