Simplĭces
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SIMPLICES — apud Arnobium adv. Gent. l. 2. ut quae (animae) fuerant simplices et bonitatis innoxiae; eaedem cum bonis. Sic au tem dicuntur homines aperti, et in quibus fallaciae nihil, nec malitiae inest quidquam. Cic. de Offic. l. 1. Ita viros, fortes et… … Hofmann J. Lexicon universale
símplices — s. m. pl. 1. Plantas medicinais. 2. Drogas que entram na composição dos remédios. 3. Ingredientes que entram nas tintas. 4. Elementos que entram na composição dos corpos … Dicionário da Língua Portuguesa
rogationes, quaestiones, et positiones debent esse simplices — /rageyshiyowniyz kwest(i)yowniyz et pazishiyowniyz debant esiy simplssiyz/ Demands, questions, and claims ought to be simple … Black's law dictionary
rogationes, quaestiones, et positiones debent esse simplices — Demands, questions and claims ought to be simple … Ballentine's law dictionary
Orbifold — This terminology should not be blamed on me. It was obtained by a democratic process in my course of 1976 77. An orbifold is something with many folds; unfortunately, the word “manifold” already has a different definition. I tried “foldamani”,… … Wikipedia
Simplex — For other uses, see Simplex (disambiguation). A regular 3 simplex or tetrahedron In geometry, a simplex (plural simplexes or simplices) is a generalization of the notion of a triangle or tetrahedron to arbitrary dimension. Specifically, an n… … Wikipedia
Simplicial complex — In mathematics, a simplicial complex is a topological space of a particular kind, constructed by gluing together points, line segments, triangles, and their n dimensional counterparts (see illustration). Simplicial complexes should not be… … Wikipedia
Barycentric subdivision — In geometry, the barycentric subdivision is a standard way of dividing an arbitrary convex polygon into triangles, a convex polyhedron into tetrahedra, or, in general, a convex polytope into simplices with the same dimension, by connecting the… … Wikipedia
Building (mathematics) — In mathematics, a building (also Tits building, Bruhat–Tits building) is a combinatorial and geometric structure which simultaneously generalizes certain aspects of flag manifolds, finite projective planes, and Riemannian symmetric spaces.… … Wikipedia
Singular homology — In algebraic topology, a branch of mathematics, singular homology refers to the study of a certain set of topological invariants of a topological space X , the so called homology groups H n(X). Singular homology is a particular example of a… … Wikipedia
