smoothable
Look at other dictionaries:
smoothable — smoothˈable adjective • • • Main Entry: ↑smooth … Useful english dictionary
smooth — smoothable, adj. smoother, n. smoothly, adv. smoothness, n. /smoohdh/, adj., smoother, smoothest, adv., v., n. adj. 1. free from projections or unevenness of surface; not rough: smooth wood; a … Universalium
4-manifold — In mathematics, 4 manifold is a 4 dimensional topological manifold. A smooth 4 manifold is a 4 manifold with a smooth structure. In dimension four, in marked contrast with lower dimensions, topological and smooth manifolds are quite different.… … Wikipedia
Cotangent complex — In mathematics the cotangent complex is a roughly a universal linearization of a morphism of geometric or algebraic objects. Cotangent complexes were originally defined in special cases by a number of authors. Luc Illusie, Daniel Quillen, and M.… … Wikipedia
Differentiable manifold — A nondifferentiable atlas of charts for the globe. The results of calculus may not be compatible between charts if the atlas is not differentiable. In the middle chart the Tropic of Cancer is a smooth curve, whereas in the first it has a sharp… … Wikipedia
William Bronk — (1918 02 17 1999 02 22) was an American poet. He won the American Book Award in 1982.Books* My Father Photographed With Friends * Light In A Dark Sky * Light and Dark * The World The Worldless * The Empty Hands * That Tantalus * To Praise The… … Wikipedia
Genus of a multiplicative sequence — In mathematics, the genus of a multiplicative sequence is a ring homomorphism, from the cobordism ring of smooth oriented compact manifolds to another ring, usually the ring of rational numbers.DefinitionA genus phi; assigns a number phi;( X ) to … Wikipedia
PDIFF — Splines are piecewise smooth, hence in PDIFF, but not globally smooth or piecewise linear, hence not in DIFF or PL. In geometric topology, PDIFF, for piecewise differentiable, is the category of piecewise smooth manifolds and piecewise smooth… … Wikipedia
Categories of manifolds — In mathematics, specifically geometry and topology, there are many different notions of manifold, with more or less structure, and corresponding notions of map between manifolds , each of which yields a different category and its own… … Wikipedia
Intersection form (4-manifold) — In mathematics, the intersection form of an oriented compact 4 manifold is a special symmetric bilinear form on the 2nd cohomology group of the 4 manifold. It reflects much of the topology of the 4 manifolds, including information on the… … Wikipedia