¹ Source: wiktionary.com
Definition of Manifolds
1. manifold [v] - See also: manifold
Lexicographical Neighbors of Manifolds
Literary usage of Manifolds
Below you will find example usage of this term as found in modern and/or classical literature:
1. A Treatise on Universal Algebra: With Applications by Alfred North Whitehead (1898)
"SPECIAL Manifolds. A few definitions of special manifolds will both elucidate
the general explanation of a manifold given above and will serve to introduce ..."
2. Proceedings of the Berkeley-Ames Conference on Nonlinear Problems in Control by L. R. Hunt, Clyde Martin (1984)
"Unstable, or stable, manifolds are important invariant surfaces for nonlinear
dynamical systems. Indeed, they are indispensable tools for the understanding ..."
3. The Cambridge Colloquium 1916 by Griffith Conrad Evans, Oswald Veblen (1918)
"defining these manifolds are orientable. In like manner, the manifolds defined in
... Normal Forms for Manifolds 61. It has now been proved that any two ..."
4. Geometry and Identification: Proceedings of Apsm Workshop on System Geometry by Peter E. Caines, Robert Hermann (1983)
"In the study of semimartingales In manifolds the first question that should be
addressed Is the existence of such processes in a manifold. ..."
5. Topics in Physical Geometry by Robert Hermann (1988)
"Ultimately, it will be essential to develop this material in the context of
infinite dimensional manifolds, Lie groups, and algebras, etc. ..."
6. Sophus Lie's 1880 transformation group paper by Sophus Lie, Robert Hermann (1975)
"DIFFERENTIABLE Manifolds AND VECTOR FIELDS The basic setting will be the modern
theory of differential geometry on manifolds. As introductions, I recommend ..."
7. C-O-R Generalized Functions, Current Algebras, and Control by Robert Hermann (1994)
"CHAPTER 2 GENERALIZED TENSOR FIELDS AND DIFFERENTIAL FORMS ON SMOOTH Manifolds 1.
Introduction. The books by Colombeau, Oberguggenberger and Rosinger ..."
8. Quantum and Fermion Differential Geometry by Robert Hermann (1977)
"KAHLER Manifolds Having seen the need for manifolds carrying both symplectic and
Riemannian structures having certain properties, one might naturally ask ..."
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