Listing 1 - 10 of 40 | << page >> |
Sort by
|
Choose an application
Choose an application
Morse --- Samuel Finley Breese --- 1791-1872
Choose an application
Morse --- Samuel Finley Breese --- 1791-1872
Choose an application
Indians of North America --- Excavations (Archaeology) --- Archaeologists --- Antiquities. --- Morse, Dan F. --- Morse, Phyllis A. --- Arkansas --- Antiquities.
Choose an application
Congregational churches --- Clergy --- Biography. --- Morse, Jedidiah, --- Jedidiah Morse --- Congregational churches--Massachusetts--Clergy--Biography --- 1761-1826
Choose an application
In this book, based on previously unpublished archival sources, George F. Botjer examines the importance of time and place in the launch of Samuel F. B. Morse's invention and his resulting fame and how the invention affected the inventor himself.
Inventors --- Painters --- Telegraph --- History. --- Morse, Samuel Finley Breese,
Choose an application
In the early 1920's M. Morse discovered that the number of critical points of a smooth function on a manifold is closely related to the topology of the manifold. This became a starting point of the Morse theory which is now one of the basic parts of differential topology. Circle-valued Morse theory originated from a problem in hydrodynamics studied by S. P. Novikov in the early 1980's. Nowadays, it is a constantly growing field of contemporary mathematics with applications and connections to many geometrical problems such as Arnold's conjecture in the theory of Lagrangian intersections, fibrations of manifolds over the circle, dynamical zeta functions, and the theory of knots and links in the three-dimensional sphere. The aim of the book is to give a systematic treatment of geometric foundations of the subject and recent research results. The book is accessible to first year graduate students specializing in geometry and topology.
Manifolds (Mathematics). --- Mathematics. --- Morse theory. --- Morse theory --- Manifolds (Mathematics) --- Morse, théorie de --- Variétés (Mathématiques) --- Geometry, Differential --- Topology --- Calculus of variations --- Critical point theory (Mathematical analysis) --- Differential geometry.
Choose an application
Hosea Ballou Morse (1855-1934) sailed to China in 1874, and for the next thirty-five years he labored loyally in the Imperial Chinese Maritime Customs Service, becoming one of its most able commissioners and acquiring a deep knowledge of China's economy and foreign relations. After his retirement in 1909, Morse devoted himself to scholarship. He pioneered in the Western study of China's foreign relations, weaving from the tangled threads of the Ch'ing dynasty's foreign affairs several seminal interpretive histories, most notably his three-volume magnum opus, The International Relations of the
Customs administration --- Finance, Public --- Tariff --- Officials and employees --- Biography. --- Morse, Hosea Ballou, --- Ma-shih, --- Morse, H. B. --- Ma, Shih, --- China --- Foreign relations
Choose an application
Writing --- 902.3 --- Alfabet --- Brailleschrift --- Gebarentaal --- Morse --- Schrift --- 003 ) Tekens --- alfabetten --- schrift --- Alfabetten
Choose an application
Cet ouvrage est une introduction aux méthodes modernes de la topologie symplectique. Il est consacré à un problème issu de la mécanique classique, la « conjecture d’Arnold », qui propose de minimiser le nombre de trajectoires périodiques de certains systèmes hamiltoniens par un invariant qui ne dépend que de la topologie de la variété symplectique dans laquelle évolue ce système. La première partie expose la « théorie de Morse », outil indispensable de la topologie différentielle contemporaine. Elle introduit le « complexe de Morse » et aboutit aux inégalités de Morse. Cette théorie, maintenant classique, est présentée de manière détaillée car elle sert de guide pour la seconde partie, consacrée à l’« homologie de Floer », qui en est un analogue en dimension infinie. Les objets de l’étude sont alors plus compliqués et nécessitent l’introduction de méthodes d’analyse plus sophistiquées. Elles sont expliquées en détail dans cette partie. Enfin, l’ouvrage contient en appendice la présentation d’un certain nombre de résultats nécessaires à la lecture du livre dans les trois principaux domaines abordés – géométrie différentielle, topologie algébrique et analyse – auxquels le lecteur pourra se référer si besoin. L’ouvrage est issu d’un cours de M2 donné à l’université de Strasbourg. Le texte, abondamment illustré, contient de nombreux exercices.
Morse theory. --- Floer homology. --- Floer cohomology --- Symplectic geometry --- Calculus of variations --- Critical point theory (Mathematical analysis) --- Global analysis (Mathematics) --- Morse theory --- Analyse globale (mathématiques) --- Morse, Théorie de. --- Géometrie symplectique --- Analyse globale (mathématiques) --- Géometrie symplectique --- Topologie differentielle --- Théorie de Morse --- Homologie de Floer
Listing 1 - 10 of 40 | << page >> |
Sort by
|